The chiral critical locus and topological structures
Abstract
We study a differential graded VOA associated to the derived critical locus of a function f on a smooth oriented D-dimensional variety (X,vol). Informally, this VOA, critchf, is just the algebra of chiral differential operators on the derived critical locus critf. We prove, using a generalization of a physical construction of Witten, the critchf admits a topological structure if f is homogeneous for a Gm action on (X,vol). If vol has weight b and f has weight a, we compute the rank of the topological structure in terms of the discrete invariants of the theory to be d=(D-2ba). We conclude with some remarks about BV quantization and a simple computation of characters.
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