A combinatorial bijection on di-sk trees

Abstract

A di-sk tree is a rooted binary tree whose nodes are labeled by or , and no node has the same label as its right child. The di-sk trees are in natural bijection with separable permutations. We construct a combinatorial bijection on di-sk trees proving the two quintuples (,,,,) and (,,,,) have the same distribution over separable permutations. Here for a permutation π, (π)/(π) is the set of values of the left-to-right maxima/minima of π and (π) is the set of descent bottoms of π, while (π) and (π) are respectively the number of components of π and the length of initial ascending run of π. Interestingly, our bijection specializes to a bijection on 312-avoiding permutations, which provides (up to the classical Knuth--Richards bijection) an alternative approach to a result of Rubey (2016) that asserts the two triples (,,) and (,,) are equidistributed on 321-avoiding permutations. Rubey's result is a symmetric extension of an equidistribution due to Adin--Bagno--Roichman, which implies the class of 321-avoiding permutations with a prescribed number of components is Schur positive. Some equidistribution results for various statistics concerning tree traversal are presented in the end.