Families of major index distributions: closed forms and unimodality

Abstract

Closed forms for fλ,i (q) := Στ ∈ SYT(λ) : des(τ) = i qmaj(τ), the distribution of the major index over standard Young tableaux of given shapes and specified number of descents, are established for a large collection of λ and i. Of particular interest is the family that gives a positive answer to a question of Sagan and collaborators. All formulas established in the paper are unimodal, most by a result of Kirillov and Reshetikhin. Many can be identified as specializations of Schur functions via the Jacobi-Trudi identities. If the number of arguments is sufficiently large, it is shown that any finite principal specialization of any Schur function sλ(1,q,q2,…,qn-1) has a combinatorial realization as the distribution of the major index over a given set of tableaux.