1324- and 2143-avoiding Kazhdan-Lusztig immanants and k-positivity

Abstract

Immanants are functions on square matrices generalizing the determinant and permanent. Kazhdan-Lusztig immanants, which are indexed by permutations, involve q=1 specializations of Type A Kazhdan-Lusztig polynomials, and were defined in (Rhoades-Skandera, 2006). Using results of (Haiman, 1993) and (Stembridge, 1991), Rhoades and Skandera showed that Kazhdan-Lusztig immanants are nonnegative on matrices whose minors are nonnegative. We investigate which Kazhdan-Lusztig immanants are positive on k-positive matrices (matrices whose minors of size k × k and smaller are positive). We show that the Kazhdan-Lusztig immanant indexed by v is positive on k-positive matrices when v avoids 1324 and 2143 and for all non-inversions i<j of v, either j-i ≤ k or vj-vi≤ k. Our main tool is Lewis Carroll's identity.