Symplectic Q-functions

Abstract

Symplectic Q-functions are a symplectic analogue of Schur Q-functions and defined as the t=-1 specialization of Hall--Littlewood functions associated with the root system of type C. In this paper we prove that symplectic Q-functions share many of the properties of Schur Q-functions, such as a tableau description and a Pieri-type rule. And we present some positivity conjectures, including the positivity conjecture of structure constants for symplectic P-functions. We conclude by giving a tableau description of factorial symplectic Q-functions.