fq_zech_mat.h – matrices over finite fields (Zech logarithm representation)¶

Description.

Types, macros and constants¶

fq_zech_mat_struct¶

fq_zech_mat_t¶: Description.

Memory management¶

void fq_zech_mat_init(fq_zech_mat_t mat, slong rows, slong cols, const fq_zech_ctx_t ctx)¶: Initialises mat to a rows-by-cols matrix with coefficients in $\mathbf{F}_{q}$ given by ctx. All elements are set to zero.

void fq_zech_mat_init_set(fq_zech_mat_t mat, fq_zech_mat_t src, const fq_zech_ctx_t ctx)¶: Initialises mat and sets its dimensions and elements to those of src.

void fq_zech_mat_clear(fq_zech_mat_t mat, const fq_zech_ctx_t ctx)¶: Clears the matrix and releases any memory it used. The matrix cannot be used again until it is initialised. This function must be called exactly once when finished using an fq_zech_mat_t object.

void fq_zech_mat_set(fq_zech_mat_t mat, fq_zech_mat_t src, const fq_zech_ctx_t ctx)¶: Sets mat to a copy of src. It is assumed that mat and src have identical dimensions.

Basic properties and manipulation¶

fq_zech_struct * fq_zech_mat_entry(fq_zech_mat_t mat, slong i, slong j)¶: Directly accesses the entry in mat in row $i$ and column $j$, indexed from zero. No bounds checking is performed.

fq_zech_struct * fq_zech_mat_entry_set(fq_zech_mat_t mat, slong i, slong j, fq_zech_t x, const fq_zech_ctx_t ctx)¶: Sets the entry in mat in row $i$ and column $j$ to x.

slong fq_zech_mat_nrows(fq_zech_mat_t mat, const fq_zech_ctx_t ctx)¶: Returns the number of rows in mat.

slong fq_zech_mat_ncols(fq_zech_mat_t mat, const fq_zech_ctx_t ctx)¶: Returns the number of columns in mat.

void fq_zech_mat_swap(fq_zech_mat_t mat1, fq_zech_mat_t mat2, const fq_zech_ctx_t ctx)¶: Swaps two matrices. The dimensions of mat1 and mat2 are allowed to be different.

void fq_zech_mat_zero(fq_zech_mat_t mat, const fq_zech_ctx_t ctx)¶: Sets all entries of mat to 0.

Concatenate¶

void fq_zech_mat_concat_vertical(fq_zech_mat_t res, const fq_zech_mat_t mat1, const fq_zech_mat_t mat2, const fq_zech_ctx_t ctx) Sets code{res} to vertical concatenation of (code{mat1}, code{mat2}) in that order. Matrix dimensions : code{mat1} : $m times n$, code{mat2} : $k times n$, code{res} : $(m + k) times n$.

void fq_zech_mat_concat_horizontal(fq_zech_mat_t res, const fq_zech_mat_t mat1, const fq_zech_mat_t mat2, const fq_zech_ctx_t ctx) Sets code{res} to horizontal concatenation of (code{mat1}, code{mat2}) in that order. Matrix dimensions : code{mat1} : $m times n$, code{mat2} : $m times k$, code{res} : $m times (n + k)$.

Printing¶

void fq_zech_mat_print_pretty(const fq_zech_mat_t mat, const fq_zech_ctx_t ctx)¶: Pretty-prints mat to stdout. A header is printed followed by the rows enclosed in brackets.

int fq_zech_mat_fprint_pretty(FILE * file, const fq_zech_mat_t mat, const fq_zech_ctx_t ctx)¶

Pretty-prints mat to file. A header is printed followed by the rows enclosed in brackets.

In case of success, returns a positive value. In case of failure, returns a non-positive value.

void fq_zech_mat_print(const fq_zech_mat_t mat, const fq_zech_ctx_t ctx)¶: Prints mat to stdout. A header is printed followed by the rows enclosed in brackets.

int fq_zech_mat_fprint(FILE * file, const fq_zech_mat_t mat, const fq_zech_ctx_t ctx)¶

Prints mat to file. A header is printed followed by the rows enclosed in brackets.

In case of success, returns a positive value. In case of failure, returns a non-positive value.

Window¶

void fq_zech_mat_window_init(fq_zech_mat_t window, const fq_zech_mat_t mat, slong r1, slong c1, slong r2, slong c2, const fq_zech_ctx_t ctx)¶: Initializes the matrix window to be an r2 - r1 by c2 - c1 submatrix of mat whose (0,0) entry is the (r1, c1) entry of mat. The memory for the elements of window is shared with mat.

void fq_zech_mat_window_clear(fq_zech_mat_t window, const fq_zech_ctx_t ctx)¶: Clears the matrix window and releases any memory that it uses. Note that the memory to the underlying matrix that window points to is not freed.

Random matrix generation¶

void fq_zech_mat_randtest(fq_zech_mat_t mat, flint_rand_t state, const fq_zech_ctx_t ctx)¶: Sets the elements of mat to random elements of $\mathbf{F}_{q}$, given by ctx.

int fq_zech_mat_randpermdiag(fq_zech_mat_t mat, fq_zech_struct * diag, slong n, flint_rand_t state, const fq_zech_ctx_t ctx)¶

Sets mat to a random permutation of the diagonal matrix with $n$ leading entries given by the vector diag. It is assumed that the main diagonal of mat has room for at least $n$ entries.

Returns $0$ or $1$, depending on whether the permutation is even or odd respectively.

void fq_zech_mat_randrank(fq_zech_mat_t mat, slong rank, flint_rand_t state, const fq_zech_ctx_t ctx)¶

Sets mat to a random sparse matrix with the given rank, having exactly as many non-zero elements as the rank, with the non-zero elements being uniformly random elements of $\mathbf{F}_{q}$.

The matrix can be transformed into a dense matrix with unchanged rank by subsequently calling fq_zech_mat_randops().

void fq_zech_mat_randops(fq_zech_mat_t mat, slong count, flint_rand_t state, const fq_zech_ctx_t ctx)¶: Randomises mat by performing elementary row or column operations. More precisely, at most count random additions or subtractions of distinct rows and columns will be performed. This leaves the rank (and for square matrices, determinant) unchanged.

void fq_zech_mat_randtril(fq_zech_mat_t mat, flint_rand_t state, int unit, const fq_zech_ctx_t ctx)¶: Sets mat to a random lower triangular matrix. If unit is 1, it will have ones on the main diagonal, otherwise it will have random nonzero entries on the main diagonal.

void fq_zech_mat_randtriu(fq_zech_mat_t mat, flint_rand_t state, int unit, x const fq_zech_ctx_t ctx)¶: Sets mat to a random upper triangular matrix. If unit is 1, it will have ones on the main diagonal, otherwise it will have random nonzero entries on the main diagonal.

Comparison¶

int fq_zech_mat_equal(fq_zech_mat_t mat1, fq_zech_mat_t mat2, const fq_zech_ctx_t ctx)¶: Returns nonzero if mat1 and mat2 have the same dimensions and elements, and zero otherwise.

int fq_zech_mat_is_zero(const fq_zech_mat_t mat, const fq_zech_ctx_t ctx)¶: Returns a non-zero value if all entries mat are zero, and otherwise returns zero.

int fq_zech_mat_is_empty(const fq_zech_mat_t mat, const fq_zech_ctx_t ctx)¶: Returns a non-zero value if the number of rows or the number of columns in mat is zero, and otherwise returns zero.

int fq_zech_mat_is_square(const fq_zech_mat_t mat, const fq_zech_ctx_t ctx)¶: Returns a non-zero value if the number of rows is equal to the number of columns in mat, and otherwise returns zero.

Addition and subtraction¶

void fq_zech_mat_add(fq_zech_mat_t C, const fq_zech_mat_t A, const fq_zech_mat_t B, const fq_zech_ctx_t ctx)¶: Computes $C = A + B$. Dimensions must be identical.

void fq_zech_mat_sub(fq_zech_mat_t C, const fq_zech_mat_t A, const fq_zech_mat_t B, const fq_zech_ctx_t ctx)¶: Computes $C = A - B$. Dimensions must be identical.

void fq_zech_mat_neg(fq_zech_mat_t A, const fq_zech_mat_t B, const fq_zech_ctx_t ctx)¶: Sets $B = -A$. Dimensions must be identical.

Matrix multiplication¶

void fq_zech_mat_mul(fq_zech_mat_t C, const fq_zech_mat_t A, const fq_zech_mat_t B, const fq_zech_ctx_t ctx)¶: Sets $C = AB$. Dimensions must be compatible for matrix multiplication. $C$ is not allowed to be aliased with $A$ or $B$. This function automatically chooses between classical and KS multiplication.

void fq_zech_mat_mul_classical(fq_zech_mat_t C, const fq_zech_mat_t A, const fq_zech_mat_t B, const fq_zech_ctx_t ctx)¶: Sets $C = AB$. Dimensions must be compatible for matrix multiplication. $C$ is not allowed to be aliased with $A$ or $B$. Uses classical matrix multiplication.

void fq_zech_mat_mul_KS(fq_zech_mat_t C, const fq_zech_mat_t A, const fq_zech_mat_t B, const fq_zech_ctx_t ctx)¶: Sets $C = AB$. Dimensions must be compatible for matrix multiplication. $C$ is not allowed to be aliased with $A$ or $B$. Uses Kronecker substitution to perform the multiplication over the integers.

void fq_zech_mat_submul(fq_zech_mat_t D, const fq_zech_mat_t C, const fq_zech_mat_t A, const fq_zech_mat_t B, const fq_zech_ctx_t ctx)¶: Sets $D = C + AB$. $C$ and $D$ may be aliased with each other but not with $A$ or $B$.

LU decomposition¶

slong fq_zech_mat_lu(slong * P, fq_zech_mat_t A, int rank_check, const fq_zech_ctx_t ctx)¶

Computes a generalised LU decomposition $LU = PA$ of a given matrix $A$, returning the rank of $A$.

If $A$ is a nonsingular square matrix, it will be overwritten with a unit diagonal lower triangular matrix $L$ and an upper triangular matrix $U$ (the diagonal of $L$ will not be stored explicitly).

If $A$ is an arbitrary matrix of rank $r$, $U$ will be in row echelon form having $r$ nonzero rows, and $L$ will be lower triangular but truncated to $r$ columns, having implicit ones on the $r$ first entries of the main diagonal. All other entries will be zero.

If a nonzero value for rank_check is passed, the function will abandon the output matrix in an undefined state and return 0 if $A$ is detected to be rank-deficient.

This function calls fq_zech_mat_lu_recursive.

slong fq_zech_mat_lu_classical(slong * P, fq_zech_mat_t A, int rank_check, const fq_zech_ctx_t ctx)¶: Computes a generalised LU decomposition $LU = PA$ of a given matrix $A$, returning the rank of $A$. The behavior of this function is identical to that of fq_zech_mat_lu. Uses Gaussian elimination.

slong fq_zech_mat_lu_recursive(slong * P, fq_zech_mat_t A, int rank_check, const fq_zech_ctx_t ctx)¶: Computes a generalised LU decomposition $LU = PA$ of a given matrix $A$, returning the rank of $A$. The behavior of this function is identical to that of fq_zech_mat_lu. Uses recursive block decomposition, switching to classical Gaussian elimination for sufficiently small blocks.

Reduced row echelon form¶

slong fq_zech_mat_rref(fq_zech_mat_t A, const fq_zech_ctx_t ctx)¶

Puts $A$ in reduced row echelon form and returns the rank of $A$.

The rref is computed by first obtaining an unreduced row echelon form via LU decomposition and then solving an additional triangular system.

slong fq_zech_mat_reduce_row(fq_zech_mat_t A, slong * P, slong * L, slong n, fq_zech_ctx_t ctx)¶: Reduce row n of the matrix $A$, assuming the prior rows are in Gauss form. However those rows may not be in order. The entry $i$ of the array $P$ is the row of $A$ which has a pivot in the $i$-th column. If no such row exists, the entry of $P$ will be $-1$. The function returns the column in which the $n$-th row has a pivot after reduction. This will always be chosen to be the first available column for a pivot from the left. This information is also updated in $P$. Entry $i$ of the array $L$ contains the number of possibly nonzero columns of $A$ row $i$. This speeds up reduction in the case that $A$ is chambered on the right. Otherwise the entries of $L$ can all be set to the number of columns of $A$. We require the entries of $L$ to be monotonic increasing.

Triangular solving¶

void fq_zech_mat_solve_tril(fq_zech_mat_t X, const fq_zech_mat_t L, const fq_zech_mat_t B, int unit, const fq_zech_ctx_t ctx)¶: Sets $X = L^{-1} B$ where $L$ is a full rank lower triangular square matrix. If unit = 1, $L$ is assumed to have ones on its main diagonal, and the main diagonal will not be read. $X$ and $B$ are allowed to be the same matrix, but no other aliasing is allowed. Automatically chooses between the classical and recursive algorithms.

void fq_zech_mat_solve_tril_classical(fq_zech_mat_t X, const fq_zech_mat_t L, const fq_zech_mat_t B, int unit, const fq_zech_ctx_t ctx)¶: Sets $X = L^{-1} B$ where $L$ is a full rank lower triangular square matrix. If unit = 1, $L$ is assumed to have ones on its main diagonal, and the main diagonal will not be read. $X$ and $B$ are allowed to be the same matrix, but no other aliasing is allowed. Uses forward substitution.

void fq_zech_mat_solve_tril_recursive(fq_zech_mat_t X, const fq_zech_mat_t L, const fq_zech_mat_t B, int unit, const fq_zech_ctx_t ctx)¶

Sets $X = L^{-1} B$ where $L$ is a full rank lower triangular square matrix. If unit = 1, $L$ is assumed to have ones on its main diagonal, and the main diagonal will not be read. $X$ and $B$ are allowed to be the same matrix, but no other aliasing is allowed.

Uses the block inversion formula

`` begin{pmatrix} A & 0 \ C & D end{pmatrix}^{-1} begin{pmatrix} X \ Y end{pmatrix} = begin{pmatrix} A^{-1} X \ D^{-1} ( Y - C A^{-1} X ) end{pmatrix} ``

to reduce the problem to matrix multiplication and triangular solving of smaller systems.

void fq_zech_mat_solve_triu(fq_zech_mat_t X, const fq_zech_mat_t U, const fq_zech_mat_t B, int unit, const fq_zech_ctx_t ctx)¶: Sets $X = U^{-1} B$ where $U$ is a full rank upper triangular square matrix. If unit = 1, $U$ is assumed to have ones on its main diagonal, and the main diagonal will not be read. $X$ and $B$ are allowed to be the same matrix, but no other aliasing is allowed. Automatically chooses between the classical and recursive algorithms.

void fq_zech_mat_solve_triu_classical(fq_zech_mat_t X, const fq_zech_mat_t U, const fq_zech_mat_t B, int unit, const fq_zech_ctx_t ctx)¶: Sets $X = U^{-1} B$ where $U$ is a full rank upper triangular square matrix. If unit = 1, $U$ is assumed to have ones on its main diagonal, and the main diagonal will not be read. $X$ and $B$ are allowed to be the same matrix, but no other aliasing is allowed. Uses forward substitution.

void fq_zech_mat_solve_triu_recursive(fq_zech_mat_t X, const fq_zech_mat_t U, const fq_zech_mat_t B, int unit, const fq_zech_ctx_t ctx)¶

Sets $X = U^{-1} B$ where $U$ is a full rank upper triangular square matrix. If unit = 1, $U$ is assumed to have ones on its main diagonal, and the main diagonal will not be read. $X$ and $B$ are allowed to be the same matrix, but no other aliasing is allowed.

Uses the block inversion formula

`` begin{pmatrix} A & B \ 0 & D end{pmatrix}^{-1} begin{pmatrix} X \ Y end{pmatrix} = begin{pmatrix} A^{-1} (X - B D^{-1} Y) \ D^{-1} Y end{pmatrix} ``

to reduce the problem to matrix multiplication and triangular solving of smaller systems.

Transforms¶

void fq_zech_mat_similarity(fq_zech_mat_t M, slong r, fq_zech_t d, fq_zech_ctx_t ctx)¶

Applies a similarity transform to the $n\times n$ matrix $M$ in-place.

If $P$ is the $n\times n$ identity matrix the zero entries of whose row $r$ ($0$-indexed) have been replaced by $d$, this transform is equivalent to $M = P^{-1}MP$.

Similarity transforms preserve the determinant, characteristic polynomial and minimal polynomial.

The value $d$ is required to be reduced modulo the modulus of the entries in the matrix.

Characteristic polynomial¶

void fq_zech_mat_charpoly_danilevsky(fq_zech_poly_t p, const fq_zech_mat_t M, fq_zech_ctx_t ctx)¶: Compute the characteristic polynomial $p$ of the matrix $M$. The matrix is assumed to be square.

void fq_zech_mat_charpoly(fq_zech_poly_t p, const fq_zech_mat_t M)¶: Compute the characteristic polynomial $p$ of the matrix $M$. The matrix is required to be square, otherwise an exception is raised.

Minimal polynomial¶

void fq_zech_mat_minpoly(fq_zech_poly_t p, const fq_zech_mat_t M, fq_zech_ctx_t ctx)¶: Compute the minimal polynomial $p$ of the matrix $M$. The matrix is required to be square, otherwise an exception is raised.