AbstractThis paper presents a new, practical, efficient algorithm for factorizing the U-resultant of a system of algebraic equations with finitely many solutions. Given a matrix whose determinant is the U-resultant, our algorithm obtains the true linear factors with exact multiplicities, directly from the matrix without expanding the multivariate determinant. The main focuses are laid upon the use of a new operator, which enables us to treat only matrices of univariate polynomial elements, and also upon the exact treatment of multiplicities, which is made possible by the symbolic representation of solutions in simple algebraic extensions of Q. The algorithm is probabilistic in the sense that there exists no deterministic method to give an a...
The multivariate resultant is a fundamental tool of computational algebraic geometry. It can in part...
AbstractThe first step in the generalization of the classical theory of homogeneous equations to the...
142 p. : ill. ; 30 cmThe factorization (root finding) of scalar polynomials is an important tool of ...
AbstractThis paper presents a new, practical, efficient algorithm for factorizing the U-resultant of...
AbstractA method of factorisation of a U-resultant into linear factors is given. Using this method w...
AbstractOur first contribution is a substantial acceleration of randomized computation of scalar, un...
Abstract: The problem of eliminating variables from a set of polynomial equations arises in many sym...
AbstractComputational methods for manipulating sets of polynomial equations are becoming of greater ...
AbstractResultants characterize the existence of roots of systems of multivariate nonlinear polynomi...
An algorithm is developed for the factorization of a multivariate polynomial represented by a straig...
The multipolynomial resultant of a set of equations is fundamental in quantifier elimination over th...
AbstractA new deterministic algorithm for factoring polynomials over finite fields is presented. Thi...
This paper is devoted to the factorization of multivariate polynomials into products of linear forms...
International audienceAn algorithm is presented for computing the resultant of two generic bivariate...
International audienceA new algorithm is presented for computing the resultant of two "sufficiently ...
The multivariate resultant is a fundamental tool of computational algebraic geometry. It can in part...
AbstractThe first step in the generalization of the classical theory of homogeneous equations to the...
142 p. : ill. ; 30 cmThe factorization (root finding) of scalar polynomials is an important tool of ...
AbstractThis paper presents a new, practical, efficient algorithm for factorizing the U-resultant of...
AbstractA method of factorisation of a U-resultant into linear factors is given. Using this method w...
AbstractOur first contribution is a substantial acceleration of randomized computation of scalar, un...
Abstract: The problem of eliminating variables from a set of polynomial equations arises in many sym...
AbstractComputational methods for manipulating sets of polynomial equations are becoming of greater ...
AbstractResultants characterize the existence of roots of systems of multivariate nonlinear polynomi...
An algorithm is developed for the factorization of a multivariate polynomial represented by a straig...
The multipolynomial resultant of a set of equations is fundamental in quantifier elimination over th...
AbstractA new deterministic algorithm for factoring polynomials over finite fields is presented. Thi...
This paper is devoted to the factorization of multivariate polynomials into products of linear forms...
International audienceAn algorithm is presented for computing the resultant of two generic bivariate...
International audienceA new algorithm is presented for computing the resultant of two "sufficiently ...
The multivariate resultant is a fundamental tool of computational algebraic geometry. It can in part...
AbstractThe first step in the generalization of the classical theory of homogeneous equations to the...
142 p. : ill. ; 30 cmThe factorization (root finding) of scalar polynomials is an important tool of ...