Homotopy techniques for analytic combinatorics in several variables
Abstract
We combine tools from homotopy continuation solvers with the methods of analytic combinatorics in several variables to give the first practical algorithm and implementation for the asymptotics of multivariate rational generating functions not relying on a non-algorithmically checkable `combinatorial' non-negativity assumption. Our homotopy implementation terminates on examples from the literature in three variables, and we additionally describe heuristic methods that terminate and correctly predict asymptotic behaviour in reasonable time on examples in even higher dimension. Our results are implemented in Julia, through the use of the HomotopyContinuation.jl package, and we provide a selection of examples and benchmarks.
Cite
@article{arxiv.2208.04490,
title = {Homotopy techniques for analytic combinatorics in several variables},
author = {Kisun Lee and Stephen Melczer and Josip Smolčić},
journal= {arXiv preprint arXiv:2208.04490},
year = {2022}
}
Comments
16 pages. Accepted for presentation at SYNASC 2022