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

Published 20 May 2025 in math.CO | (2505.13799v2)

Abstract: We proved that for any finite collection of sparse subgraphs $(D_m){m=1}\ell$ of the complete graph $K{2n}$, and a uniformly chosen perfect matching $R$ in $K_{2n}$, the random vector $(|E(R \cap D_m)|){m=1}\ell$ jointly converges to a vector of independent Poisson random variables with mean $|E(D_m)|/(2n)$. We also showed a similar result when $K{2n}$ is replaced by the balanced complete $r$-partite graph $K_{r \times 2n/r}$ 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.

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