The t-analogs of string functions for A1(1) and Hecke indefinite modular forms

Abstract

We study generating functions for Lusztig's t-analog of weight multiplicities associated to integrable highest weight representations of the simplest affine Lie algebra A1(1). At t=1, these reduce to the string functions of A1(1), which were shown by Kac and Peterson to be related to certain Hecke indefinite modular forms. Using their methods, we obtain a description of the general t-string function; we show that its values can be realized as radial averages of a certain extension of the Hecke indefinite modular form.