Bijections for Entringer families

Abstract

Andr\'e proved that the number of alternating permutations on \1, 2, …, n\ is equal to the Euler number En. A refinement of Andr\'e's result was given by Entringer, who proved that counting alternating permutations according to the first element gives rise to Seidel's triangle (En,k) for computing the Euler numbers. In a series of papers, using generating function method and induction, Poupard gave several further combinatorial interpretations for En,k both in alternating permutations and increasing trees. Kuznetsov, Pak, and Postnikov have given more combinatorial interpretations of En,k in the model of trees. The aim of this paper is to provide bijections between the different models for En,k as well as some new interpretations. In particular, we give the first explicit one-to-one correspondence between Entringer's alternating permutation model and Poupard's increasing tree model.