Given a multiple power sum (extending polynomial's exponents to real numbers), the positive root isolation problem is to find a list of disjoint intervals, satisfying that they contain all positive roots and each of them contains exactly distinct one. In this paper, we develop the pseudo-derivative sequences for multiple power sums, then generalize Fourier's theorem and Descartes' sign rule for them to overestimate the number of their positive roots. Furthermore we bring up some formulas of linear and quadratic complexity to compute complex root bounds and positive root bounds based on Descartes' sign rule and Cauchy's theorem. Besides, we advance a factorization method for multiple power sums with rational coefficients utilizing Q-linear i...
Computing the real roots of a polynomial is a fundamental problem of computational algebra. We descr...
We describe a Descartes algorithm for root isolation of polynomials with real coefficients. It is as...
We are interested in how small a root of multiplicity k can be for a power series of the form f(z) :...
Abstract: Given a multiple power sum (extending polynomial’s exponents to real numbers), the positiv...
AbstractThis paper revisits an algorithm isolating the real roots of a univariate polynomial using D...
The recent interest in isolating real roots of polynomials has revived interest in computing sharp u...
Article dans revue scientifique avec comité de lecture. internationale.International audienceThis pa...
The recent interest in isolating real roots of polynomials has revived interest in computing sharp u...
In this paper we review the existing linear and quadratic complexity (upper) bounds on the values of...
AbstractIf an open interval I contains a k-fold root α of a real polynomial f, then, after transform...
We address the problem of {\em root isolation} for polynomial systems: for an affine, zero-dimension...
We consider a univariate polynomial f with real coecients having a high degree N but a rather small ...
We introduce a new algorithm denoted DSC2 to isolate the real roots of a univariate square-free poly...
If an open interval $I$ contains a $k$-fold root $\alpha$ of a real polynomial~$f$, then, after tran...
We present an implementation of the Continued Fractions (CF) real root isolation method using a rece...
Computing the real roots of a polynomial is a fundamental problem of computational algebra. We descr...
We describe a Descartes algorithm for root isolation of polynomials with real coefficients. It is as...
We are interested in how small a root of multiplicity k can be for a power series of the form f(z) :...
Abstract: Given a multiple power sum (extending polynomial’s exponents to real numbers), the positiv...
AbstractThis paper revisits an algorithm isolating the real roots of a univariate polynomial using D...
The recent interest in isolating real roots of polynomials has revived interest in computing sharp u...
Article dans revue scientifique avec comité de lecture. internationale.International audienceThis pa...
The recent interest in isolating real roots of polynomials has revived interest in computing sharp u...
In this paper we review the existing linear and quadratic complexity (upper) bounds on the values of...
AbstractIf an open interval I contains a k-fold root α of a real polynomial f, then, after transform...
We address the problem of {\em root isolation} for polynomial systems: for an affine, zero-dimension...
We consider a univariate polynomial f with real coecients having a high degree N but a rather small ...
We introduce a new algorithm denoted DSC2 to isolate the real roots of a univariate square-free poly...
If an open interval $I$ contains a $k$-fold root $\alpha$ of a real polynomial~$f$, then, after tran...
We present an implementation of the Continued Fractions (CF) real root isolation method using a rece...
Computing the real roots of a polynomial is a fundamental problem of computational algebra. We descr...
We describe a Descartes algorithm for root isolation of polynomials with real coefficients. It is as...
We are interested in how small a root of multiplicity k can be for a power series of the form f(z) :...