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Loop Homotopy Algebras in Closed String Field Theory

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abstract

Barton Zwiebach constructed the `string products' on the Hilbert space of combined conformal field theory of matter and ghosts. It is well-known that the `tree level' specialization of these products forms a strongly homotopy Lie algebra. A strongly homotopy Lie algebra is given by a square zero coderivation on the cofree cocommutative connected coalgebra, on the other hand, strongly homotopy Lie algebras are algebras over the cobar construction on the commutative algebras operad. The aim of our paper is to give two similar characterizations of the structure formed by the `string products' of arbitrary genera. Our first characterization will be based on the notion of a higher order coderivation, the second characterization will be based on the machinery of modular operads. We will also discuss possible generalizations to open string field theory.

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math-ph 1

years

2026 1

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UNVERDICTED 1

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Homotopies in Batalin-Vilkovisky Formalism

math-ph · 2026-06-29 · unverdicted · novelty 6.0

Reviews homotopies in geometric BV formalism and builds new examples from RG flow and gauge changes to produce spans of quantum master actions with isomorphic effective actions.

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  • Homotopies in Batalin-Vilkovisky Formalism math-ph · 2026-06-29 · unverdicted · none · ref 32 · internal anchor

    Reviews homotopies in geometric BV formalism and builds new examples from RG flow and gauge changes to produce spans of quantum master actions with isomorphic effective actions.