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.
How to derive Feynman diagrams for finite-dimensional integrals directly from the BV formalism,
2 Pith papers cite this work. Polarity classification is still indexing.
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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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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.