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arxiv: 2209.05836 · v1 · pith:MTM6BM2L · submitted 2022-09-13 · math.SG · math-ph· math.MP· math.QA

Observables on multisymplectic manifolds and higher Courant algebroids

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classification math.SG math-phmath.MPmath.QA
keywords embeddingomegaforminftyalgebracouranthigherobservables
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Let $\omega$ be a closed, non-degenerate differential form of arbitrary degree. Associated to it there are an $L_{\infty}$-algebra of observables, and an $L_{\infty}$-algebra of sections of the higher Courant algebroid twisted by $\omega$. Our main result is the existence of an $L_{\infty}$-embedding of the former into the latter. We display explicit formulae for the embedding, involving the Bernoulli numbers. When $\omega$ is an integral symplectic form, the embedding can be realized geometrically via the prequantization construction, and when $\omega$ is a 3-form the embedding was found by Rogers in 2010. Further, in the presence of homotopy moment maps, we show that the embedding is compatible with gauge transformations.

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