algebra of Jordan quiver and -Littlewood functions

Abstract

We show that the algebra of the Jordan quiver is a polynomial ring in infinitely many generators and obtain transition relations among several generating sets. We establish a ring isomorphism from this algebra to the ring of symmetric functions in two parameters t, θ, which maps the basis to a class of (modified) inhomogeneous Hall-Littlewood () functions. The (modified) functions admit a formulation via raising and lowering operators. We formulate and prove Pieri rules for (modified) functions. The modified functions specialize at θ=0 to the modified HL functions; they specialize at θ=1 to the deformed universal characters of type C, which further specialize at (t=0, θ =1) to the universal characters of type C.