Representations of superconformal algebras and mock theta functions

Abstract

It is well known that the normaized characters of integrable highest weight modules of given level over an affine Lie algebra g span an SL2(Z)-invariant space. This result extends to admissible g-modules, where g is a simple Lie algebra or osp1|n. Applying the quantum Hamiltonian reduction (QHR) to admissible g-modules when g =sl2 (resp. =osp1|2) one obtains minimal series modules over the Virasoro (resp. N=1 superconformal algebras), which form modular invariant families. Another instance of modular invariance occurs for boundary level admissible modules, including when g is a basic Lie superalgebra. For example, if g=sl2|1 (resp. =osp3|2), we thus obtain modular invariant families of g-modules, whose QHR produces the minimal series modules for the N=2 superconformal algebras (resp. a modular invariant family of N=3 superconformal algebra modules). However, in the case when g is a basic Lie superalgebra different from a simple Lie algebra or osp1|n, modular invariance of normalized supercharacters of admissible g-modules holds outside of boundary levels only after their modification in the spirit of Zwegers' modification of mock theta functions. Applying the QHR, we obtain families of representations of N=2,3,4 and big N=4 superconformal algebras, whose modified (super)characters span an SL2(Z)-invariant space.