On Simsun and Double Simsun Permutations Avoiding a Pattern of Length Three

Abstract

A permutation σ∈Sn is simsun if for all k, the subword of σ restricted to \1,...,k\ does not have three consecutive decreasing elements. The permutation σ is double simsun if both σ and σ-1 are simsun. In this paper we present a new bijection between simsun permutations and increasing 1-2 trees, and show a number of interesting consequences of this bijection in the enumeration of pattern-avoiding simsun and double simsun permutations. We also enumerate the double simsun permutations that avoid each pattern of length three.