Quantum gl∞, infinite q-Schur algebras and their representations

Abstract

In this paper, we investigate the structure and representations of the quantum group U(∞)= U(gl∞). We will present a realization for U(∞), following Beilinson--Lusztig--MacPherson (BLM) BLM, and show that the natural algebra homomorphism ζr from U(∞) to the infinite q-Schur algebra S(∞,r) is not surjective for any r≥ 1. We will give a BLM type realization for the image U(∞,r):=ζr(U(∞)) and discuss its presentation in terms of generators and relations. We further construct a certain completion algebra K(∞) so that ζr can be extended to an algebra epimorphism ζr: K(∞) S(∞,r). Finally we will investigate the representation theory of U(∞), especially the polynomial representations of U(∞).