AbstractLet C[[z]] be the ring of power series over an effective ring C. In Brent and Kung (1978), it was first shown that differential equations over C[[z]] may be solved in an asymptotically efficient way using Newton’s method. More precisely, if M(n) denotes the complexity for multiplying two polynomials of degree <n over C, then the first n coefficients of the solution can be computed in time O(M(n)). However, this complexity does not take into account the dependency on the order r of the equation, which is exponential for the original method (van der Hoeven, 2002) and quadratic for a recent improvement (Bostan et al., 2007). In this paper, we present a technique for further improving the dependency on r, by applying Newton’s method up ...
For each natural number m greater than one, and each natural number k less than or equal to m, there...
AbstractBy modifying and combining algorithms in symbolic and numerical computation, we propose a re...
AbstractFor each natural number m greater than one, and each natural number k less than or equal to ...
AbstractLet C[[z]] be the ring of power series over an effective ring C. In Brent and Kung (1978), i...
Trosième versionLet C[[z]] be the ring of power series over an effective ring C. In [BK78], it was f...
Abstract. We investigate Newton’s method for complex polynomials of arbitrary degree d, normalized s...
AbstractAssume that we wish to expand the product h= fg of two formal power series f and g. Classica...
Abstract: The problem is to calculate an approximate solution of an initial value problem for an aut...
International audienceWe give an algorithm for computing all roots of polynomials over a univariate ...
We investigate Newton's method for complex polynomials of arbitrary degree d, normalized so that all...
Abstract. Complexity theoretic aspects of continuation methods for the solution of square or underde...
Abstract. In this paper Newton’s method is derived, the general speed of convergence of the method i...
Contents Chapter I. Introduction 1 1. Systems of polynomials with Integer coefficients 1 2. Global c...
For each natural number m greater than one, and each natural number k less than or equal to m, there...
Let f and g be two convergent power series in R[[z]] or C[[z]], whose first n terms are given numeri...
For each natural number m greater than one, and each natural number k less than or equal to m, there...
AbstractBy modifying and combining algorithms in symbolic and numerical computation, we propose a re...
AbstractFor each natural number m greater than one, and each natural number k less than or equal to ...
AbstractLet C[[z]] be the ring of power series over an effective ring C. In Brent and Kung (1978), i...
Trosième versionLet C[[z]] be the ring of power series over an effective ring C. In [BK78], it was f...
Abstract. We investigate Newton’s method for complex polynomials of arbitrary degree d, normalized s...
AbstractAssume that we wish to expand the product h= fg of two formal power series f and g. Classica...
Abstract: The problem is to calculate an approximate solution of an initial value problem for an aut...
International audienceWe give an algorithm for computing all roots of polynomials over a univariate ...
We investigate Newton's method for complex polynomials of arbitrary degree d, normalized so that all...
Abstract. Complexity theoretic aspects of continuation methods for the solution of square or underde...
Abstract. In this paper Newton’s method is derived, the general speed of convergence of the method i...
Contents Chapter I. Introduction 1 1. Systems of polynomials with Integer coefficients 1 2. Global c...
For each natural number m greater than one, and each natural number k less than or equal to m, there...
Let f and g be two convergent power series in R[[z]] or C[[z]], whose first n terms are given numeri...
For each natural number m greater than one, and each natural number k less than or equal to m, there...
AbstractBy modifying and combining algorithms in symbolic and numerical computation, we propose a re...
AbstractFor each natural number m greater than one, and each natural number k less than or equal to ...