Talk announcement: Frédéric Chyzak
Abstract: Hermite reduction is a classical algorithmic tool in symbolic integration. It is used to decompose a given rational function as a sum of a function with simple poles and the derivative of another rational function. In this talk, we extend Hermite reduction to arbitrary linear differential operators instead of the pure derivative, and develop efficient algorithms for this reduction. We also apply the generalized Hermite reduction to the computation of linear operators satisfied by single definite integrals of D-finite functions of several continuous or discrete parameters. The resulting algorithm is a generalization of
reduction-based methods for creative telescoping. Based on joint work with A. Bostan, P. Lairez, and B. Salvy.
This talk is given in the Algorithmic Combinatorics Seminar, Wednesday 9.12.2020 at 14:30 online at
https://jku.zoom.us/j/93586556252
Meeting-ID: 935 8655 6252