G2-structures with torsion and the deformed Shatashvili-Vafa vertex algebra
Abstract
We construct representations of the deformed Shatashvili-Vafa vertex algebra SVa, with parameter a ∈ C, as recently proposed in the physics literature by Fiset and Gaberdiel. The geometric input for our construction are integrable G2-structures with closed torsion, solving the heterotic G2 system with α'=0 on the group manifolds S3× T4 and S3× S3× S1. From considerations in string theory, one expects the chiral algebra of these backgrounds to include SVa, and we provide a mathematical realization of this expectation by obtaining embeddings of SVa in the corresponding superaffine vertex algebra and the chiral de Rham complex. In our examples, the parameter a is proportional to the scalar torsion class of the G2 structure, a τ0, as expected from previous work in the semi-classical limit by the second author, jointly with De la Ossa and Marchetto.
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