An algebraic approach to asymptotics of the number of unlabelled bicolored graphs
Abstract
We define and study two structures associated to permutation groups: Dirichlet characters on permutation groups, and the "cycle form," a bilinear form on the group algebras of permutation groups. We use Dirichlet characters and the cycle form to find a new upper bound on the number of unlabelled bicolored graphs with p red vertices and q blue vertices. We use this bound to calculate the asymptotic growth rate of the number of such graphs as p,q→∞, answering a 1973 question of Harrison in the case where q-p is fixed. As an application, we show that, in an asymptotic sense, "most" elements of the power set P(\ 1, … ,p\ × \ 1, … ,q\) are in free p× q-orbits.
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