Singular walks in the quarter plane and Bernoulli numbers

Abstract

We consider singular (aka genus 0) walks in the quarter plane and their associated generating functions Q(x,y,t), which enumerate the walks starting from the origin, of fixed endpoint (encoded by the spatial variables x and y) and of fixed length (encoded by the time variable t). We first prove that the previous series can be extended up to a universal value of t (in the sense that this holds for all singular models), namely t=12, and we provide a probabilistic interpretation of Q(x,y,12). As a second step, we refine earlier results in the literature and show that Q(x,y,t) is indeed differentially transcendental for any t∈(0,12]. Moreover, we prove that Q(x,y,12) is strongly differentially transcendental. As a last step, we show that for certain models the series expansion of Q(x,y,12) is directly related to Bernoulli numbers. This provides a second proof of its strong differential transcendence.

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