Nappi-Witten vertex operator algebra via inverse Quantum Hamiltonian Reduction

Abstract

The representation theory of the Nappi-Witten VOA was initiated in arXiv:1104.3921 and arXiv:2011.14453. In this paper we use the technique of inverse quantum hamiltonian reduction to investigate the representation theory of the Nappi-Witten VOA V1( h4). We first prove that the quantum hamiltonian reduction of V1( h4) is the Heisenberg-Virasoro VOA LHVir of level zero investigated in arXiv:math/0201314 and arXiv:1405.1707. We invert the quantum hamiltonian reduction in this case and prove that V1( h4) is realized as a vertex subalgebra of LHVir , where is a certain lattice-like vertex algebra. Using such an approach we shall realize all relaxed highest weight modules which were classified in arXiv:2011.14453. We show that every relaxed highest weight module, whose top components is neither highest nor lowest weight h4-module, has the form M1 1 (λ) where M1 is an irreducible, highest weight LHVir-module and 1 (λ) is an irreducible weight -module. Using the fusion rules for LHVir-modules and the previously developed methods of constructing logarithmic modules we are able to construct a family of logarithmic V1( h4)-modules. The Loewy diagrams of these logarithmic modules are completely analogous to the Loewy diagrams of projective modules of weight Lk(sl(2))-modules, so we expect that our logarithmic modules are also projective in a certain category of weight V1( h4)-modules.