A canonical expansion of the product of two Stanley symmetric functions

Abstract

We study the problem of expanding the product of two Stanley symmetric functions Fw· Fu into Stanley symmetric functions in some natural way. Our approach is to consider a Stanley symmetric function as a stabilized Schubert polynomial Fw=n ∞S1n× w, and study the behavior of the expansion of 1n× w·1n× u into Schubert polynomials, as n increases. We prove that this expansion stabilizes and thus we get a natural expansion for the product of two Stanley symmetric functions. In the case when one permutation is Grassmannian, we have a better understanding of this stability. We then study some other related stable properties, which provides a second proof of the main result.