Counting Paths in Graphs
Abstract
We give a simple combinatorial proof of a formula that extends a result by Grigorchuk (rediscovered by Cohen) relating cogrowth and spectral radius of random walks. Our main result is an explicit equation determining the number of `bumps' on paths in a graph: in a d-regular (not necessarily transitive) non-oriented graph let the series G(t) count all paths between two fixed points weighted by their length tlength, and F(u,t) count the same paths, weighted as unumber of bumpstlength. Then one has F(1-u,t)/(1-u2t2) = G(t/(1+u(d-u)t2))/(1+u(d-u)t2). We then derive the circuit series of `free products' and `direct products' of graphs. We also obtain a generalized form of the Ihara-Selberg zeta function.
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