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Formal Higher-Spin Theories and Kontsevich-Shoikhet-Tsygan Formality | | A.A. Sharapov
; E.D. Skvortsov
; | | Date: |
27 Feb 2017 | | Abstract: | The formal algebraic structures that govern higher-spin theories within the
unfolded approach turn out to be related to an extension of the Kontsevich
Formality, namely, the Shoikhet-Tsygan Formality. Effectively, this allows one
to construct the Hochschild cocycles of higher-spin algebras that make the
interaction vertices. As an application of these results we construct a family
of Vasiliev-like equations that generate the Hochschild cocycles with $sp(2n)$
symmetry from the corresponding cycles. A particular case of $sp(4)$ may be
relevant for the on-shell action of the $4d$ theory. We also give the exact
equations that describe propagation of higher-spin fields on a background of
their own. The consistency of formal higher-spin theories turns out to have a
purely geometric interpretation: there exists a certain symplectic invariant
associated to cutting a polytope into simplices. | | Source: | arXiv, 1702.8218 | | Services: | Forum | Review | PDF | Favorites | |
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