add documentation to DoubleLinearOpsTensorAlgebra

2021-05-06 10:27:47 +03:00 · 2021-05-06 10:27:47 +03:00 · 229c1b57da
commit 229c1b57da
parent b59e48410f
2 changed files with 94 additions and 3 deletions
--- a/kmath-tensors/src/commonMain/kotlin/space/kscience/kmath/tensors/api/LinearOpsTensorAlgebra.kt
+++ b/kmath-tensors/src/commonMain/kotlin/space/kscience/kmath/tensors/api/LinearOpsTensorAlgebra.kt
@ -81,7 +81,7 @@ public interface LinearOpsTensorAlgebra<T> :
     * If input is a batch of tensors, then U, S, and Vh are also batched with the same batch dimensions as input.
     * For more information: https://pytorch.org/docs/stable/linalg.html#torch.linalg.svd
     *
-     * @return the determinant.
+     * @return triple `(U, S, V)`.
     */
    public fun Tensor<T>.svd(): Triple<Tensor<T>, Tensor<T>, Tensor<T>>

--- a/kmath-tensors/src/commonMain/kotlin/space/kscience/kmath/tensors/core/algebras/DoubleLinearOpsTensorAlgebra.kt
+++ b/kmath-tensors/src/commonMain/kotlin/space/kscience/kmath/tensors/core/algebras/DoubleLinearOpsTensorAlgebra.kt
@ -20,7 +20,10 @@ import space.kscience.kmath.tensors.core.luPivotHelper
 import space.kscience.kmath.tensors.core.pivInit
 import kotlin.math.min

-
+/**
+ * Implementation of common linear algebra operations on double numbers.
+ * Implements the LinearOpsTensorAlgebra<Double> interface.
+ */
 public object DoubleLinearOpsTensorAlgebra :
    LinearOpsTensorAlgebra<Double>,
    DoubleTensorAlgebra() {
@ -29,12 +32,41 @@ public object DoubleLinearOpsTensorAlgebra :

    override fun Tensor<Double>.det(): DoubleTensor = detLU(1e-9)

+    /**
+     * Computes the LU factorization of a matrix or batches of matrices `input`.
+     * Returns a tuple containing the LU factorization and pivots of `input`.
+     *
+     * @param epsilon permissible error when comparing the determinant of a matrix with zero
+     * @return pair of `factorization` and `pivots`.
+     * The `factorization` has the shape ``(*, m, n)``, where``(*, m, n)`` is the shape of the `input` tensor.
+     * The `pivots`  has the shape ``(∗, min(m, n))``. `pivots` stores all the intermediate transpositions of rows.
+     */
    public fun Tensor<Double>.luFactor(epsilon: Double): Pair<DoubleTensor, IntTensor> =
        computeLU(tensor, epsilon)
            ?: throw IllegalArgumentException("Tensor contains matrices which are singular at precision $epsilon")

+    /**
+     * Computes the LU factorization of a matrix or batches of matrices `input`.
+     * Returns a tuple containing the LU factorization and pivots of `input`.
+     * Uses an error of ``1e-9`` when calculating whether a matrix is degenerate.
+     *
+     * @return pair of `factorization` and `pivots`.
+     * The `factorization` has the shape ``(*, m, n)``, where``(*, m, n)`` is the shape of the `input` tensor.
+     * The `pivots`  has the shape ``(∗, min(m, n))``. `pivots` stores all the intermediate transpositions of rows.
+     */
    public fun Tensor<Double>.luFactor(): Pair<DoubleTensor, IntTensor> = luFactor(1e-9)

+    /**
+     * Unpacks the data and pivots from a LU factorization of a tensor.
+     * Given a tensor [luTensor], return tensors (P, L, U) satisfying ``P * luTensor = L * U``,
+     * with `P` being a permutation matrix or batch of matrices,
+     * `L` being a lower triangular matrix or batch of matrices,
+     * `U` being an upper triangular matrix or batch of matrices.
+     *
+     * @param luTensor the packed LU factorization data
+     * @param pivotsTensor the packed LU factorization pivots
+     * @return triple of P, L and U tensors
+     */
    public fun luPivot(
        luTensor: Tensor<Double>,
        pivotsTensor: Tensor<Int>
@ -66,6 +98,18 @@ public object DoubleLinearOpsTensorAlgebra :
        return Triple(pTensor, lTensor, uTensor)
    }

+    /**
+     * QR decomposition.
+     *
+     * Computes the QR decomposition of a matrix or a batch of matrices, and returns a pair `(Q, R)` of tensors.
+     * Given a tensor `input`, return tensors (Q, R) satisfying ``input = Q * R``,
+     * with `Q` being an orthogonal matrix or batch of orthogonal matrices
+     * and `R` being an upper triangular matrix or batch of upper triangular matrices.
+     *
+     * @param epsilon permissible error when comparing tensors for equality.
+     * Used when checking the positive definiteness of the input matrix or matrices.
+     * @return pair of Q and R tensors.
+     */
    public fun Tensor<Double>.cholesky(epsilon: Double): DoubleTensor {
        checkSquareMatrix(shape)
        checkPositiveDefinite(tensor, epsilon)
@ -98,6 +142,18 @@ public object DoubleLinearOpsTensorAlgebra :
    override fun Tensor<Double>.svd(): Triple<DoubleTensor, DoubleTensor, DoubleTensor> =
        svd(epsilon = 1e-10)

+    /**
+     * Singular Value Decomposition.
+     *
+     * Computes the singular value decomposition of either a matrix or batch of matrices `input`.
+     * The singular value decomposition is represented as a triple `(U, S, V)`,
+     * such that ``input = U.dot(diagonalEmbedding(S).dot(V.T))``.
+     * If input is a batch of tensors, then U, S, and Vh are also batched with the same batch dimensions as input.
+     *
+     * @param epsilon permissible error when calculating the dot product of vectors,
+     * i.e. the precision with which the cosine approaches 1 in an iterative algorithm.
+     * @return triple `(U, S, V)`.
+     */
    public fun Tensor<Double>.svd(epsilon: Double): Triple<DoubleTensor, DoubleTensor, DoubleTensor> {
        val size = tensor.linearStructure.dim
        val commonShape = tensor.shape.sliceArray(0 until size - 2)
@ -125,7 +181,14 @@ public object DoubleLinearOpsTensorAlgebra :
    override fun Tensor<Double>.symEig(): Pair<DoubleTensor, DoubleTensor> =
        symEig(epsilon = 1e-15)

-    //For information: http://hua-zhou.github.io/teaching/biostatm280-2017spring/slides/16-eigsvd/eigsvd.html
+    /**
+     * Returns eigenvalues and eigenvectors of a real symmetric matrix input or a batch of real symmetric matrices,
+     * represented by a pair (eigenvalues, eigenvectors).
+     *
+     * @param epsilon permissible error when comparing tensors for equality
+     * and when the cosine approaches 1 in the SVD algorithm.
+     * @return a pair (eigenvalues, eigenvectors)
+     */
    public fun Tensor<Double>.symEig(epsilon: Double): Pair<DoubleTensor, DoubleTensor> {
        checkSymmetric(tensor, epsilon)
        val (u, s, v) = tensor.svd(epsilon)
@ -139,6 +202,13 @@ public object DoubleLinearOpsTensorAlgebra :
        return eig to v
    }

+    /**
+     * Computes the determinant of a square matrix input, or of each square matrix in a batched input
+     * using LU factorization algorithm.
+     *
+     * @param epsilon error in the LU algorithm - permissible error when comparing the determinant of a matrix with zero
+     * @return the determinant.
+     */
    public fun Tensor<Double>.detLU(epsilon: Double = 1e-9): DoubleTensor {

        checkSquareMatrix(tensor.shape)
@ -164,6 +234,15 @@ public object DoubleLinearOpsTensorAlgebra :
        return detTensor
    }

+    /**
+     * Computes the multiplicative inverse matrix of a square matrix input, or of each square matrix in a batched input
+     * using LU factorization algorithm.
+     * Given a square matrix `a`, return the matrix `aInv` satisfying
+     * ``a.dot(aInv) = aInv.dot(a) = eye(a.shape[0])``.
+     *
+     * @param epsilon error in the LU algorithm - permissible error when comparing the determinant of a matrix with zero
+     * @return the multiplicative inverse of a matrix.
+     */
    public fun Tensor<Double>.invLU(epsilon: Double = 1e-9): DoubleTensor {
        val (luTensor, pivotsTensor) = luFactor(epsilon)
        val invTensor = luTensor.zeroesLike()
@ -177,6 +256,18 @@ public object DoubleLinearOpsTensorAlgebra :
        return invTensor
    }

+    /**
+     * LUP decomposition
+     *
+     * Computes the LUP decomposition of a matrix or a batch of matrices.
+     * Given a tensor `input`, return tensors (P, L, U) satisfying ``P * input = L * U``,
+     * with `P` being a permutation matrix or batch of matrices,
+     * `L` being a lower triangular matrix or batch of matrices,
+     * `U` being an upper triangular matrix or batch of matrices.
+     *
+     * @param epsilon permissible error when comparing the determinant of a matrix with zero
+     * @return triple of P, L and U tensors
+     */
    public fun Tensor<Double>.lu(epsilon: Double = 1e-9): Triple<DoubleTensor, DoubleTensor, DoubleTensor> {
        val (lu, pivots) = this.luFactor(epsilon)
        return luPivot(lu, pivots)