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We prove that, for a Poisson vertex algebra V, the canonical injective homomorphism of the variational cohomology of V to its classical cohomology is an isomorphism, provided that V, viewed as a differential algebra, is an algebra of differential polynomials in finitely many differential variables. This theorem is one of the key ingredients in the computation of vertex algebra cohomology. For its proof, we introduce the sesquilinear Hochschild and Harrison cohomology complexes and prove a vanishing theorem for the symmetric sesquilinear Harrison cohomology of the algebra of differential polynomials in finitely many differential variables.

Classical and variational Poisson cohomology / Bakalov, B.; De Sole, A.; Heluani, R.; Kac, V. G.; Vignoli, V.. - In: JAPANESE JOURNAL OF MATHEMATICS. NEW SERIES. - ISSN 0289-2316. - 16:2(2021), pp. 203-246. [10.1007/s11537-021-2109-2]

Classical and variational Poisson cohomology

Bakalov B.;De Sole A.;Heluani R.;Kac V. G.;Vignoli V.

2021

Abstract

We prove that, for a Poisson vertex algebra V, the canonical injective homomorphism of the variational cohomology of V to its classical cohomology is an isomorphism, provided that V, viewed as a differential algebra, is an algebra of differential polynomials in finitely many differential variables. This theorem is one of the key ingredients in the computation of vertex algebra cohomology. For its proof, we introduce the sesquilinear Hochschild and Harrison cohomology complexes and prove a vanishing theorem for the symmetric sesquilinear Harrison cohomology of the algebra of differential polynomials in finitely many differential variables.

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	Anno di pubblicazione
	
			2021
		
	Parole chiave
	
			classical operad; classical PVA cohomology; Poisson vertex algebra (PVA); sesquilinear Hochschild and Harrison cohomology; variational PVA cohomology
		
	Tipologia
	
			01 Pubblicazione su rivista::01a Articolo in rivista
		
	Citazione
	
			Classical and variational Poisson cohomology / Bakalov, B.; De Sole, A.; Heluani, R.; Kac, V. G.; Vignoli, V.. - In: JAPANESE JOURNAL OF MATHEMATICS. NEW SERIES. - ISSN 0289-2316. - 16:2(2021), pp. 203-246. [10.1007/s11537-021-2109-2]
		
	Appartiene alla tipologia:
	
			01a Articolo in rivista

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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11573/1624787

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