Proves the BV pushforward is a quasi-isomorphism of BV complexes via homological perturbation lemma and gives a path integral formula for its quasi-inverse.
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3 Pith papers cite this work. Polarity classification is still indexing.
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math-ph 3years
2026 3verdicts
UNVERDICTED 3representative citing papers
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.
The authors prove the absence of non-zero trivalent tree-level scattering amplitudes in su(n) field theory toy models via homological perturbation theory and demonstrate non-trivial higher products in an enlarged field space.
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BV pushforward as a quasi-isomorphism
Proves the BV pushforward is a quasi-isomorphism of BV complexes via homological perturbation lemma and gives a path integral formula for its quasi-inverse.
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Homotopies in Batalin-Vilkovisky Formalism
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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Field theory of $\mathfrak{su}(n)$: the absence of non-zero scatterings
The authors prove the absence of non-zero trivalent tree-level scattering amplitudes in su(n) field theory toy models via homological perturbation theory and demonstrate non-trivial higher products in an enlarged field space.