Chapter 14
MATRIX – Blocks for matrix and vector operations
CNA – Array (vector/matrix) constant
MB_DASUM – Sum of the absolute values
MB_DAXPY – Performs y := a*x + y for vectors x,y
MB_DCOPY – Copies vector x to vector y
MB_DDOT – Dot product of two vectors
MB_DGEMM – Performs C := alpha*op(A)*op(B) + beta*C, where op(X) = X or op(X) = X^T
MB_DGEMV – Performs y := alpha*A*x + beta*y or y := alpha*A^T*x + beta*y
MB_DGER – Performs A := alpha*x*y^T + A
MB_DNRM2 – Euclidean norm of a vector
MB_DROT – Plain rotation of a vector
MB_DSCAL – Scales a vector by a constant
MB_DSWAP – Interchanges two vectors
MB_DTRMM – Performs B := alpha*op(A)*B or B := alpha*B*op(A), where op(X) = X or op(X) = X^T for triangular matrix A
MB_DTRMV – Performs x := A*x or x := A^T*x for triangular matrix A
MB_DTRSV – Solves one of the system of equations A*x = b or A^T*x = b for triangular matrix A
ML_DGEBAK – Backward transformation to ML_DGEBAL of left or right eigenvectors
ML_DGEBAL – Balancing of a general real matrix
ML_DGEBRD – Reduces a general real matrix to bidiagonal form by an orthogonal transformation
ML_DGECON – Estimates the reciprocal of the condition number of a general real matrix
ML_DGEES – Computes the eigenvalues, the Schur form, and, optionally, the matrix of Schur vectors
ML_DGEEV – Computes the eigenvalues and, optionally, the left and/or right eigenvectors
ML_DGEHRD – Reduces a real general matrix A to upper Hessenberg form
ML_DGELQF – Computes an LQ factorization of a real M-by-N matrix A
ML_DGELSD – Computes the minimum-norm solution to a real linear least squares problem
ML_DGEQRF – Computes an QR factorization of a real M-by-N matrix A
ML_DGESDD – Computes the singular value decomposition (SVD) of a real M-by-N matrix A
ML_DLACPY – Copies all or part of one matrix to another matrix
ML_DLANGE – Computes one of the matrix norms of a general matrix
ML_DLASET – Initilizes the off-diagonal elements and the diagonal elements of a matrix to given values
ML_DTRSYL – Solves the real Sylvester matrix equation for quasi-triangular matrices A and B
MX_AT – Get Matrix/Vector element
MX_ATSET – Set Matrix/Vector element
MX_CNADD – Add scalar to each Matrix/Vector element
MX_CNMUL – Multiply a Matrix/Vector by a scalar
MX_CTODPA – Discretizes continuous model given by (A,B) to (Ad,Bd) using Pade approximations
MX_DIM – Matrix/Vector dimensions
MX_DIMSET – Set Matrix/Vector dimensions
MX_DSAGET – Set subarray of A into B
MX_DSAREF – Set reference to subarray of A into B
MX_DSASET – Set A into subarray of B
MX_DTRNSP – General matrix transposition: B := alpha*A^T
MX_DTRNSQ – Square matrix in-place transposition: A := alpha*A^T
MX_FILL – Fill real matrix or vector
MX_MAT – Matrix data storage block
MX_RAND – Randomly generated matrix or vector
MX_REFCOPY – Copies input references of matrices A and B to their output references
MX_SLFS – Save or load a Matrix/Vector into file or string
MX_VEC – Vector data storage block
MX_WRITE – Write a Matrix/Vector to the console/system log
RTOV – Vector multiplexer
SWVMR – Vector/matrix/reference signal switch
VTOR – Vector demultiplexer
MB_DASUM – Sum of the absolute values
MB_DAXPY – Performs y := a*x + y for vectors x,y
MB_DCOPY – Copies vector x to vector y
MB_DDOT – Dot product of two vectors
MB_DGEMM – Performs C := alpha*op(A)*op(B) + beta*C, where op(X) = X or op(X) = X^T
MB_DGEMV – Performs y := alpha*A*x + beta*y or y := alpha*A^T*x + beta*y
MB_DGER – Performs A := alpha*x*y^T + A
MB_DNRM2 – Euclidean norm of a vector
MB_DROT – Plain rotation of a vector
MB_DSCAL – Scales a vector by a constant
MB_DSWAP – Interchanges two vectors
MB_DTRMM – Performs B := alpha*op(A)*B or B := alpha*B*op(A), where op(X) = X or op(X) = X^T for triangular matrix A
MB_DTRMV – Performs x := A*x or x := A^T*x for triangular matrix A
MB_DTRSV – Solves one of the system of equations A*x = b or A^T*x = b for triangular matrix A
ML_DGEBAK – Backward transformation to ML_DGEBAL of left or right eigenvectors
ML_DGEBAL – Balancing of a general real matrix
ML_DGEBRD – Reduces a general real matrix to bidiagonal form by an orthogonal transformation
ML_DGECON – Estimates the reciprocal of the condition number of a general real matrix
ML_DGEES – Computes the eigenvalues, the Schur form, and, optionally, the matrix of Schur vectors
ML_DGEEV – Computes the eigenvalues and, optionally, the left and/or right eigenvectors
ML_DGEHRD – Reduces a real general matrix A to upper Hessenberg form
ML_DGELQF – Computes an LQ factorization of a real M-by-N matrix A
ML_DGELSD – Computes the minimum-norm solution to a real linear least squares problem
ML_DGEQRF – Computes an QR factorization of a real M-by-N matrix A
ML_DGESDD – Computes the singular value decomposition (SVD) of a real M-by-N matrix A
ML_DLACPY – Copies all or part of one matrix to another matrix
ML_DLANGE – Computes one of the matrix norms of a general matrix
ML_DLASET – Initilizes the off-diagonal elements and the diagonal elements of a matrix to given values
ML_DTRSYL – Solves the real Sylvester matrix equation for quasi-triangular matrices A and B
MX_AT – Get Matrix/Vector element
MX_ATSET – Set Matrix/Vector element
MX_CNADD – Add scalar to each Matrix/Vector element
MX_CNMUL – Multiply a Matrix/Vector by a scalar
MX_CTODPA – Discretizes continuous model given by (A,B) to (Ad,Bd) using Pade approximations
MX_DIM – Matrix/Vector dimensions
MX_DIMSET – Set Matrix/Vector dimensions
MX_DSAGET – Set subarray of A into B
MX_DSAREF – Set reference to subarray of A into B
MX_DSASET – Set A into subarray of B
MX_DTRNSP – General matrix transposition: B := alpha*A^T
MX_DTRNSQ – Square matrix in-place transposition: A := alpha*A^T
MX_FILL – Fill real matrix or vector
MX_MAT – Matrix data storage block
MX_RAND – Randomly generated matrix or vector
MX_REFCOPY – Copies input references of matrices A and B to their output references
MX_SLFS – Save or load a Matrix/Vector into file or string
MX_VEC – Vector data storage block
MX_WRITE – Write a Matrix/Vector to the console/system log
RTOV – Vector multiplexer
SWVMR – Vector/matrix/reference signal switch
VTOR – Vector demultiplexer
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