AbstractThe composition problem for univariate complex power series P, Q (i.e., the computation of the first n + 1 coefficients of the composition Q ° P) is numerically solved by interpolation methods. Using multitape Turing machines as a model of computation, the composition problem of power series with integer coefficients of modulus ⩽ν, ⩾n, is possible in time O(ψ(n2 log n log ν)), where ψ(m) bounds the amount of time for the multiplication of m-bit numbers (e.g., ψ(m) = cm log(m + 1) log log(m + 2) for multitape Turing machines). This algorithm is asymptotically faster than an implementation of the Brent-Kung algorithm on a multitape Turing machine; the improvement is of order n12 (up to logarithmic terms)
I present a new algorithm for computing binomial coefficients modulo . The proposed method has an p...
International audienceWe give an algorithm for computing all roots of polynomials over a univariate ...
Multipoint polynomial evaluation and interpolation are fundamental for modern algebraic and numerica...
AbstractThe composition problem for univariate complex power series P, Q (i.e., the computation of t...
Let f and g be two convergent power series in R[[z]] or C[[z]], whose first n terms are given numeri...
Modular composition is the problem to compose two univariate polynomials modulo a third one. For pol...
International audienceEfficient algorithms are known for many operations on truncated power series (...
Submitted to Journal DMTCSWe revisit a divide-and-conquer algorithm, originally described by Brent a...
Let F(x) = f1x + f2(x)(x) + . . . be a formal power series over a field Delta. Let F superscript 0(x...
AbstractThis paper reports on the development of compact and remarkably general algorithms for the m...
We propose fast algorithms for computing composed products and composed sums, as well as diamond pro...
The classical algorithms require order n 3 operations to compute the first n terms in the reversion ...
A new Las Vegas algorithm is presented for the composition of two polynomials modulo a third one, ov...
Modular composition is the problem to compute the composition of two univariate polynomials modulo a...
Fix a finite commutative ringR. Letuandvbe power series overR, withv(0) = 0. This paper presents an ...
I present a new algorithm for computing binomial coefficients modulo . The proposed method has an p...
International audienceWe give an algorithm for computing all roots of polynomials over a univariate ...
Multipoint polynomial evaluation and interpolation are fundamental for modern algebraic and numerica...
AbstractThe composition problem for univariate complex power series P, Q (i.e., the computation of t...
Let f and g be two convergent power series in R[[z]] or C[[z]], whose first n terms are given numeri...
Modular composition is the problem to compose two univariate polynomials modulo a third one. For pol...
International audienceEfficient algorithms are known for many operations on truncated power series (...
Submitted to Journal DMTCSWe revisit a divide-and-conquer algorithm, originally described by Brent a...
Let F(x) = f1x + f2(x)(x) + . . . be a formal power series over a field Delta. Let F superscript 0(x...
AbstractThis paper reports on the development of compact and remarkably general algorithms for the m...
We propose fast algorithms for computing composed products and composed sums, as well as diamond pro...
The classical algorithms require order n 3 operations to compute the first n terms in the reversion ...
A new Las Vegas algorithm is presented for the composition of two polynomials modulo a third one, ov...
Modular composition is the problem to compute the composition of two univariate polynomials modulo a...
Fix a finite commutative ringR. Letuandvbe power series overR, withv(0) = 0. This paper presents an ...
I present a new algorithm for computing binomial coefficients modulo . The proposed method has an p...
International audienceWe give an algorithm for computing all roots of polynomials over a univariate ...
Multipoint polynomial evaluation and interpolation are fundamental for modern algebraic and numerica...