Large Deviations for Permutations Avoiding Monotone Patterns

Abstract

For a given permutation τ, let PNτ be the uniform probability distribution on the set of N-element permutations σ that avoid the pattern τ. For τ=μk:=123·s k, we consider PNμk(σI=J) where I γ N and J δ N for γ,δ ∈ (0,1). If γ+δ≠ 1 then we are in the large deviations regime with the probability decaying exponentially, and we calculate the limiting value of PNμk(σI=J)1/N. We also observe that for τ = λk, := 12… k(k-1)…(+1) and γ+δ<1, the limit of PNτ(σI=J)1/N is the same as for τ=μk.