Deformations of topological open strings
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Publication date
2000-06-01
Authors
Hofman, C.
Ma, W.K.
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Document Type
Preprint
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Abstract
Deformations of topological open string theories are described, with an emphasis on
their algebraic structure. They are encoded in the mixed bulk-boundary correlators.
They constitute the Hochschild complex of the open string algebra { the complex of
multilinear maps on the boundary Hilbert space. This complex is known to have the
structure of a Gerstenhaber algebra (Deligne theorem), which is also found in closed
string theory. Generalising the case of function algebras with a B-eld, we identify the
algebraic operations of the bulk sector, in terms of the mixed correlators. This gives
a physical realisation of the Deligne theorem. We translate to the language of certain
operads (spaces of d-discs with gluing) and d-algebras, and comment on generalisations,
notably to the AdS/CFT correspondence. The formalism is applied to the topological A-
and B-models on the disc.