Sift 4. Cleaned up "numbered" case. Tests are in progress.

2022-06-14 19:15:36 +03:00 · 2022-06-14 19:15:36 +03:00 · d0134bdbe9
commit d0134bdbe9
parent 58e0715714
9 changed files with 1724 additions and 55 deletions
--- a/kmath-core/src/commonMain/kotlin/space/kscience/kmath/operations/bufferOperation.kt
+++ b/kmath-core/src/commonMain/kotlin/space/kscience/kmath/operations/bufferOperation.kt
@ -91,6 +91,15 @@ public inline fun <T : Any, R> Buffer<T>.fold(initial: R, operation: (acc: R, T)
    return accumulator
 }
 /**
 * Fold given buffer according to indexed [operation]
 */
 public inline fun <T : Any, R> Buffer<T>.foldIndexed(initial: R, operation: (index: Int, acc: R, T) -> R): R {
    var accumulator = initial
    for (index in this.indices) accumulator = operation(index, accumulator, get(index))
    return accumulator
 }
 /**
 * Zip two buffers using given [transform].
 */
--- a/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/ListPolynomial.kt
+++ b/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/ListPolynomial.kt
@ -48,8 +48,8 @@ public data class ListPolynomial<C>(
 }
 /**
- * Arithmetic context for univariate polynomials with coefficients stored as a [List] constructed with the given [ring]
+ * Arithmetic context for univariate polynomials with coefficients stored as a [List] constructed with the provided
- * of constants.
+ * [ring] of constants.
 *
 * @param C the type of constants. Polynomials have them a coefficients in their terms.
 * @param A type of provided underlying ring of constants. It's [Ring] of [C].
@ -313,6 +313,10 @@ public open class ListPolynomialSpace<C, A : Ring<C>>(
            }
        )
    }
    /**
     * Raises [arg] to the integer power [exponent].
     */ // TODO: To optimize boxing
    override fun power(arg: ListPolynomial<C>, exponent: UInt): ListPolynomial<C> = super.power(arg, exponent)
    /**
     * Instance of zero polynomial (zero of the polynomial ring).
@ -332,42 +336,42 @@ public open class ListPolynomialSpace<C, A : Ring<C>>(
    // TODO: When context receivers will be ready move all of this substitutions and invocations to utilities with
    //  [ListPolynomialSpace] as a context receiver
    /**
-     * Evaluates value of [this] polynomial on provided argument.
+     * Evaluates value of [this] polynomial on provided [argument].
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListPolynomial<C>.substitute(argument: C): C = this.substitute(ring, argument)
+    public inline fun ListPolynomial<C>.substitute(argument: C): C = substitute(ring, argument)
    /**
     * Substitutes provided polynomial [argument] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListPolynomial<C>.substitute(argument: ListPolynomial<C>): ListPolynomial<C> = this.substitute(ring, argument)
+    public inline fun ListPolynomial<C>.substitute(argument: ListPolynomial<C>): ListPolynomial<C> = substitute(ring, argument)
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListPolynomial<C>.asFunction(): (C) -> C = { this.substitute(ring, it) }
+    public inline fun ListPolynomial<C>.asFunction(): (C) -> C = asFunctionOver(ring)
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListPolynomial<C>.asFunctionOfConstant(): (C) -> C = { this.substitute(ring, it) }
+    public inline fun ListPolynomial<C>.asFunctionOfConstant(): (C) -> C = asFunctionOfConstantOver(ring)
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListPolynomial<C>.asFunctionOfPolynomial(): (ListPolynomial<C>) -> ListPolynomial<C> = { this.substitute(ring, it) }
+    public inline fun ListPolynomial<C>.asFunctionOfPolynomial(): (ListPolynomial<C>) -> ListPolynomial<C> = asFunctionOfPolynomialOver(ring)
    /**
     * Evaluates value of [this] polynomial on provided [argument].
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline operator fun ListPolynomial<C>.invoke(argument: C): C = this.substitute(ring, argument)
+    public inline operator fun ListPolynomial<C>.invoke(argument: C): C = substitute(ring, argument)
    /**
     * Evaluates value of [this] polynomial on provided [argument].
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline operator fun ListPolynomial<C>.invoke(argument: ListPolynomial<C>): ListPolynomial<C> = this.substitute(ring, argument)
+    public inline operator fun ListPolynomial<C>.invoke(argument: ListPolynomial<C>): ListPolynomial<C> = substitute(ring, argument)
 }
 /**
--- a/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/ListRationalFunction.kt
+++ b/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/ListRationalFunction.kt
@ -9,7 +9,7 @@ import space.kscience.kmath.operations.Ring
 /**
- * Represents rational function that stores its numerator and denominator as [ListPolynomial]s.
+ * Represents univariate rational function that stores its numerator and denominator as [ListPolynomial]s.
 */
 public data class ListRationalFunction<C>(
    public override val numerator: ListPolynomial<C>,
@ -56,82 +56,82 @@ public class ListRationalFunctionSpace<C, A : Ring<C>> (
     * Evaluates value of [this] polynomial on provided argument.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListPolynomial<C>.substitute(argument: C): C = this.substitute(ring, argument)
+    public inline fun ListPolynomial<C>.substitute(argument: C): C = substitute(ring, argument)
    /**
     * Substitutes provided polynomial [argument] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListPolynomial<C>.substitute(argument: ListPolynomial<C>): ListPolynomial<C> = this.substitute(ring, argument)
+    public inline fun ListPolynomial<C>.substitute(argument: ListPolynomial<C>): ListPolynomial<C> = substitute(ring, argument)
    /**
     * Substitutes provided rational function [argument] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListPolynomial<C>.substitute(argument: ListRationalFunction<C>): ListRationalFunction<C> = this.substitute(ring, argument)
+    public inline fun ListPolynomial<C>.substitute(argument: ListRationalFunction<C>): ListRationalFunction<C> = substitute(ring, argument)
    /**
     * Substitutes provided polynomial [argument] into [this] rational function.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListRationalFunction<C>.substitute(argument: ListPolynomial<C>): ListRationalFunction<C> = this.substitute(ring, argument)
+    public inline fun ListRationalFunction<C>.substitute(argument: ListPolynomial<C>): ListRationalFunction<C> = substitute(ring, argument)
    /**
     * Substitutes provided rational function [argument] into [this] rational function.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListRationalFunction<C>.substitute(argument: ListRationalFunction<C>): ListRationalFunction<C> = this.substitute(ring, argument)
+    public inline fun ListRationalFunction<C>.substitute(argument: ListRationalFunction<C>): ListRationalFunction<C> = substitute(ring, argument)
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListPolynomial<C>.asFunction(): (C) -> C = { this.substitute(ring, it) }
+    public inline fun ListPolynomial<C>.asFunction(): (C) -> C = { substitute(ring, it) }
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListPolynomial<C>.asFunctionOfConstant(): (C) -> C = { this.substitute(ring, it) }
+    public inline fun ListPolynomial<C>.asFunctionOfConstant(): (C) -> C = { substitute(ring, it) }
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListPolynomial<C>.asFunctionOfPolynomial(): (ListPolynomial<C>) -> ListPolynomial<C> = { this.substitute(ring, it) }
+    public inline fun ListPolynomial<C>.asFunctionOfPolynomial(): (ListPolynomial<C>) -> ListPolynomial<C> = { substitute(ring, it) }
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListPolynomial<C>.asFunctionOfRationalFunction(): (ListRationalFunction<C>) -> ListRationalFunction<C> = { this.substitute(ring, it) }
+    public inline fun ListPolynomial<C>.asFunctionOfRationalFunction(): (ListRationalFunction<C>) -> ListRationalFunction<C> = { substitute(ring, it) }
    /**
     * Represent [this] rational function as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListRationalFunction<C>.asFunctionOfPolynomial(): (ListPolynomial<C>) -> ListRationalFunction<C> = { this.substitute(ring, it) }
+    public inline fun ListRationalFunction<C>.asFunctionOfPolynomial(): (ListPolynomial<C>) -> ListRationalFunction<C> = { substitute(ring, it) }
    /**
     * Represent [this] rational function as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline fun ListRationalFunction<C>.asFunctionOfRationalFunction(): (ListRationalFunction<C>) -> ListRationalFunction<C> = { this.substitute(ring, it) }
+    public inline fun ListRationalFunction<C>.asFunctionOfRationalFunction(): (ListRationalFunction<C>) -> ListRationalFunction<C> = { substitute(ring, it) }
    /**
     * Evaluates value of [this] polynomial on provided argument.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline operator fun ListPolynomial<C>.invoke(argument: C): C = this.substitute(ring, argument)
+    public inline operator fun ListPolynomial<C>.invoke(argument: C): C = substitute(ring, argument)
    /**
     * Evaluates value of [this] polynomial on provided argument.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline operator fun ListPolynomial<C>.invoke(argument: ListPolynomial<C>): ListPolynomial<C> = this.substitute(ring, argument)
+    public inline operator fun ListPolynomial<C>.invoke(argument: ListPolynomial<C>): ListPolynomial<C> = substitute(ring, argument)
    /**
     * Evaluates value of [this] polynomial on provided argument.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline operator fun ListPolynomial<C>.invoke(argument: ListRationalFunction<C>): ListRationalFunction<C> = this.substitute(ring, argument)
+    public inline operator fun ListPolynomial<C>.invoke(argument: ListRationalFunction<C>): ListRationalFunction<C> = substitute(ring, argument)
    /**
     * Evaluates value of [this] rational function on provided argument.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline operator fun ListRationalFunction<C>.invoke(argument: ListPolynomial<C>): ListRationalFunction<C> = this.substitute(ring, argument)
+    public inline operator fun ListRationalFunction<C>.invoke(argument: ListPolynomial<C>): ListRationalFunction<C> = substitute(ring, argument)
    /**
     * Evaluates value of [this] rational function on provided argument.
     */
    @Suppress("NOTHING_TO_INLINE")
-    public inline operator fun ListRationalFunction<C>.invoke(argument: ListRationalFunction<C>): ListRationalFunction<C> = this.substitute(ring, argument)
+    public inline operator fun ListRationalFunction<C>.invoke(argument: ListRationalFunction<C>): ListRationalFunction<C> = substitute(ring, argument)
 }
--- a/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/NumberedPolynomial.kt
+++ b/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/NumberedPolynomial.kt
@ -0,0 +1,429 @@
 /*
 * Copyright 2018-2021 KMath contributors.
 * Use of this source code is governed by the Apache 2.0 license that can be found in the license/LICENSE.txt file.
 */
 package space.kscience.kmath.functions
 import space.kscience.kmath.operations.Ring
 import space.kscience.kmath.structures.Buffer
 import kotlin.jvm.JvmName
 import kotlin.math.max
 /**
 * Represents univariate polynomial that stores its coefficients in a [Map] and terms' signatures in a [List].
 *
 * @param C the type of constants.
 */
 public data class NumberedPolynomial<C>
@PublishedApi
 internal constructor(
    /**
     * Map that contains coefficients of the polynomial. Every monomial `a x_1^{d_1} ... x_n^{d_n}` is stored as pair
     * "key-value" in the map, where the value is the coefficients `a` and the key is a list that associates index of
     * every variable in the monomial with multiplicity of the variable occurring in the monomial. For example
     * coefficients of a polynomial `5 x_1^2 x_3^3 - 6 x_2` can be represented as
     * ```
     * mapOf(
     *      listOf(2, 0, 3) to 5, // 5 x_1^2 x_3^3 +
     *      listOf(0, 1) to (-6), // (-6) x_2^1
     * )
     * ```
     * and also as
     * ```
     * mapOf(
     *      listOf(2, 0, 3) to 5, // 5 x_1^2 x_3^3 +
     *      listOf(0, 1) to (-6), // (-6) x_2^1
     *      listOf(0, 1, 1) to 0, // 0 x_2^1 x_3^1
     * )
     * ```
     * It is not prohibited to put extra zero monomials into the map (as for `0 x_2 x_3` in the example). But the
     * bigger the coefficients map the worse performance of arithmetical operations performed on it. Thus, it is
     * recommended not to put (or even to remove) extra (or useless) monomials in the coefficients map.
     */
    public val coefficients: Map<List<UInt>, C>
 ) : Polynomial<C> {
    override fun toString(): String = "NumberedPolynomial$coefficients"
 }
 /**
 * Arithmetic context for multivariate polynomials with coefficients stored as a [Map] and terms' signatures stored as a
 * [List] constructed with the provided [ring] of constants.
 *
 * @param C the type of constants. Polynomials have them a coefficients in their terms.
 * @param A type of provided underlying ring of constants. It's [Ring] of [C].
 * @param ring underlying ring of constants of type [A].
 */
 public class NumberedPolynomialSpace<C, A : Ring<C>>(
    public override val ring: A,
 ) : PolynomialSpaceOverRing<C, NumberedPolynomial<C>, A> {
    /**
     * Returns sum of the polynomial and the integer represented as a polynomial.
     *
     * The operation is equivalent to adding [other] copies of unit polynomial to [this].
     */
    public override operator fun NumberedPolynomial<C>.plus(other: Int): NumberedPolynomial<C> =
        if (other == 0) this
        else
            NumberedPolynomialAsIs(
                coefficients
                    .toMutableMap()
                    .apply {
                        val degs = emptyList<UInt>()
                        this[degs] = getOrElse(degs) { constantZero } + other
                    }
            )
    /**
     * Returns difference between the polynomial and the integer represented as a polynomial.
     *
     * The operation is equivalent to subtraction [other] copies of unit polynomial from [this].
     */
    public override operator fun NumberedPolynomial<C>.minus(other: Int): NumberedPolynomial<C> =
        if (other == 0) this
        else
            NumberedPolynomialAsIs(
                coefficients
                    .toMutableMap()
                    .apply {
                        val degs = emptyList<UInt>()
                        this[degs] = getOrElse(degs) { constantZero } - other
                    }
            )
    /**
     * Returns product of the polynomial and the integer represented as a polynomial.
     *
     * The operation is equivalent to sum of [other] copies of [this].
     */
    public override operator fun NumberedPolynomial<C>.times(other: Int): NumberedPolynomial<C> =
        if (other == 0) zero
        else NumberedPolynomialAsIs(
            coefficients
                .toMutableMap()
                .apply {
                    for (degs in keys) this[degs] = this[degs]!! * other
                }
        )
    /**
     * Returns sum of the integer represented as a polynomial and the polynomial.
     *
     * The operation is equivalent to adding [this] copies of unit polynomial to [other].
     */
    public override operator fun Int.plus(other: NumberedPolynomial<C>): NumberedPolynomial<C> =
        if (this == 0) other
        else
            NumberedPolynomialAsIs(
                other.coefficients
                    .toMutableMap()
                    .apply {
                        val degs = emptyList<UInt>()
                        this[degs] = this@plus + getOrElse(degs) { constantZero }
                    }
            )
    /**
     * Returns difference between the integer represented as a polynomial and the polynomial.
     *
     * The operation is equivalent to subtraction [this] copies of unit polynomial from [other].
     */
    public override operator fun Int.minus(other: NumberedPolynomial<C>): NumberedPolynomial<C> =
        if (this == 0) other
        else
            NumberedPolynomialAsIs(
                other.coefficients
                    .toMutableMap()
                    .apply {
                        val degs = emptyList<UInt>()
                        this[degs] = this@minus - getOrElse(degs) { constantZero }
                    }
            )
    /**
     * Returns product of the integer represented as a polynomial and the polynomial.
     *
     * The operation is equivalent to sum of [this] copies of [other].
     */
    public override operator fun Int.times(other: NumberedPolynomial<C>): NumberedPolynomial<C> =
        if (this == 0) zero
        else NumberedPolynomialAsIs(
            other.coefficients
                .toMutableMap()
                .apply {
                    for (degs in keys) this[degs] = this@times * this[degs]!!
                }
        )
    /**
     * Converts the integer [value] to polynomial.
     */
    public override fun number(value: Int): NumberedPolynomial<C> = number(constantNumber(value))
    /**
     * Returns sum of the constant represented as a polynomial and the polynomial.
     */
    override operator fun C.plus(other: NumberedPolynomial<C>): NumberedPolynomial<C> =
        with(other.coefficients) {
            if (isEmpty()) NumberedPolynomialAsIs(mapOf(emptyList<UInt>() to this@plus))
            else NumberedPolynomialAsIs(
                toMutableMap()
                    .apply {
                        val degs = emptyList<UInt>()
                        this[degs] = this@plus + getOrElse(degs) { constantZero }
                    }
            )
        }
    /**
     * Returns difference between the constant represented as a polynomial and the polynomial.
     */
    override operator fun C.minus(other: NumberedPolynomial<C>): NumberedPolynomial<C> =
        with(other.coefficients) {
            if (isEmpty()) NumberedPolynomialAsIs(mapOf(emptyList<UInt>() to this@minus))
            else NumberedPolynomialAsIs(
                toMutableMap()
                    .apply {
                        forEach { (degs, c) -> if(degs.isNotEmpty()) this[degs] = -c }
                        val degs = emptyList<UInt>()
                        this[degs] = this@minus - getOrElse(degs) { constantZero }
                    }
            )
        }
    /**
     * Returns product of the constant represented as a polynomial and the polynomial.
     */
    override operator fun C.times(other: NumberedPolynomial<C>): NumberedPolynomial<C> =
        NumberedPolynomialAsIs(
            other.coefficients
                .toMutableMap()
                .apply {
                    for (degs in keys) this[degs] = this@times * this[degs]!!
                }
        )
    /**
     * Returns sum of the constant represented as a polynomial and the polynomial.
     */
    override operator fun NumberedPolynomial<C>.plus(other: C): NumberedPolynomial<C> =
        with(coefficients) {
            if (isEmpty()) NumberedPolynomialAsIs(mapOf(emptyList<UInt>() to other))
            else NumberedPolynomialAsIs(
                toMutableMap()
                    .apply {
                        val degs = emptyList<UInt>()
                        this[degs] = getOrElse(degs) { constantZero } + other
                    }
            )
        }
    /**
     * Returns difference between the constant represented as a polynomial and the polynomial.
     */
    override operator fun NumberedPolynomial<C>.minus(other: C): NumberedPolynomial<C> =
        with(coefficients) {
            if (isEmpty()) NumberedPolynomialAsIs(mapOf(emptyList<UInt>() to other))
            else NumberedPolynomialAsIs(
                toMutableMap()
                    .apply {
                        val degs = emptyList<UInt>()
                        this[degs] = getOrElse(degs) { constantZero } - other
                    }
            )
        }
    /**
     * Returns product of the constant represented as a polynomial and the polynomial.
     */
    override operator fun NumberedPolynomial<C>.times(other: C): NumberedPolynomial<C> =
        NumberedPolynomialAsIs(
            coefficients
                .toMutableMap()
                .apply {
                    for (degs in keys) this[degs] = this[degs]!! * other
                }
        )
    /**
     * Converts the constant [value] to polynomial.
     */
    public override fun number(value: C): NumberedPolynomial<C> =
        NumberedPolynomialAsIs(mapOf(emptyList<UInt>() to value))
    /**
     * Returns negation of the polynomial.
     */
    override fun NumberedPolynomial<C>.unaryMinus(): NumberedPolynomial<C> =
        NumberedPolynomialAsIs(
            coefficients.mapValues { -it.value }
        )
    /**
     * Returns sum of the polynomials.
     */
    override operator fun NumberedPolynomial<C>.plus(other: NumberedPolynomial<C>): NumberedPolynomial<C> =
        NumberedPolynomialAsIs(
            buildMap(coefficients.size + other.coefficients.size) {
                other.coefficients.mapValuesTo(this) { it.value }
                other.coefficients.mapValuesTo(this) { (key, value) -> if (key in this) this[key]!! + value else value }
            }
        )
    /**
     * Returns difference of the polynomials.
     */
    override operator fun NumberedPolynomial<C>.minus(other: NumberedPolynomial<C>): NumberedPolynomial<C> =
        NumberedPolynomialAsIs(
            buildMap(coefficients.size + other.coefficients.size) {
                other.coefficients.mapValuesTo(this) { it.value }
                other.coefficients.mapValuesTo(this) { (key, value) -> if (key in this) this[key]!! - value else -value }
            }
        )
    /**
     * Returns product of the polynomials.
     */
    override operator fun NumberedPolynomial<C>.times(other: NumberedPolynomial<C>): NumberedPolynomial<C> =
        NumberedPolynomialAsIs(
            buildMap(coefficients.size * other.coefficients.size) {
                for ((degs1, c1) in coefficients) for ((degs2, c2) in other.coefficients) {
                    val degs =
                        (0..max(degs1.lastIndex, degs2.lastIndex))
                            .map { degs1.getOrElse(it) { 0U } + degs2.getOrElse(it) { 0U } }
                    val c = c1 * c2
                    this[degs] = if (degs in this) this[degs]!! + c else c
                }
            }
        )
    /**
     * Raises [arg] to the integer power [exponent].
     */ // TODO: To optimize boxing
    override fun power(arg: NumberedPolynomial<C>, exponent: UInt): NumberedPolynomial<C> = super.power(arg, exponent)
    /**
     * Instance of zero polynomial (zero of the polynomial ring).
     */
    override val zero: NumberedPolynomial<C> = NumberedPolynomialAsIs(emptyMap())
    /**
     * Instance of unit polynomial (unit of the polynomial ring).
     */
    override val one: NumberedPolynomial<C> by lazy {
        NumberedPolynomialAsIs(
            mapOf(
                emptyList<UInt>() to constantOne // 1 * x_1^0 * x_2^0 * ...
            )
        )
    }
    /**
     * Maximal index (ID) of variable occurring in the polynomial with positive power. If there is no such variable,
     * the result is `-1`.
     */
    public val NumberedPolynomial<C>.lastVariable: Int
        get() = coefficients.entries.maxOfOrNull { (degs, _) -> degs.lastIndex } ?: -1
    /**
     * Degree of the polynomial, [see also](https://en.wikipedia.org/wiki/Degree_of_a_polynomial). If the polynomial is
     * zero, degree is -1.
     */
    override val NumberedPolynomial<C>.degree: Int
        get() = coefficients.entries.maxOfOrNull { (degs, _) -> degs.sum().toInt() } ?: -1
    /**
     * List that associates indices of variables (that appear in the polynomial in positive exponents) with their most
     * exponents in which the variables are appeared in the polynomial.
     *
     * As consequence all values in the list are non-negative integers. Also, if the polynomial is constant, the list is empty.
     * And last index of the list is [lastVariable].
     */
    public val NumberedPolynomial<C>.degrees: List<UInt>
        get() =
            MutableList(lastVariable + 1) { 0u }.apply {
                coefficients.entries.forEach { (degs, _) ->
                    degs.forEachIndexed { index, deg ->
                        this[index] = max(this[index], deg)
                    }
                }
            }
    /**
     * Counts degree of the polynomial by the specified [variable].
     */
    public fun NumberedPolynomial<C>.degreeBy(variable: Int): UInt =
        coefficients.entries.maxOfOrNull { (degs, _) -> degs.getOrElse(variable) { 0u } } ?: 0u
    /**
     * Counts degree of the polynomial by the specified [variables].
     */
    public fun NumberedPolynomial<C>.degreeBy(variables: Collection<Int>): UInt =
        coefficients.entries.maxOfOrNull { (degs, _) ->
            degs.withIndex().filter { (index, _) -> index in variables }.sumOf { it.value }
        } ?: 0u
    /**
     * Count of variables occurring in the polynomial with positive power. If there is no such variable,
     * the result is `0`.
     */
    public val NumberedPolynomial<C>.countOfVariables: Int
        get() =
            MutableList(lastVariable + 1) { false }.apply {
                coefficients.entries.forEach { (degs, _) ->
                    degs.forEachIndexed { index, deg ->
                        if (deg != 0u) this[index] = true
                    }
                }
            }.count { it }
    // TODO: When context receivers will be ready move all of this substitutions and invocations to utilities with
    //  [ListPolynomialSpace] as a context receiver
    /**
     * Substitutes provided arguments [arguments] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.substitute(arguments: Map<Int, C>): NumberedPolynomial<C> = substitute(ring, arguments)
    /**
     * Substitutes provided arguments [arguments] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    @JvmName("substitutePolynomial")
    public inline fun NumberedPolynomial<C>.substitute(arguments: Map<Int, NumberedPolynomial<C>>) : NumberedPolynomial<C> = substitute(ring, arguments)
    /**
     * Substitutes provided arguments [arguments] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.substitute(arguments: Buffer<C>): NumberedPolynomial<C> = substitute(ring, arguments)
    /**
     * Substitutes provided arguments [arguments] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    @JvmName("substitutePolynomial")
    public inline fun NumberedPolynomial<C>.substitute(arguments: Buffer<NumberedPolynomial<C>>) : NumberedPolynomial<C> = substitute(ring, arguments)
    /**
     * Substitutes provided arguments [arguments] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.substituteFully(arguments: Buffer<C>): C = this.substituteFully(ring, arguments)
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.asFunction(): (Buffer<C>) -> C = asFunctionOver(ring)
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.asFunctionOfConstant(): (Buffer<C>) -> C = asFunctionOfConstantOver(ring)
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.asFunctionOfPolynomial(): (Buffer<NumberedPolynomial<C>>) -> NumberedPolynomial<C> = asFunctionOfPolynomialOver(ring)
    /**
     * Evaluates value of [this] polynomial on provided [arguments].
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline operator fun NumberedPolynomial<C>.invoke(arguments: Buffer<C>): C = substituteFully(ring, arguments)
    /**
     * Substitutes provided [arguments] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    @JvmName("invokePolynomial")
    public inline operator fun NumberedPolynomial<C>.invoke(arguments: Buffer<NumberedPolynomial<C>>): NumberedPolynomial<C> = substitute(ring, arguments)
 }
--- a/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/NumberedRationalFunction.kt
+++ b/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/NumberedRationalFunction.kt
@ -0,0 +1,239 @@
 /*
 * Copyright 2018-2021 KMath contributors.
 * Use of this source code is governed by the Apache 2.0 license that can be found in the license/LICENSE.txt file.
 */
 package space.kscience.kmath.functions
 import space.kscience.kmath.operations.Ring
 import space.kscience.kmath.operations.invoke
 import space.kscience.kmath.structures.Buffer
 import kotlin.jvm.JvmName
 import kotlin.math.max
 /**
 * Represents multivariate rational function that stores its numerator and denominator as [NumberedPolynomial]s.
 */
 public class NumberedRationalFunction<C> internal constructor(
    public override val numerator: NumberedPolynomial<C>,
    public override val denominator: NumberedPolynomial<C>
 ) : RationalFunction<C, NumberedPolynomial<C>> {
    override fun toString(): String = "NumberedRationalFunction${numerator.coefficients}/${denominator.coefficients}"
 }
 /**
 * Arithmetic context for univariate rational functions with numerator and denominator represented as [NumberedPolynomial]s.
 *
 * @param C the type of constants. Polynomials have them a coefficients in their terms.
 * @param A type of provided underlying ring of constants. It's [Ring] of [C].
 * @param ring underlying ring of constants of type [A].
 */
 public class NumberedRationalFunctionSpace<C, A: Ring<C>> (
    public val ring: A,
 ) :
    RationalFunctionalSpaceOverPolynomialSpace<
            C,
            NumberedPolynomial<C>,
            NumberedRationalFunction<C>,
            NumberedPolynomialSpace<C, A>,
            >,
    PolynomialSpaceOfFractions<
            C,
            NumberedPolynomial<C>,
            NumberedRationalFunction<C>,
            >() {
    /**
     * Underlying polynomial ring. Its polynomial operations are inherited by local polynomial operations.
     */
    public override val polynomialRing : NumberedPolynomialSpace<C, A> = NumberedPolynomialSpace(ring)
    /**
     * Constructor of rational functions (of type [NumberedRationalFunction]) from numerator and denominator (of type [NumberedPolynomial]).
     */
    protected override fun constructRationalFunction(
        numerator: NumberedPolynomial<C>,
        denominator: NumberedPolynomial<C>
    ): NumberedRationalFunction<C> =
        NumberedRationalFunction(numerator, denominator)
    /**
     * Maximal index (ID) of variable occurring in the polynomial with positive power. If there is no such variable,
     * the result is `-1`.
     */
    public val NumberedPolynomial<C>.lastVariable: Int get() = polynomialRing { lastVariable }
    /**
     * List that associates indices of variables (that appear in the polynomial in positive exponents) with their most
     * exponents in which the variables are appeared in the polynomial.
     *
     * As consequence all values in the list are non-negative integers. Also, if the polynomial is constant, the list is empty.
     * And last index of the list is [lastVariable].
     */
    public val NumberedPolynomial<C>.degrees: List<UInt> get() = polynomialRing { degrees }
    /**
     * Counts degree of the polynomial by the specified [variable].
     */
    public fun NumberedPolynomial<C>.degreeBy(variable: Int): UInt = polynomialRing { degreeBy(variable) }
    /**
     * Counts degree of the polynomial by the specified [variables].
     */
    public fun NumberedPolynomial<C>.degreeBy(variables: Collection<Int>): UInt = polynomialRing { degreeBy(variables) }
    /**
     * Count of variables occurring in the polynomial with positive power. If there is no such variable,
     * the result is `0`.
     */
    public val NumberedPolynomial<C>.countOfVariables: Int get() = polynomialRing { countOfVariables }
    /**
     * Count of all variables that appear in the polynomial in positive exponents.
     */
    public val NumberedRationalFunction<C>.lastVariable: Int
        get() = polynomialRing { max(numerator.lastVariable, denominator.lastVariable) }
    /**
     * Count of variables occurring in the rational function with positive power. If there is no such variable,
     * the result is `0`.
     */
    public val NumberedRationalFunction<C>.countOfVariables: Int
        get() =
            MutableList(lastVariable + 1) { false }.apply {
                numerator.coefficients.entries.forEach { (degs, _) ->
                    degs.forEachIndexed { index, deg ->
                        if (deg != 0u) this[index] = true
                    }
                }
                denominator.coefficients.entries.forEach { (degs, _) ->
                    degs.forEachIndexed { index, deg ->
                        if (deg != 0u) this[index] = true
                    }
                }
            }.count { it }
    // TODO: When context receivers will be ready move all of this substitutions and invocations to utilities with
    //  [ListPolynomialSpace] as a context receiver
    /**
     * Substitutes provided constant [argument] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.substitute(argument: Map<Int, C>): NumberedPolynomial<C> = substitute(ring, argument)
    /**
     * Substitutes provided polynomial [argument] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.substitute(argument: Map<Int, NumberedPolynomial<C>>): NumberedPolynomial<C> = substitute(ring, argument)
    /**
     * Substitutes provided rational function [argument] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.substitute(argument: Map<Int, NumberedRationalFunction<C>>): NumberedRationalFunction<C> = substitute(ring, argument)
    /**
     * Substitutes provided constant [argument] into [this] rational function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedRationalFunction<C>.substitute(argument: Map<Int, C>): NumberedRationalFunction<C> = substitute(ring, argument)
    /**
     * Substitutes provided polynomial [argument] into [this] rational function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedRationalFunction<C>.substitute(argument: Map<Int, NumberedPolynomial<C>>): NumberedRationalFunction<C> = substitute(ring, argument)
    /**
     * Substitutes provided rational function [argument] into [this] rational function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedRationalFunction<C>.substitute(argument: Map<Int, NumberedRationalFunction<C>>): NumberedRationalFunction<C> = substitute(ring, argument)
    /**
     * Substitutes provided constant [argument] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.substitute(argument: Buffer<C>): NumberedPolynomial<C> = substitute(ring, argument)
    /**
     * Substitutes provided polynomial [argument] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.substitute(argument: Buffer<NumberedPolynomial<C>>): NumberedPolynomial<C> = substitute(ring, argument)
    /**
     * Substitutes provided rational function [argument] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.substitute(argument: Buffer<NumberedRationalFunction<C>>): NumberedRationalFunction<C> = substitute(ring, argument)
    /**
     * Substitutes provided constant [argument] into [this] rational function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedRationalFunction<C>.substitute(argument: Buffer<C>): NumberedRationalFunction<C> = substitute(ring, argument)
    /**
     * Substitutes provided polynomial [arguments] into [this] rational function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedRationalFunction<C>.substitute(arguments: Buffer<NumberedPolynomial<C>>): NumberedRationalFunction<C> = substitute(ring, arguments)
    /**
     * Substitutes provided rational function [arguments] into [this] rational function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedRationalFunction<C>.substitute(arguments: Buffer<NumberedRationalFunction<C>>): NumberedRationalFunction<C> = substitute(ring, arguments)
    /**
     * Substitutes provided constant [arguments] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.substituteFully(arguments: Buffer<C>): C = substituteFully(ring, arguments)
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.asFunction(): (Buffer<C>) -> C = asFunctionOver(ring)
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.asFunctionOfConstant(): (Buffer<C>) -> C = asFunctionOfConstantOver(ring)
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.asFunctionOfPolynomial(): (Buffer<NumberedPolynomial<C>>) -> NumberedPolynomial<C> = asFunctionOfPolynomialOver(ring)
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedPolynomial<C>.asFunctionOfRationalFunction(): (Buffer<NumberedRationalFunction<C>>) -> NumberedRationalFunction<C> = asFunctionOfRationalFunctionOver(ring)
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedRationalFunction<C>.asFunctionOfPolynomial(): (Buffer<NumberedPolynomial<C>>) -> NumberedRationalFunction<C> = asFunctionOfPolynomialOver(ring)
    /**
     * Represent [this] polynomial as a regular context-less function.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline fun NumberedRationalFunction<C>.asFunctionOfRationalFunction(): (Buffer<NumberedRationalFunction<C>>) -> NumberedRationalFunction<C> = asFunctionOfRationalFunctionOver(ring)
    /**
     * Evaluates value of [this] polynomial on provided [arguments].
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline operator fun NumberedPolynomial<C>.invoke(arguments: Buffer<C>): C = substituteFully(ring, arguments)
    /**
     * Substitutes provided [arguments] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    @JvmName("invokePolynomial")
    public inline operator fun NumberedPolynomial<C>.invoke(arguments: Buffer<NumberedPolynomial<C>>): NumberedPolynomial<C> = substitute(ring, arguments)
    /**
     * Substitutes provided [arguments] into [this] polynomial.
     */
    @Suppress("NOTHING_TO_INLINE")
    @JvmName("invokePolynomial")
    public inline operator fun NumberedPolynomial<C>.invoke(arguments: Buffer<NumberedRationalFunction<C>>): NumberedRationalFunction<C> = substitute(ring, arguments)
    /**
     * Substitutes provided [arguments] into [this] rational function.
     */
    @Suppress("NOTHING_TO_INLINE")
    @JvmName("invokePolynomial")
    public inline operator fun NumberedRationalFunction<C>.invoke(arguments: Buffer<NumberedPolynomial<C>>): NumberedRationalFunction<C> = substitute(ring, arguments)
    /**
     * Substitutes provided [arguments] into [this] rational function.
     */
    @Suppress("NOTHING_TO_INLINE")
    @JvmName("invokePolynomial")
    public inline operator fun NumberedRationalFunction<C>.invoke(arguments: Buffer<NumberedRationalFunction<C>>): NumberedRationalFunction<C> = substitute(ring, arguments)
 }
--- a/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/RationalFunction.kt
+++ b/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/RationalFunction.kt
@ -1076,6 +1076,14 @@ public abstract class PolynomialSpaceOfFractions<
            numerator * other.denominator,
            denominator * other.numerator
        )
    /**
     * Raises [arg] to the integer power [exponent].
     */
    public override fun power(arg: R, exponent: UInt): R =
        constructRationalFunction(
            power(arg.numerator, exponent),
            power(arg.denominator, exponent),
        )
    /**
     * Instance of zero rational function (zero of the rational functions ring).
--- a/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/listUtil.kt
+++ b/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/listUtil.kt
@ -147,12 +147,17 @@ public fun <C, A : Ring<C>> ListPolynomial<C>.asFunctionOver(ring: A): (C) -> C
 /**
 * Represent [this] polynomial as a regular context-less function.
 */
-public fun <C, A : Ring<C>> ListPolynomial<C>.asPolynomialFunctionOver(ring: A): (ListPolynomial<C>) -> ListPolynomial<C> = { substitute(ring, it) }
+public fun <C, A : Ring<C>> ListPolynomial<C>.asFunctionOfConstantOver(ring: A): (C) -> C = { substitute(ring, it) }
 /**
 * Represent [this] polynomial as a regular context-less function.
 */
-public fun <C, A : Ring<C>> ListPolynomial<C>.asFunctionOfRationalFunctionOver(ring: A): (ListPolynomial<C>) -> ListPolynomial<C> = { substitute(ring, it) }
+public fun <C, A : Ring<C>> ListPolynomial<C>.asFunctionOfPolynomialOver(ring: A): (ListPolynomial<C>) -> ListPolynomial<C> = { substitute(ring, it) }
 /**
 * Represent [this] polynomial as a regular context-less function.
 */
 public fun <C, A : Ring<C>> ListPolynomial<C>.asFunctionOfRationalFunctionOver(ring: A): (ListRationalFunction<C>) -> ListRationalFunction<C> = { substitute(ring, it) }
 /**
 * Represent [this] rational function as a regular context-less function.
@ -162,12 +167,17 @@ public fun <C, A : Field<C>> ListRationalFunction<C>.asFunctionOver(ring: A): (C
 /**
 * Represent [this] rational function as a regular context-less function.
 */
-public fun <C, A : Ring<C>> ListRationalFunction<C>.asPolynomialFunctionOver(ring: A): (ListPolynomial<C>) -> ListRationalFunction<C> = { substitute(ring, it) }
+public fun <C, A : Field<C>> ListRationalFunction<C>.asFunctionOfConstantOver(ring: A): (C) -> C = { substitute(ring, it) }
 /**
 * Represent [this] rational function as a regular context-less function.
 */
-public fun <C, A : Ring<C>> ListRationalFunction<C>.asFunctionOfRationalFunctionOver(ring: A): (ListPolynomial<C>) -> ListRationalFunction<C> = { substitute(ring, it) }
+public fun <C, A : Ring<C>> ListRationalFunction<C>.asFunctionOfPolynomialOver(ring: A): (ListPolynomial<C>) -> ListRationalFunction<C> = { substitute(ring, it) }
 /**
 * Represent [this] rational function as a regular context-less function.
 */
 public fun <C, A : Ring<C>> ListRationalFunction<C>.asFunctionOfRationalFunctionOver(ring: A): (ListRationalFunction<C>) -> ListRationalFunction<C> = { substitute(ring, it) }
 /**
 * Returns algebraic derivative of received polynomial.
@ -242,27 +252,4 @@ public fun <C : Comparable<C>> ListPolynomial<C>.integrate(
 ): C = ring {
    val antiderivative = antiderivative(ring)
    antiderivative.substitute(ring, range.endInclusive) - antiderivative.substitute(ring, range.start)
-}
+}
 /**
 * Returns algebraic derivative of received rational function.
 */
@UnstableKMathAPI
 public fun <C, A> ListRationalFunction<C>.derivative(
    ring: A,
 ): ListRationalFunction<C> where  A : Ring<C>, A : NumericAlgebra<C> = ring.listRationalFunctionSpace {
    ListRationalFunction(
        numerator.derivative(ring) * denominator - numerator * denominator.derivative(ring),
        denominator * denominator
    )
 }
 /**
 * Returns algebraic derivative of received rational function of specified [order]. The [order] should be non-negative integer.
 */
@UnstableKMathAPI
 public tailrec fun <C, A> ListRationalFunction<C>.nthDerivative(
    ring: A,
    order: Int,
 ): ListRationalFunction<C> where A : Ring<C>, A : NumericAlgebra<C> =
    if (order == 0) this else derivative(ring).nthDerivative(ring, order - 1)
--- a/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/numberedConstructors.kt
+++ b/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/numberedConstructors.kt
@ -0,0 +1,478 @@
 /*
 * Copyright 2018-2021 KMath contributors.
 * Use of this source code is governed by the Apache 2.0 license that can be found in the license/LICENSE.txt file.
 */
 package space.kscience.kmath.functions
 import space.kscience.kmath.misc.UnstableKMathAPI
 import space.kscience.kmath.operations.Ring
 /**
 * Returns the same degrees' description of the monomial, but without extra zero degrees on the end.
 */
 internal fun List<UInt>.cleanUp() = subList(0, indexOfLast { it != 0U } + 1)
 /**
 * Constructs [NumberedPolynomial] with provided coefficients map [coefs]. The map is used as is.
 */
@Suppress("FunctionName", "NOTHING_TO_INLINE")
@PublishedApi
 internal inline fun <C> NumberedPolynomialAsIs(coefs: Map<List<UInt>, C>) : NumberedPolynomial<C> = NumberedPolynomial<C>(coefs)
 /**
 * Constructs [NumberedPolynomial] with provided collection of [pairs] of pairs "term's signature &mdash; term's coefficient".
 * The collections will be transformed to map with [toMap] and then will be used as is.
 */
@Suppress("FunctionName", "NOTHING_TO_INLINE")
@PublishedApi
 internal inline fun <C> NumberedPolynomialAsIs(pairs: Collection<Pair<List<UInt>, C>>) : NumberedPolynomial<C> = NumberedPolynomial<C>(pairs.toMap())
 /**
 * Constructs [NumberedPolynomial] with provided array of [pairs] of pairs "term's signature &mdash; term's coefficient".
 * The array will be transformed to map with [toMap] and then will be used as is.
 */
@Suppress("FunctionName", "NOTHING_TO_INLINE")
@PublishedApi
 internal inline fun <C> NumberedPolynomialAsIs(vararg pairs: Pair<List<UInt>, C>) : NumberedPolynomial<C> = NumberedPolynomial<C>(pairs.toMap())
 /**
 * Constructs [NumberedPolynomial] with provided coefficients map [coefs].
 *
 * [coefs] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [coefs] keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName")
 public fun <C> NumberedPolynomial(coefs: Map<List<UInt>, C>, add: (C, C) -> C) : NumberedPolynomial<C> {
    val fixedCoefs = mutableMapOf<List<UInt>, C>()
    for (entry in coefs) {
        val key = entry.key.cleanUp()
        val value = entry.value
        fixedCoefs[key] = if (key in fixedCoefs) add(fixedCoefs[key]!!, value) else value
    }
    return NumberedPolynomial<C>(fixedCoefs)
 }
 /**
 * Constructs [NumberedPolynomial] with provided collection of [pairs] of pairs "term's signature &mdash; term's coefficient".
 *
 * [pairs] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [pairs] keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName")
 public fun <C> NumberedPolynomial(pairs: Collection<Pair<List<UInt>, C>>, add: (C, C) -> C) : NumberedPolynomial<C> {
    val fixedCoefs = mutableMapOf<List<UInt>, C>()
    for (entry in pairs) {
        val key = entry.first.cleanUp()
        val value = entry.second
        fixedCoefs[key] = if (key in fixedCoefs) add(fixedCoefs[key]!!, value) else value
    }
    return NumberedPolynomial<C>(fixedCoefs)
 }
 /**
 * Constructs [NumberedPolynomial] with provided array [pairs] of pairs "term's signature &mdash; term's coefficient".
 *
 * [pairs] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [pairs] keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName")
 public fun <C> NumberedPolynomial(vararg pairs: Pair<List<UInt>, C>, add: (C, C) -> C) : NumberedPolynomial<C> {
    val fixedCoefs = mutableMapOf<List<UInt>, C>()
    for (entry in pairs) {
        val key = entry.first.cleanUp()
        val value = entry.second
        fixedCoefs[key] = if (key in fixedCoefs) add(fixedCoefs[key]!!, value) else value
    }
    return NumberedPolynomial<C>(fixedCoefs)
 }
 // Waiting for context receivers :( FIXME: Replace with context receivers when they will be available
 /**
 * Constructs [NumberedPolynomial] with provided coefficients map [coefs].
 *
 * [coefs] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [coefs] keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName", "NOTHING_TO_INLINE")
 public inline fun <C, A: Ring<C>> A.NumberedPolynomial(coefs: Map<List<UInt>, C>) : NumberedPolynomial<C> = NumberedPolynomial(coefs, ::add)
 /**
 * Constructs [NumberedPolynomial] with provided coefficients map [coefs].
 *
 * [coefs] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [coefs] keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName", "NOTHING_TO_INLINE")
 public inline fun <C, A: Ring<C>> NumberedPolynomialSpace<C, A>.NumberedPolynomial(coefs: Map<List<UInt>, C>) : NumberedPolynomial<C> = NumberedPolynomial(coefs) { left: C, right: C -> left + right }
 /**
 * Constructs [NumberedPolynomial] with provided coefficients map [coefs].
 *
 * [coefs] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [coefs] keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName", "NOTHING_TO_INLINE")
 public inline fun <C, A: Ring<C>> NumberedRationalFunctionSpace<C, A>.NumberedPolynomial(coefs: Map<List<UInt>, C>) : NumberedPolynomial<C> = NumberedPolynomial(coefs) { left: C, right: C -> left + right }
 /**
 * Constructs [NumberedPolynomial] with provided collection of [pairs] of pairs "term's signature &mdash; term's coefficient".
 *
 * [pairs] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [pairs] keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName", "NOTHING_TO_INLINE")
 public inline fun <C, A: Ring<C>> A.NumberedPolynomial(pairs: Collection<Pair<List<UInt>, C>>) : NumberedPolynomial<C> = NumberedPolynomial(pairs, ::add)
 /**
 * Constructs [NumberedPolynomial] with provided collection of [pairs] of pairs "term's signature &mdash; term's coefficient".
 *
 * [pairs] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [pairs] keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName", "NOTHING_TO_INLINE")
 public inline fun <C, A: Ring<C>> NumberedPolynomialSpace<C, A>.NumberedPolynomial(pairs: Collection<Pair<List<UInt>, C>>) : NumberedPolynomial<C> = NumberedPolynomial(pairs) { left: C, right: C -> left + right }
 /**
 * Constructs [NumberedPolynomial] with provided collection of [pairs] of pairs "term's signature &mdash; term's coefficient".
 *
 * [pairs] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [pairs] keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName", "NOTHING_TO_INLINE")
 public inline fun <C, A: Ring<C>> NumberedRationalFunctionSpace<C, A>.NumberedPolynomial(pairs: Collection<Pair<List<UInt>, C>>) : NumberedPolynomial<C> = NumberedPolynomial(pairs) { left: C, right: C -> left + right }
 /**
 * Constructs [NumberedPolynomial] with provided array [pairs] of pairs "term's signature &mdash; term's coefficient".
 *
 * [pairs] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [pairs] keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName", "NOTHING_TO_INLINE")
 public inline fun <C, A: Ring<C>> A.NumberedPolynomial(vararg pairs: Pair<List<UInt>, C>) : NumberedPolynomial<C> = NumberedPolynomial(*pairs) { left: C, right: C -> left + right }
 /**
 * Constructs [NumberedPolynomial] with provided array [pairs] of pairs "term's signature &mdash; term's coefficient".
 *
 * [pairs] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [pairs] keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName", "NOTHING_TO_INLINE")
 public inline fun <C, A: Ring<C>> NumberedPolynomialSpace<C, A>.NumberedPolynomial(vararg pairs: Pair<List<UInt>, C>) : NumberedPolynomial<C> = NumberedPolynomial(*pairs) { left: C, right: C -> left + right }
 /**
 * Constructs [NumberedPolynomial] with provided array [pairs] of pairs "term's signature &mdash; term's coefficient".
 *
 * [pairs] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [pairs] keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName", "NOTHING_TO_INLINE")
 public inline fun <C, A: Ring<C>> NumberedRationalFunctionSpace<C, A>.NumberedPolynomial(vararg pairs: Pair<List<UInt>, C>) : NumberedPolynomial<C> = NumberedPolynomial(*pairs) { left: C, right: C -> left + right }
 /**
 * Converts [this] constant to [NumberedPolynomial].
 */
@Suppress("NOTHING_TO_INLINE")
 public inline fun <C> C.asNumberedPolynomial() : NumberedPolynomial<C> = NumberedPolynomialAsIs(mapOf(emptyList<UInt>() to this))
 /**
 * Marks DSL that allows to more simply create [NumberedPolynomial]s with good performance.
 *
 * For example, polynomial `5 x_1^2 x_3^3 - 6 x_2` can be described as
 * ```
 * Int.algebra {
 *     val numberedPolynomial : NumberedPolynomial<Int> = NumberedPolynomial {
 *         5 { 1 inPowerOf 2u; 3 inPowerOf 3u } // 5 x_1^2 x_3^3 +
 *         (-6) { 2 inPowerOf 1u }              // (-6) x_2^1
 *     }
 * }
 * ```
 */
@DslMarker
@UnstableKMathAPI
 internal annotation class NumberedPolynomialConstructorDSL
 /**
 * Builder of [NumberedPolynomial] signature. It should be used as an implicit context for lambdas that describe term signature.
 */
@UnstableKMathAPI
@NumberedPolynomialConstructorDSL
 public class NumberedPolynomialTermSignatureBuilder {
    /**
     * Signature storage. Any declaration of any variable's power updates the storage by increasing corresponding value.
     * Afterward the storage will be used as a resulting signature.
     */
    private val signature: MutableList<UInt> = ArrayList()
    /**
     * Builds the resulting signature.
     *
     * In fact, it just returns [signature] as regular signature of type `List<UInt>`.
     */
    internal fun build(): List<UInt> = signature
    /**
     * Declares power of variable #[this] of degree [deg].
     *
     * Declaring another power of the same variable will increase its degree by received degree.
     */
    public infix fun Int.inPowerOf(deg: UInt) {
        if (this > signature.lastIndex) {
            signature.addAll(List(this - signature.lastIndex - 1) { 0u })
            signature.add(deg)
        } else {
            signature[this] += deg
        }
    }
    /**
     * Declares power of variable #[this] of degree [deg].
     *
     * Declaring another power of the same variable will increase its degree by received degree.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline infix fun Int.pow(deg: UInt): Unit = this inPowerOf deg
    /**
     * Declares power of variable #[this] of degree [deg].
     *
     * Declaring another power of the same variable will increase its degree by received degree.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline infix fun Int.`in`(deg: UInt): Unit = this inPowerOf deg
    /**
     * Declares power of variable #[this] of degree [deg].
     *
     * Declaring another power of the same variable will increase its degree by received degree.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline infix fun Int.of(deg: UInt): Unit = this inPowerOf deg
 }
 /**
 * Builder of [NumberedPolynomial]. It should be used as an implicit context for lambdas that describe [NumberedPolynomial].
 */
@UnstableKMathAPI
@NumberedPolynomialConstructorDSL
 public class NumberedPolynomialBuilder<C>(
    /**
     * Summation operation that will be used to sum coefficients of monomials of same signatures.
     */
    private val add: (C, C) -> C,
    /**
     * Initial capacity of coefficients map.
     */
    initialCapacity: Int = 0
 ) {
    /**
     * Coefficients storage. Any declaration of any monomial updates the storage.
     * Afterward the storage will be used as a resulting coefficients map.
     */
    private val coefficients: MutableMap<List<UInt>, C> = LinkedHashMap(initialCapacity)
    /**
     * Builds the resulting coefficients map.
     *
     * In fact, it just returns [coefficients] as regular coefficients map of type `Map<List<UInt>, C>`.
     */
    @PublishedApi
    internal fun build(): NumberedPolynomial<C> = NumberedPolynomial<C>(coefficients)
    /**
     * Declares monomial with [this] coefficient and provided [signature].
     *
     * Declaring another monomial with the same signature will add [this] coefficient to existing one. If the sum of such
     * coefficients is zero at any moment the monomial won't be removed but will be left as it is.
     */
    public infix fun C.with(signature: List<UInt>) {
        if (signature in coefficients) coefficients[signature] = add(coefficients[signature]!!, this@with)
        else coefficients[signature] = this@with
    }
    /**
     * Declares monomial with [this] coefficient and signature constructed by [block].
     *
     * Declaring another monomial with the same signature will add [this] coefficient to existing one. If the sum of such
     * coefficients is zero at any moment the monomial won't be removed but will be left as it is.
     */
    @Suppress("NOTHING_TO_INLINE")
    public inline infix fun C.with(noinline block: NumberedPolynomialTermSignatureBuilder.() -> Unit): Unit = this.invoke(block)
    /**
     * Declares monomial with [this] coefficient and signature constructed by [block].
     *
     * Declaring another monomial with the same signature will add [this] coefficient to existing one. If the sum of such
     * coefficients is zero at any moment the monomial won't be removed but will be left as it is.
     */
    public operator fun C.invoke(block: NumberedPolynomialTermSignatureBuilder.() -> Unit): Unit =
        this with NumberedPolynomialTermSignatureBuilder().apply(block).build()
 }
 // Waiting for context receivers :( FIXME: Replace with context receivers when they will be available
 /**
 * Creates [NumberedPolynomial] with lambda [block] in context of [this] ring of constants.
 *
 * For example, polynomial `5 x_1^2 x_3^3 - 6 x_2` can be described as
 * ```
 * Int.algebra {
 *     val numberedPolynomial : NumberedPolynomial<Int> = NumberedPolynomial {
 *         5 { 1 inPowerOf 2u; 3 inPowerOf 3u } // 5 x_1^2 x_3^3 +
 *         (-6) { 2 inPowerOf 1u }              // (-6) x_2^1
 *     }
 * }
 * ```
 */
@UnstableKMathAPI
@Suppress("FunctionName")
 public inline fun <C, A: Ring<C>> A.NumberedPolynomial(initialCapacity: Int = 0, block: NumberedPolynomialBuilder<C>.() -> Unit) : NumberedPolynomial<C> = NumberedPolynomialBuilder(::add, initialCapacity).apply(block).build()
 /**
 * Creates [NumberedPolynomial] with lambda [block] in context of [this] ring of [NumberedPolynomial]s.
 *
 * For example, polynomial `5 x_1^2 x_3^3 - 6 x_2` can be described as
 * ```
 * Int.algebra {
 *     val numberedPolynomial : NumberedPolynomial<Int> = NumberedPolynomial {
 *         5 { 1 inPowerOf 2u; 3 inPowerOf 3u } // 5 x_1^2 x_3^3 +
 *         (-6) { 2 inPowerOf 1u }              // (-6) x_2^1
 *     }
 * }
 * ```
 */
@UnstableKMathAPI
@Suppress("FunctionName")
 public inline fun <C, A: Ring<C>> NumberedPolynomialSpace<C, A>.NumberedPolynomial(initialCapacity: Int, block: NumberedPolynomialBuilder<C>.() -> Unit) : NumberedPolynomial<C> = NumberedPolynomialBuilder({ left: C, right: C -> left + right }, initialCapacity).apply(block).build()
 /**
 * Creates [NumberedPolynomial] with lambda [block] in context of [this] field of [NumberedRationalFunction]s.
 *
 * For example, polynomial `5 x_1^2 x_3^3 - 6 x_2` can be described as
 * ```
 * Int.algebra {
 *     val numberedPolynomial : NumberedPolynomial<Int> = NumberedPolynomial {
 *         5 { 1 inPowerOf 2u; 3 inPowerOf 3u } // 5 x_1^2 x_3^3 +
 *         (-6) { 2 inPowerOf 1u }              // (-6) x_2^1
 *     }
 * }
 * ```
 */
@UnstableKMathAPI
@Suppress("FunctionName")
 public inline fun <C, A: Ring<C>> NumberedRationalFunctionSpace<C, A>.NumberedPolynomial(initialCapacity: Int, block: NumberedPolynomialBuilder<C>.() -> Unit) : NumberedPolynomial<C> = NumberedPolynomialBuilder({ left: C, right: C -> left + right }, initialCapacity).apply(block).build()
 // Waiting for context receivers :( FIXME: Replace with context receivers when they will be available
 /**
 * Constructs [NumberedRationalFunction] with provided coefficients maps [numeratorCoefficients] and [denominatorCoefficients].
 *
 * The maps will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. the maps' keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName")
 public fun <C, A: Ring<C>> A.NumberedRationalFunction(numeratorCoefficients: Map<List<UInt>, C>, denominatorCoefficients: Map<List<UInt>, C>): NumberedRationalFunction<C> =
    NumberedRationalFunction<C>(
        NumberedPolynomial(numeratorCoefficients),
        NumberedPolynomial(denominatorCoefficients)
    )
 /**
 * Constructs [NumberedRationalFunction] with provided coefficients maps [numeratorCoefficients] and [denominatorCoefficients].
 *
 * The maps will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. the maps' keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName")
 public fun <C, A: Ring<C>> NumberedRationalFunctionSpace<C, A>.NumberedRationalFunction(numeratorCoefficients: Map<List<UInt>, C>, denominatorCoefficients: Map<List<UInt>, C>): NumberedRationalFunction<C> =
    NumberedRationalFunction<C>(
        NumberedPolynomial(numeratorCoefficients),
        NumberedPolynomial(denominatorCoefficients)
    )
 /**
 * Constructs [NumberedRationalFunction] with provided [numerator] and unit denominator.
 */
@Suppress("FunctionName")
 public fun <C, A: Ring<C>> A.NumberedRationalFunction(numerator: NumberedPolynomial<C>): NumberedRationalFunction<C> =
    NumberedRationalFunction<C>(numerator, NumberedPolynomial(mapOf(emptyList<UInt>() to one)))
 /**
 * Constructs [NumberedRationalFunction] with provided [numerator] and unit denominator.
 */
@Suppress("FunctionName")
 public fun <C, A: Ring<C>> NumberedRationalFunctionSpace<C, A>.NumberedRationalFunction(numerator: NumberedPolynomial<C>): NumberedRationalFunction<C> =
    NumberedRationalFunction<C>(numerator, polynomialOne)
 /**
 * Constructs [NumberedRationalFunction] with provided coefficients map [numeratorCoefficients] for numerator and unit
 * denominator.
 *
 * [numeratorCoefficients] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [numeratorCoefficients]'s keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName")
 public fun <C, A: Ring<C>> NumberedRationalFunctionSpace<C, A>.NumberedRationalFunction(numeratorCoefficients: Map<List<UInt>, C>): NumberedRationalFunction<C> =
    NumberedRationalFunction<C>(
        NumberedPolynomial(numeratorCoefficients),
        polynomialOne
    )
 /**
 * Constructs [NumberedRationalFunction] with provided coefficients map [numeratorCoefficients] for numerator and unit
 * denominator.
 *
 * [numeratorCoefficients] will be "cleaned up":
 * 1. Zeros at the ends of terms' signatures (e.g. [numeratorCoefficients]'s keys) will be removed. (See [cleanUp].)
 * 1. Terms that happen to have the same signature will be summed up.
 * 1. New map will be formed of resulting terms.
 */
@Suppress("FunctionName")
 public fun <C, A: Ring<C>> A.NumberedRationalFunction(numeratorCoefficients: Map<List<UInt>, C>): NumberedRationalFunction<C> =
    NumberedRationalFunction<C>(
        NumberedPolynomial(numeratorCoefficients),
        NumberedPolynomialAsIs(mapOf(emptyList<UInt>() to one))
    )
 ///**
 // * Converts [this] coefficient to [NumberedRationalFunction].
 // */
 //context(A)
 //public fun <C, A: Ring<C>> C.asNumberedRationalFunction() : NumberedRationalFunction<C> =
 //    NumberedRationalFunction(
 //        NumberedPolynomialAsIs(mapOf(emptyList<UInt>() to this)),
 //        NumberedPolynomialAsIs(mapOf(emptyList<UInt>() to one))
 //    )
 ///**
 // * Converts [this] coefficient to [NumberedRationalFunction].
 // */
 //context(NumberedRationalFunctionSpace<C, A>)
 //public fun <C, A: Ring<C>> C.asNumberedRationalFunction() : NumberedRationalFunction<C> =
 //    NumberedRationalFunction(
 //        NumberedPolynomialAsIs(mapOf(emptyList<UInt>() to this)),
 //        NumberedPolynomialAsIs(mapOf(emptyList<UInt>() to constantOne))
 //    )
--- a/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/numberedUtil.kt
+++ b/kmath-functions/src/commonMain/kotlin/space/kscience/kmath/functions/numberedUtil.kt
@ -0,0 +1,515 @@
 /*
 * Copyright 2018-2021 KMath contributors.
 * Use of this source code is governed by the Apache 2.0 license that can be found in the license/LICENSE.txt file.
 */
 package space.kscience.kmath.functions
 import space.kscience.kmath.misc.UnstableKMathAPI
 import space.kscience.kmath.operations.Field
 import space.kscience.kmath.operations.Ring
 import space.kscience.kmath.operations.algebra
 import space.kscience.kmath.operations.invoke
 import space.kscience.kmath.structures.Buffer
 import kotlin.contracts.InvocationKind
 import kotlin.contracts.contract
 import kotlin.jvm.JvmName
 import kotlin.math.max
 import kotlin.math.min
 /**
 * Creates a [NumberedPolynomialSpace] over a received ring.
 */
 public fun <C, A : Ring<C>> A.numberedPolynomialSpace(): NumberedPolynomialSpace<C, A> =
    NumberedPolynomialSpace(this)
 /**
 * Creates a [NumberedPolynomialSpace]'s scope over a received ring.
 */
 public inline fun <C, A : Ring<C>, R> A.numberedPolynomialSpace(block: NumberedPolynomialSpace<C, A>.() -> R): R {
    contract { callsInPlace(block, InvocationKind.EXACTLY_ONCE) }
    return NumberedPolynomialSpace(this).block()
 }
 /**
 * Creates a [NumberedRationalFunctionSpace] over a received ring.
 */
 public fun <C, A : Ring<C>> A.numberedRationalFunctionSpace(): NumberedRationalFunctionSpace<C, A> =
    NumberedRationalFunctionSpace(this)
 /**
 * Creates a [NumberedRationalFunctionSpace]'s scope over a received ring.
 */
 public inline fun <C, A : Ring<C>, R> A.numberedRationalFunctionSpace(block: NumberedRationalFunctionSpace<C, A>.() -> R): R {
    contract { callsInPlace(block, InvocationKind.EXACTLY_ONCE) }
    return NumberedRationalFunctionSpace(this).block()
 }
 /**
 * Substitutes provided Double arguments [args] into [this] Double polynomial.
 */
 public fun NumberedPolynomial<Double>.substitute(args: Map<Int, Double>): NumberedPolynomial<Double> = Double.algebra {
    NumberedPolynomial<Double>(
        buildMap<List<UInt>, Double>(coefficients.size) {
            for ((degs, c) in coefficients) {
                val newDegs = degs.mapIndexed { index, deg -> if (index !in args) deg else 0u }.cleanUp()
                val newC = args.entries.fold(c) { product, (variable, substitution) ->
                    val deg = degs.getOrElse(variable) { 0u }
                    if (deg == 0u) product else product * substitution.pow(deg.toInt())
                }
                if (newDegs !in this) this[newDegs] = newC
                else this[newDegs] = this[newDegs]!! + newC
            }
        }
    )
 }
 /**
 * Substitutes provided arguments [args] into [this] polynomial.
 */
 public fun <C> NumberedPolynomial<C>.substitute(ring: Ring<C>, args: Map<Int, C>): NumberedPolynomial<C> = ring {
    NumberedPolynomial<C>(
        buildMap<List<UInt>, C>(coefficients.size) {
            for ((degs, c) in coefficients) {
                val newDegs = degs.mapIndexed { index, deg -> if (index !in args) deg else 0u }.cleanUp()
                val newC = args.entries.fold(c) { product, (variable, substitution) ->
                    val deg = degs.getOrElse(variable) { 0u }
                    if (deg == 0u) product else product * power(substitution, deg)
                }
                if (newDegs !in this) this[newDegs] = newC
                else this[newDegs] = this[newDegs]!! + newC
            }
        }
    )
 }
 /**
 * Substitutes provided arguments [args] into [this] polynomial.
     */ // TODO: To optimize boxing
@JvmName("substitutePolynomial")
 public fun <C> NumberedPolynomial<C>.substitute(ring: Ring<C>, args: Map<Int, NumberedPolynomial<C>>) : NumberedPolynomial<C> =
    ring.numberedPolynomialSpace {
        coefficients.entries.fold(zero) { acc, (degs, c) ->
            val newDegs = degs.mapIndexed { index, deg -> if (index !in args) deg else 0u }.cleanUp()
            acc + args.entries.fold(NumberedPolynomial<C>(mapOf(newDegs to c))) { product, (variable, substitution) ->
                val deg = degs.getOrElse(variable) { 0u }
                if (deg == 0u) product else product * power(substitution, deg)
            }
        }
    }
 /**
 * Substitutes provided arguments [args] into [this] polynomial.
 */ // TODO: To optimize boxing
@JvmName("substituteRationalFunction")
 public fun <C> NumberedPolynomial<C>.substitute(ring: Ring<C>, args: Map<Int, NumberedRationalFunction<C>>) : NumberedRationalFunction<C> =
    ring.numberedRationalFunctionSpace {
        coefficients.entries.fold(zero) { acc, (degs, c) ->
            val newDegs = degs.mapIndexed { index, deg -> if (index !in args) deg else 0u }.cleanUp()
            acc + args.entries.fold(NumberedRationalFunction(NumberedPolynomial<C>(mapOf(newDegs to c)))) { product, (variable, substitution) ->
                val deg = degs.getOrElse(variable) { 0u }
                if (deg == 0u) product else product * power(substitution, deg)
            }
        }
    }
 /**
 * Substitutes provided Double arguments [args] into [this] Double rational function.
 */
 public fun NumberedRationalFunction<Double>.substitute(args: Map<Int, Double>): NumberedRationalFunction<Double> =
    NumberedRationalFunction(numerator.substitute(args), denominator.substitute(args))
 /**
 * Substitutes provided arguments [args] into [this] rational function.
 */
 public fun <C> NumberedRationalFunction<C>.substitute(ring: Ring<C>, args: Map<Int, C>): NumberedRationalFunction<C> =
    NumberedRationalFunction(numerator.substitute(ring, args), denominator.substitute(ring, args))
 /**
 * Substitutes provided arguments [args] into [this] rational function.
 */ // TODO: To optimize boxing
@JvmName("substitutePolynomial")
 public fun <C> NumberedRationalFunction<C>.substitute(ring: Ring<C>, args: Map<Int, NumberedPolynomial<C>>) : NumberedRationalFunction<C> =
    NumberedRationalFunction(numerator.substitute(ring, args), denominator.substitute(ring, args))
 /**
 * Substitutes provided arguments [args] into [this] rational function.
 */ // TODO: To optimize boxing
@JvmName("substituteRationalFunction")
 public fun <C> NumberedRationalFunction<C>.substitute(ring: Ring<C>, args: Map<Int, NumberedRationalFunction<C>>) : NumberedRationalFunction<C> =
    ring.numberedRationalFunctionSpace {
        numerator.substitute(ring, args) / denominator.substitute(ring, args)
    }
 /**
 * Substitutes provided Double arguments [args] into [this] Double polynomial.
 */
 public fun NumberedPolynomial<Double>.substitute(args: Buffer<Double>): NumberedPolynomial<Double> = Double.algebra {
    val lastSubstitutionVariable = args.size - 1
    NumberedPolynomial<Double>(
        buildMap(coefficients.size) {
            for ((degs, c) in coefficients) {
                val lastDegsIndex = degs.lastIndex
                val newDegs =
                    if (lastDegsIndex <= lastSubstitutionVariable) emptyList()
                    else degs.toMutableList().apply {
                        for (i in 0..lastSubstitutionVariable) this[i] = 0u
                    }
                val newC = (0..min(lastDegsIndex, lastSubstitutionVariable)).fold(c) { product, variable ->
                    val deg = degs[variable]
                    if (deg == 0u) product else product * args[variable].pow(deg.toInt())
                }
                if (newDegs !in this) this[newDegs] = newC
                else this[newDegs] = this[newDegs]!! + newC
            }
        }
    )
 }
 /**
 * Substitutes provided arguments [args] into [this] polynomial.
 */
 public fun <C> NumberedPolynomial<C>.substitute(ring: Ring<C>, args: Buffer<C>): NumberedPolynomial<C> = ring {
    val lastSubstitutionVariable = args.size - 1
    NumberedPolynomial<C>(
        buildMap<List<UInt>, C>(coefficients.size) {
            for ((degs, c) in coefficients) {
                val lastDegsIndex = degs.lastIndex
                val newDegs =
                    if (lastDegsIndex <= lastSubstitutionVariable) emptyList()
                    else degs.toMutableList().apply {
                        for (i in 0..lastSubstitutionVariable) this[i] = 0u
                    }
                val newC = (0..min(lastDegsIndex, lastSubstitutionVariable)).fold(c) { product, variable ->
                    val deg = degs[variable]
                    if (deg == 0u) product else product * power(args[variable], deg)
                }
                if (newDegs !in this) this[newDegs] = newC
                else this[newDegs] = this[newDegs]!! + newC
            }
        }
    )
 }
 /**
 * Substitutes provided arguments [args] into [this] polynomial.
 */ // TODO: To optimize boxing
@JvmName("substitutePolynomial")
 public fun <C> NumberedPolynomial<C>.substitute(ring: Ring<C>, args: Buffer<NumberedPolynomial<C>>) : NumberedPolynomial<C> =
    ring.numberedPolynomialSpace {
        val lastSubstitutionVariable = args.size - 1
        coefficients.entries.fold(zero) { acc, (degs, c) ->
            val lastDegsIndex = degs.lastIndex
            val newDegs =
                if (lastDegsIndex <= lastSubstitutionVariable) emptyList()
                else degs.toMutableList().apply {
                    for (i in 0..lastSubstitutionVariable) this[i] = 0u
                }
            acc + (0..min(lastDegsIndex, lastSubstitutionVariable))
                .fold(NumberedPolynomial<C>(mapOf(newDegs to c))) { product, variable ->
                    val deg = degs[variable]
                    if (deg == 0u) product else product * power(args[variable], deg)
                }
        }
    }
 /**
 * Substitutes provided arguments [args] into [this] polynomial.
 */ // TODO: To optimize boxing
@JvmName("substituteRationalFunction")
 public fun <C> NumberedPolynomial<C>.substitute(ring: Ring<C>, args: Buffer<NumberedRationalFunction<C>>) : NumberedRationalFunction<C> =
    ring.numberedRationalFunctionSpace {
        val lastSubstitutionVariable = args.size - 1
        coefficients.entries.fold(zero) { acc, (degs, c) ->
            val lastDegsIndex = degs.lastIndex
            val newDegs =
                if (lastDegsIndex <= lastSubstitutionVariable) emptyList()
                else degs.toMutableList().apply {
                    for (i in 0..lastSubstitutionVariable) this[i] = 0u
                }
            acc + (0..min(lastDegsIndex, lastSubstitutionVariable))
                .fold(NumberedRationalFunction(NumberedPolynomial<C>(mapOf(newDegs to c)))) { product, variable ->
                    val deg = degs[variable]
                    if (deg == 0u) product else product * power(args[variable], deg)
                }
        }
    }
 /**
 * Substitutes provided Double arguments [args] into [this] Double rational function.
 */
 public fun NumberedRationalFunction<Double>.substitute(args: Buffer<Double>): NumberedRationalFunction<Double> =
    NumberedRationalFunction(numerator.substitute(args), denominator.substitute(args))
 /**
 * Substitutes provided arguments [args] into [this] rational function.
 */
 public fun <C> NumberedRationalFunction<C>.substitute(ring: Ring<C>, args: Buffer<C>): NumberedRationalFunction<C> =
    NumberedRationalFunction(numerator.substitute(ring, args), denominator.substitute(ring, args))
 /**
 * Substitutes provided arguments [args] into [this] rational function.
 */ // TODO: To optimize boxing
@JvmName("substitutePolynomial")
 public fun <C> NumberedRationalFunction<C>.substitute(ring: Ring<C>, args: Buffer<NumberedPolynomial<C>>) : NumberedRationalFunction<C> =
    NumberedRationalFunction(numerator.substitute(ring, args), denominator.substitute(ring, args))
 /**
 * Substitutes provided arguments [args] into [this] rational function.
 */ // TODO: To optimize boxing
@JvmName("substituteRationalFunction")
 public fun <C> NumberedRationalFunction<C>.substitute(ring: Ring<C>, args: Buffer<NumberedRationalFunction<C>>) : NumberedRationalFunction<C> =
    ring.numberedRationalFunctionSpace {
        numerator.substitute(ring, args) / denominator.substitute(ring, args)
    }
 /**
 * Substitutes provided Double arguments [args] into [this] Double polynomial.
 */
 public fun NumberedPolynomial<Double>.substituteFully(args: Buffer<Double>): Double = Double.algebra {
    val lastSubstitutionVariable = args.size - 1
    require(coefficients.keys.all { it.lastIndex <= lastSubstitutionVariable }) { "Fully substituting buffer should cover all variables of the polynomial." }
    coefficients.entries.fold(.0) { acc, (degs, c) ->
        acc + degs.foldIndexed(c) { variable, product, deg ->
            if (deg == 0u) product else product * args[variable].pow(deg.toInt())
        }
    }
 }
 /**
 * Substitutes provided arguments [args] into [this] polynomial.
 */
 public fun <C> NumberedPolynomial<C>.substituteFully(ring: Ring<C>, args: Buffer<C>): C = ring {
    val lastSubstitutionVariable = args.size - 1
    require(coefficients.keys.all { it.lastIndex <= lastSubstitutionVariable }) { "Fully substituting buffer should cover all variables of the polynomial." }
    coefficients.entries.fold(zero) { acc, (degs, c) ->
        acc + degs.foldIndexed(c) { variable, product, deg ->
            if (deg == 0u) product else product * power(args[variable], deg)
        }
    }
 }
 /**
 * Substitutes provided Double arguments [args] into [this] Double rational function.
 */
 public fun NumberedRationalFunction<Double>.substituteFully(args: Buffer<Double>): Double =
    numerator.substituteFully(args) / denominator.substituteFully(args)
 /**
 * Substitutes provided arguments [args] into [this] rational function.
 */
 public fun <C> NumberedRationalFunction<C>.substituteFully(ring: Field<C>, args: Buffer<C>): C = ring {
    numerator.substituteFully(ring, args) / denominator.substituteFully(ring, args)
 }
 /**
 * Represent [this] polynomial as a regular context-less function.
 */
 public fun <C, A : Ring<C>> NumberedPolynomial<C>.asFunctionOver(ring: A): (Buffer<C>) -> C = { substituteFully(ring, it) }
 /**
 * Represent [this] polynomial as a regular context-less function.
 */
 public fun <C, A : Ring<C>> NumberedPolynomial<C>.asFunctionOfConstantOver(ring: A): (Buffer<C>) -> C = { substituteFully(ring, it) }
 /**
 * Represent [this] polynomial as a regular context-less function.
 */
 public fun <C, A : Ring<C>> NumberedPolynomial<C>.asFunctionOfPolynomialOver(ring: A): (Buffer<NumberedPolynomial<C>>) -> NumberedPolynomial<C> = { substitute(ring, it) }
 /**
 * Represent [this] polynomial as a regular context-less function.
 */
 public fun <C, A : Ring<C>> NumberedPolynomial<C>.asFunctionOfRationalFunctionOver(ring: A): (Buffer<NumberedRationalFunction<C>>) -> NumberedRationalFunction<C> = { substitute(ring, it) }
 /**
 * Represent [this] rational function as a regular context-less function.
 */
 public fun <C, A : Field<C>> NumberedRationalFunction<C>.asFunctionOver(ring: A): (Buffer<C>) -> C = { substituteFully(ring, it) }
 /**
 * Represent [this] rational function as a regular context-less function.
 */
 public fun <C, A : Field<C>> NumberedRationalFunction<C>.asFunctionOfConstantOver(ring: A): (Buffer<C>) -> C = { substituteFully(ring, it) }
 /**
 * Represent [this] rational function as a regular context-less function.
 */
 public fun <C, A : Ring<C>> NumberedRationalFunction<C>.asFunctionOfPolynomialOver(ring: A): (Buffer<NumberedPolynomial<C>>) -> NumberedRationalFunction<C> = { substitute(ring, it) }
 /**
 * Represent [this] rational function as a regular context-less function.
 */
 public fun <C, A : Ring<C>> NumberedRationalFunction<C>.asFunctionOfRationalFunctionOver(ring: A): (Buffer<NumberedRationalFunction<C>>) -> NumberedRationalFunction<C> = { substitute(ring, it) }
 /**
 * Returns algebraic derivative of received polynomial with respect to provided variable.
 */
@UnstableKMathAPI
 public fun <C, A : Ring<C>> NumberedPolynomial<C>.derivativeWithRespectTo(
    ring: A,
    variable: Int,
 ): NumberedPolynomial<C> = ring {
    NumberedPolynomial<C>(
        buildMap(coefficients.size) {
            coefficients
                .forEach { (degs, c) ->
                    if (degs.size > variable) return@forEach
                    put(
                        degs.mapIndexed { index, deg ->
                            when {
                                index != variable -> deg
                                deg > 0u -> deg - 1u
                                else -> return@forEach
                            }
                        }.cleanUp(),
                        multiplyByDoubling(c, degs[variable])
                    )
                }
        }
    )
 }
 /**
 * Returns algebraic derivative of received polynomial with respect to provided variable of specified order.
 */
@UnstableKMathAPI
 public fun <C, A : Ring<C>> NumberedPolynomial<C>.nthDerivativeWithRespectTo(
    ring: A,
    variable: Int,
    order: UInt
 ): NumberedPolynomial<C> = ring {
    if (order == 0u) return this@nthDerivativeWithRespectTo
    NumberedPolynomial<C>(
        buildMap(coefficients.size) {
            coefficients
                .forEach { (degs, c) ->
                    if (degs.size > variable) return@forEach
                    put(
                        degs.mapIndexed { index, deg ->
                            when {
                                index != variable -> deg
                                deg >= order -> deg - order
                                else -> return@forEach
                            }
                        }.cleanUp(),
                        degs[variable].let { deg ->
                            (deg downTo deg - order + 1u)
                                .fold(c) { acc, ord -> multiplyByDoubling(acc, ord) }
                        }
                    )
                }
        }
    )
 }
 /**
 * Returns algebraic derivative of received polynomial with respect to provided variables of specified orders.
 */
@UnstableKMathAPI
 public fun <C, A : Ring<C>> NumberedPolynomial<C>.nthDerivativeWithRespectTo(
    ring: A,
    variablesAndOrders: Map<Int, UInt>,
 ): NumberedPolynomial<C> = ring {
    val filteredVariablesAndOrders = variablesAndOrders.filterValues { it != 0u }
    if (filteredVariablesAndOrders.isEmpty()) return this@nthDerivativeWithRespectTo
    val maxRespectedVariable = filteredVariablesAndOrders.keys.maxOrNull()!!
    NumberedPolynomial<C>(
        buildMap(coefficients.size) {
            coefficients
                .forEach { (degs, c) ->
                    if (degs.size > maxRespectedVariable) return@forEach
                    put(
                        degs.mapIndexed { index, deg ->
                            if (index !in filteredVariablesAndOrders) return@mapIndexed deg
                            val order = filteredVariablesAndOrders[index]!!
                            if (deg >= order) deg - order else return@forEach
                        }.cleanUp(),
                        filteredVariablesAndOrders.entries.fold(c) { acc1, (index, order) ->
                            degs[index].let { deg ->
                                (deg downTo deg - order + 1u)
                                    .fold(acc1) { acc2, ord -> multiplyByDoubling(acc2, ord) }
                            }
                        }
                    )
                }
        }
    )
 }
 /**
 * Returns algebraic antiderivative of received polynomial with respect to provided variable.
 */
@UnstableKMathAPI
 public fun <C, A : Field<C>> NumberedPolynomial<C>.antiderivativeWithRespectTo(
    ring: A,
    variable: Int,
 ): NumberedPolynomial<C> = ring {
    NumberedPolynomial<C>(
        buildMap(coefficients.size) {
            coefficients
                .forEach { (degs, c) ->
                    put(
                        List(max(variable + 1, degs.size)) { if (it != variable) degs[it] else degs[it] + 1u },
                        c / multiplyByDoubling(one, degs[variable])
                    )
                }
        }
    )
 }
 /**
 * Returns algebraic antiderivative of received polynomial with respect to provided variable of specified order.
 */
@UnstableKMathAPI
 public fun <C, A : Field<C>> NumberedPolynomial<C>.nthAntiderivativeWithRespectTo(
    ring: A,
    variable: Int,
    order: UInt
 ): NumberedPolynomial<C> = ring {
    if (order == 0u) return this@nthAntiderivativeWithRespectTo
    NumberedPolynomial<C>(
        buildMap(coefficients.size) {
            coefficients
                .forEach { (degs, c) ->
                    put(
                        List(max(variable + 1, degs.size)) { if (it != variable) degs[it] else degs[it] + order },
                        degs[variable].let { deg ->
                            (deg downTo deg - order + 1u)
                                .fold(c) { acc, ord -> acc / multiplyByDoubling(one, ord) }
                        }
                    )
                }
        }
    )
 }
 /**
 * Returns algebraic derivative of received polynomial with respect to provided variables of specified orders.
 */
@UnstableKMathAPI
 public fun <C, A : Field<C>> NumberedPolynomial<C>.nthAntiderivativeWithRespectTo(
    ring: A,
    variablesAndOrders: Map<Int, UInt>,
 ): NumberedPolynomial<C> = ring {
    val filteredVariablesAndOrders = variablesAndOrders.filterValues { it != 0u }
    if (filteredVariablesAndOrders.isEmpty()) return this@nthAntiderivativeWithRespectTo
    val maxRespectedVariable = filteredVariablesAndOrders.keys.maxOrNull()!!
    NumberedPolynomial<C>(
        buildMap(coefficients.size) {
            coefficients
                .forEach { (degs, c) ->
                    put(
                        List(max(maxRespectedVariable + 1, degs.size)) { degs[it] + filteredVariablesAndOrders.getOrElse(it) { 0u } },
                        filteredVariablesAndOrders.entries.fold(c) { acc1, (index, order) ->
                            degs[index].let { deg ->
                                (deg downTo deg - order + 1u)
                                    .fold(acc1) { acc2, ord -> acc2 / multiplyByDoubling(one, ord) }
                            }
                        }
                    )
                }
        }
    )
 }