Deranged Perfect Matchings on complete graph and balanced complete r-partite graph

Abstract

We proved that for any finite collection of sparse subgraphs (Dm)m=1 of the complete graph K2n, and a uniformly chosen perfect matching R in K2n, the random vector (|E(R Dm)|)m=1 jointly converges to a vector of independent Poisson random variables with mean |E(Dm)|/(2n). We also showed a similar result when K2n is replaced by the balanced complete r-partite graph Kr × 2n/r for fixed r and determined the asymptotic joint distribution. The proofs rely on elementary tools of the Principle of Inclusion-Exclusion and generating functions. These results extend recent works of Johnston, Kayll and Palmer, Spiro and Surya, and Granet and Joos from the univariate to the multivariate setting.