The Stembridge Equality for Skew Stable Grothendieck Polynomials and Skew Dual Stable Grothendieck Polynomials

Abstract

The Schur polynomials sλ are essential in understanding the representation theory of the general linear group. They also describe the cohomology ring of the Grassmannians. For = (n, n-1, …, 1) a staircase shape and μ ⊂eq a subpartition, the Stembridge equality states that s/μ = s/μT. This equality provides information about the symmetry of the cohomology ring. The stable Grothendieck polynomials Gλ, and the dual stable Grothendieck polynomials gλ, developed by Buch, Lam, and Pylyavskyy, are variants of the Schur polynomials and describe the K-theory of the Grassmannians. Using the Hopf algebra structure of the ring of symmetric functions and a generalized Littlewood-Richardson rule, we prove that G/μ = G/μT and g/μ = g/μT, the analogues of the Stembridge equality for the skew stable and skew dual stable Grothendieck polynomials.