Stanley's conjectures on the Stern poset

Abstract

The Stern poset S is a graded infinite poset naturally associated to Stern's triangle, which was defined by Stanley analogously to Pascal's triangle. Let Pn denote the interval of S from the unique element of row 0 of Stern's triangle to the n-th element of row r for sufficiently large r. For n≥ 1 let align* Ln(q)&=2·(Σk=12n-1APk(q))+AP2n(q), align* where AP(q) represents the corresponding P-Eulerian polynomial. For any n≥ 1 Stanley conjectured that Ln(q) has only real zeros and L4n+1(q) is divisible by L2n(q). In this paper we obtain a simple recurrence relation satisfied by Ln(q) and affirmatively solve Stanley's conjectures. We also establish the asymptotic normality of the coefficients of Ln(q).