The complete Generating Function for Gessel Walks is Algebraic

Gessel walks are lattice walks in the quarter plane $\set N^2$ which start at the origin $(0,0)\in\set N^2$ and consist only of steps chosen from the set ${\leftarrow,\swarrow,\nearrow,\to}$. We prove that if $g(n;i,j)$ denotes the number of Gessel walks of length $n$ which end at the point $(i,j)\in\set N^2$, then the trivariate generating series $G(t;x,y)=\sum_{n,i,j\geq 0} g(n;i,j)x^i y^j t^n$ is an algebraic function.

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Source https://inria.hal.science/hal-00780429
Author Bostan, Alin, Kauers, Manuel
Maintainer CCSD
Last Updated May 14, 2026, 23:05 (UTC)
Created May 14, 2026, 23:05 (UTC)
Identifier hal-00780429
Language en
contributor Algorithms (ALGORITHMS) ; Inria Paris-Rocquencourt ; Institut National de Recherche en Informatique et en Automatique (Inria)-Institut National de Recherche en Informatique et en Automatique (Inria)
creator Bostan, Alin
date 2009-09-10T00:00:00
harvest_object_id 562cfdb8-3c5e-464f-9e1a-d64a49e8176a
harvest_source_id 3374d638-d20b-4672-ba96-a23232d55657
harvest_source_title test moissonnage SELUNE
metadata_modified 2025-02-26T00:00:00
relation info:eu-repo/semantics/altIdentifier/arxiv/0909.1965
set_spec type:UNDEFINED