Minimal models for minimal BCOV theories
Abstract
Minimal BCOV theory is a classical field theory which describes a subclass of deformations of the category of perfect complexes on a Calabi-Yau variety. We compute minimal models for L∞-algebras describing minimal BCOV theory and its variants on flat space and find that they give certain L∞-extensions of the infinite-dimensional simple Lie superalgebra SHO(d|d). We apply this computation to compare an sl2 action on an odd two-dimensional central extension of SHO(3|3) first discovered by Kac to an action of sl2 on a variant of minimal BCOV theory previously found by the authors.
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