AbstractSchur’s transforms of a polynomial are used to count its roots in the unit disk. These are generalized then by introducing the sequence of symmetric subresultants of two polynomials. Although they do have a determinantal definition, we show that they satisfy a structure theorem which allows us to compute them with a type of Euclidean division. As a consequence, a fast algorithm based on a dichotomic process and FFT is designed.We prove also that these symmetric subresultants have a deep link with Toeplitz matrices. Finally, we propose a new algorithm of inversion for such matrices. It has the same cost as those already known; however it is fraction free and consequently well adapted to computer algebra
AbstractIn this paper we describe a fast algorithm for counting the number of roots of complex polyn...
We present an algorithm to compute the subresultant sequence of two polynomials that completely avo...
AbstractFirst, we show that Sturm algorithm and Sylvester algorithm, which compute the number of rea...
Schur's transforms of a polynomial are used to count its roots in the unit disk. These are generaliz...
AbstractSchur’s transforms of a polynomial are used to count its roots in the unit disk. These are g...
AbstractThe aim of the Schur–Cohn algorithm is to compute the number of roots of a complex polynomia...
Given the polynomials f, g ∈ Z[x] the main result of our paper, Theorem 1, establishes a direct one...
AbstractConsidering the exponential growth of the size of the coefficients of the Schur-Cohn transfo...
International audienceFirst, we show that Sturm algorithm and Sylvester algorithm, which compute the...
International audienceWe give an elementary proof, only using linear algebra, of a result due to Hel...
AbstractWe develop efficient algorithms for computing the expansion of a given symmetric polynomial ...
We present an algorithm to compute the subresultant sequence of two polynomials that completely avoi...
Given the polynomials f, g ∈ Z[x] of degrees n, m, respectively, with n > m, three new, and easy to ...
We present an algorithm to compute the subresultant sequence of two polynomials that completely avoi...
Abstract(i) First we show that all the known algorithms for polynomial division can be represented a...
AbstractIn this paper we describe a fast algorithm for counting the number of roots of complex polyn...
We present an algorithm to compute the subresultant sequence of two polynomials that completely avo...
AbstractFirst, we show that Sturm algorithm and Sylvester algorithm, which compute the number of rea...
Schur's transforms of a polynomial are used to count its roots in the unit disk. These are generaliz...
AbstractSchur’s transforms of a polynomial are used to count its roots in the unit disk. These are g...
AbstractThe aim of the Schur–Cohn algorithm is to compute the number of roots of a complex polynomia...
Given the polynomials f, g ∈ Z[x] the main result of our paper, Theorem 1, establishes a direct one...
AbstractConsidering the exponential growth of the size of the coefficients of the Schur-Cohn transfo...
International audienceFirst, we show that Sturm algorithm and Sylvester algorithm, which compute the...
International audienceWe give an elementary proof, only using linear algebra, of a result due to Hel...
AbstractWe develop efficient algorithms for computing the expansion of a given symmetric polynomial ...
We present an algorithm to compute the subresultant sequence of two polynomials that completely avoi...
Given the polynomials f, g ∈ Z[x] of degrees n, m, respectively, with n > m, three new, and easy to ...
We present an algorithm to compute the subresultant sequence of two polynomials that completely avoi...
Abstract(i) First we show that all the known algorithms for polynomial division can be represented a...
AbstractIn this paper we describe a fast algorithm for counting the number of roots of complex polyn...
We present an algorithm to compute the subresultant sequence of two polynomials that completely avo...
AbstractFirst, we show that Sturm algorithm and Sylvester algorithm, which compute the number of rea...