REPRESENTATIONS OF AFFINE SUPERALGEBRAS AND MOCK THETA FUNCTIONS

Author(s)

Wakimoto, Minoru; Kac, Victor

Abstract

We show that the normalized supercharacters of principal admissible modules over the affine Lie superalgebra sℓˆ[subscript 2|1] (resp. psℓˆ[subscript 2|2]) can be modified, using Zwegers’ real analytic corrections, to form a modular (resp. S-) invariant family of functions. Applying the quantum Hamiltonian reduction, this leads to a new family of positive energy modules over the N = 2 (resp.N = 4) superconformal algebras with central charge 3(1 − (2 m + 2)/M), where m ∈ ℤ[subscript ≥0], M ∈ ℤ[subscript ≥2], gcd(2 m + 2, M) = 1 if m > 0 (resp. 6 (m/M − 1), where m ∈ ℤ[subscript ≥1], M ∈ ℤ[subscript ≥2], gcd(2 m, M) = 1 if m > 1), whose modified characters and supercharacters form a modular invariant family.

Date issued

2014-04

URI

http://hdl.handle.net/1721.1/109741

Department

Massachusetts Institute of Technology. Department of Mathematics

Journal

Transformation Groups

Publisher

Springer US

Citation

Kac, Victor G., and Minoru Wakimoto. “REPRESENTATIONS OF AFFINE SUPERALGEBRAS AND MOCK THETA FUNCTIONS.” Transformation Groups 19.2 (2014): 383–455.

Version: Author's final manuscript

ISSN

1083-4362

1531-586X