There are discussed implementational aspects of the special-purpose computer algebra system FELIX designed for computations in constructive algebra. In particular, data types developed for the representation of and computation with commutative and non-commutative polynomials are described. Furthermore, comparisons of time and memory requirements of different polynomial representations are reported
A new method of generating polynomials using microprocessors is proposed. The polynomial is generate...
Today, certain computer software systems exist which surpass the computational ability of researcher...
International audienceThe Basic Polynomial Algebra Subprograms (BPAS) provides arithmetic operations...
There are discussed implementational aspects of the special-purpose computer algebra system FELIX de...
There are discussed implementational aspects of the special-purpose computer algebra system FELIX de...
The special-purpose computer algebra system FELIX is designed for computations in constructive commu...
Although scientific computing is very often associated with numeric computations, the use of compute...
Computers in Nonassociative Rings and Algebras provides information pertinent to the computational a...
The purpose of the thesis is to get a better understanding of computer algebra in general, and polyn...
International audienceAlgebra and number theory have always been counted among the most beautiful ma...
Polynomial multiplication is as close to any problem comes to being “classical” in the field of comp...
In recent years a number of algorithms have been designed for the "inverse" computational ...
The computer algebra system Maple contains a basic set of commands for working with Lie algebras. Th...
The research presented focuses on optimization of polynomials using algebraic manipulations at the h...
In this thesis we present the implementation of libraries center.lib and perron.lib for the non-comm...
A new method of generating polynomials using microprocessors is proposed. The polynomial is generate...
Today, certain computer software systems exist which surpass the computational ability of researcher...
International audienceThe Basic Polynomial Algebra Subprograms (BPAS) provides arithmetic operations...
There are discussed implementational aspects of the special-purpose computer algebra system FELIX de...
There are discussed implementational aspects of the special-purpose computer algebra system FELIX de...
The special-purpose computer algebra system FELIX is designed for computations in constructive commu...
Although scientific computing is very often associated with numeric computations, the use of compute...
Computers in Nonassociative Rings and Algebras provides information pertinent to the computational a...
The purpose of the thesis is to get a better understanding of computer algebra in general, and polyn...
International audienceAlgebra and number theory have always been counted among the most beautiful ma...
Polynomial multiplication is as close to any problem comes to being “classical” in the field of comp...
In recent years a number of algorithms have been designed for the "inverse" computational ...
The computer algebra system Maple contains a basic set of commands for working with Lie algebras. Th...
The research presented focuses on optimization of polynomials using algebraic manipulations at the h...
In this thesis we present the implementation of libraries center.lib and perron.lib for the non-comm...
A new method of generating polynomials using microprocessors is proposed. The polynomial is generate...
Today, certain computer software systems exist which surpass the computational ability of researcher...
International audienceThe Basic Polynomial Algebra Subprograms (BPAS) provides arithmetic operations...