Analysis of a class of recursive distributional equations including the resistance of the series-parallel graph

Abstract

This paper analyzes a class of recursive distributional equations (RDE's) proposed by Gurel-Gurevich [17] and involving a bias parameter p, which includes the logarithm of the resistance of the series-parallel graph. A discrete-time evolution equation resembling a quasilinear Fisher-KPP equation is derived to describe the CDF's of solutions. When the bias parameter p = 12, this equation is shown to have a PDE scaling limit, from which distributional limit theorems for the RDE are derived. Applied to the series-parallel graph, the results imply that N-1/3 R(N) has a nondegenerate limit when p = 12, as conjectured by Addario-Berry, Cairns, Devroye, Kerriou, and Mitchell [1].

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