A spectral approach to consecutive pattern-avoiding permutations

We consider the problem of enumerating permutations in the symmetricgroup on $n$ elements which avoid a given set of consecutive patterns$S$, and in particular computing asymptotics as $n$ tends toinfinity. We develop a general method which solves this enumerationproblem using the spectral theory of integral operators on$L^{2}([0,1]^{m})$, where the patterns in $S$ have length $m+1$.Kre\u{\i}n and Rutman’s generalization of the Perron–Frobeniustheory of non-negative matrices plays a central role. Our methodsgive detailed asymptotic expansions and allow for explicitcomputation of leading terms in many cases.As a corollary to our results,we settle a conjecture of Warlimont on asymptotics for the number ofpermutations avoiding a consecutive pattern.

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Published 29 March 2012