Modular algorithms for linear equations solution, matrix inversion, determinant calculation, null space basis generation, and matrix multiplication are developed, all for matrices with polynomial entries. Theoretical computing times are obtained for all algorithms. The algorithms are programmed for Fortran IV, forming a module of the SAC-1 system for symbolic and algebraic calculation, and empirical computing times are given for representative cases
This proposal concerned the design, analysis, and implementation of serial and parallel algorithms f...
Numerical procedures and codes for linear Diophantine polynomial equations are proposed in this pape...
: Two algorithms are proposed for evaluating the rank of an arbitrary polynomial matrix. They rely u...
This system is the tenth in a series of subsystems comprising the SAC-1 System for Symbolic and Alge...
The study deals with systems of linear algebraic equations and algorithms of their solution with a g...
The work is concerned with the linear algebraic equation systems (LAES) with matrixes the non-zero e...
A unified approach is pursued for designing efficient and numerically reliable algorithms for polyno...
Solution of homogeneous linear systems of equations is a basic operation of matrix computa-tions. Th...
AbstractThe increasing availability of advanced-architecture computers has a significant effect on a...
AbstractSolution of homogeneous linear systems of equations is a basic operation of matrix computati...
Complexity bounds for many problems about matrices with univariate polynomial entries have been impr...
AbstractComputational methods for manipulating sets of polynomial equations are becoming of greater ...
AbstractAn algorithm is given for constructing the generalized integer inverse of a matrix. This gen...
We present the asymptotically fastest known algorithms for some basic problems on univariate polynom...
Algorithms in Computer Algebra base on algebraic concepts and aim at finding exact solutions. Comput...
This proposal concerned the design, analysis, and implementation of serial and parallel algorithms f...
Numerical procedures and codes for linear Diophantine polynomial equations are proposed in this pape...
: Two algorithms are proposed for evaluating the rank of an arbitrary polynomial matrix. They rely u...
This system is the tenth in a series of subsystems comprising the SAC-1 System for Symbolic and Alge...
The study deals with systems of linear algebraic equations and algorithms of their solution with a g...
The work is concerned with the linear algebraic equation systems (LAES) with matrixes the non-zero e...
A unified approach is pursued for designing efficient and numerically reliable algorithms for polyno...
Solution of homogeneous linear systems of equations is a basic operation of matrix computa-tions. Th...
AbstractThe increasing availability of advanced-architecture computers has a significant effect on a...
AbstractSolution of homogeneous linear systems of equations is a basic operation of matrix computati...
Complexity bounds for many problems about matrices with univariate polynomial entries have been impr...
AbstractComputational methods for manipulating sets of polynomial equations are becoming of greater ...
AbstractAn algorithm is given for constructing the generalized integer inverse of a matrix. This gen...
We present the asymptotically fastest known algorithms for some basic problems on univariate polynom...
Algorithms in Computer Algebra base on algebraic concepts and aim at finding exact solutions. Comput...
This proposal concerned the design, analysis, and implementation of serial and parallel algorithms f...
Numerical procedures and codes for linear Diophantine polynomial equations are proposed in this pape...
: Two algorithms are proposed for evaluating the rank of an arbitrary polynomial matrix. They rely u...