Crystal Structures for Double Stanley Symmetric Functions

Abstract

We relate the combinatorial definitions of the type An and type Cn Stanley symmetric functions, via a combinatorially defined "double Stanley symmetric function," which gives the type A case at (x,0) and gives the type C case at (x,x). We induce a type A bicrystal structure on the underlying combinatorial objects of this function which has previously been done in the type A and type C cases. Next we prove a few statements about the algebraic relationship of these three Stanley symmetric functions. We conclude with some conjectures about what happens when we generalize our constructions to type C.