Orbifolds of symplectic fermion algebras

Abstract

We present a systematic study of the orbifolds of the rank n symplectic fermion algebra A(n), which has full automorphism group Sp(2n). First, we show that A(n)Sp(2n) and A(n)GL(n) are W-algebras of type W(2,4,…, 2n) and W(2,3,…, 2n+1), respectively. Using these results, we find minimal strong finite generating sets for A(mn)Sp(2n) and A(mn)GL(n) for all m,n≥ 1. We compute the characters of the irreducible representations of A(mn)Sp(2n)× SO(m) and A(mn)GL(n)× GL(m) appearing inside A(mn), and we express these characters using partial theta functions. Finally, we give a complete solution to the Hilbert problem for A(n); we show that for any reductive group G of automorphisms, A(n)G is strongly finitely generated.