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arxiv: 2410.20888 · v1 · pith:BP3DGL5Xnew · submitted 2024-10-28 · 🧮 math.QA · hep-th· math-ph· math.AT· math.MP

An open-closed string analogue of Hochschild cohomology

classification 🧮 math.QA hep-thmath-phmath.ATmath.MP
keywords open-closedhochschildalgebracohomologystructurea-infinityadmitsanalogue
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We prove that every open-closed homotopy algebra, introduced by Kajiura and Stasheff (arXiv: archive/0410291), naturally gives rise to an open-closed version of Hochschild cochain complex whose cohomology admits a canonical Gerstenhaber algebra structure. We also develop the open-closed brace relations, provide a concise description of OCHAs, and establish an A-infinity structure that extends the open-closed Hochschild differential.

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  1. Non-commutative calculus and Getzler-Gauss-Manin connections for Open-closed Homotopy Algebras

    math.QA 2026-06 unverdicted novelty 5.0

    Establishes calculus structure on Hochschild invariants of open-closed homotopy algebras and shows the Getzler-Gauss-Manin connection is flat up to chain homotopy on the periodic cyclic chain complex.