BRST-Invariant Deformations of Geometric Structures in Sigma Models

Abstract

We study a Lie algebra of formal vector fields Wn with its application to the perturbative deformed holomorphic symplectic structure in the A-model, and a Calabi-Yau manifold with boundaries in the B-model. We show that equivalent classes of deformations are describing by a Hochschild cohomology theory of the DG-algebra A = (A, Q), Q =∂+∂ deform, which is defined to be the cohomology of (-1)n Q +d Hoch. Here ∂ is the initial non-deformed BRST operator while ∂ deform is the deformed part whose algebra is a Lie algebra of linear vector fields gln. We show that equivalent classes of deformations are described by a Hochschild cohomology of A, an important geometric invariant of the (anti)holomorphic structure on X. We discuss the identification of the harmonic structure (HT(X); H(X)) of affine space X and the group ExtX2n(, ) (the HKR isomorphism), and bulk-boundary deformation pairing.