A generalization of a 1998 unimodality conjecture of Reiner and Stanton

Abstract

An interesting, and still wide open, conjecture of Reiner and Stanton predicts that certain "strange" symmetric differences of q-binomial coefficients are always nonnegative and unimodal. We extend their conjecture to a broader, and perhaps more natural, framework, by conjecturing that, for each k 5, the polynomials f(k,m,b)(q)=mkq-qk(m-b)2+b-2k+2·bk-2q are nonnegative and unimodal for all mk 0 and b km-4k+4k-2 such that kb km (mod 2), with the only exception of b=km-4k+2k-2 when this is an integer. Using the KOH theorem, we combinatorially show the case k=5. In fact, we completely characterize the nonnegativity and unimodality of f(k,m,b) for k 5. (This also provides an isolated counterexample to Reiner-Stanton's conjecture when k=3.) Further, we prove that, for each k and m, it suffices to show our conjecture for the largest 2k-6 values of b.