The complete Generating Function for Gessel Walks is Algebraic

Abstract

Gessel walks are lattice walks in the quarter plane N2 which start at the origin (0,0)∈ N2 and consist only of steps chosen from the set \←,,,\. We prove that if g(n;i,j) denotes the number of Gessel walks of length n which end at the point (i,j)∈ N2, then the trivariate generating series G(t;x,y)=Σn,i,j≥ 0 g(n;i,j)xi yj tn is an algebraic function.