The symmetric and unimodal expansion of Eulerian polynomials via continued fractions

Abstract

This paper was motivated by a conjecture of Br\"and\'en (European J. Combin. 29 (2008), no.~2, 514--531) about the divisibility of the coefficients in an expansion of generalized Eulerian polynomials, which implies the symmetric and unimodal property of the Eulerian numbers. We show that such a formula with the conjectured property can be derived from the combinatorial theory of continued fractions. We also discuss an analogous expansion for the corresponding formula for derangements and prove a (p,q)-analogue of the fact that the (-1)-evaluation of the enumerator polynomials of permutations (resp. derangements) by the number of excedances gives rise to tangent numbers (resp. secant numbers). The (p,q)-analogue unifies and generalizes our recent results (European J. Combin. 31 (2010), no.~7, 1689--1705.) and that of Josuat-Verg\`es (European J. Combin. 31 (2010), no.~7, 1892--1906).