Examples of Lie and Balinsky-Novikov algebras related to Hamiltonian operators

Artemovych Orest D.; Prykarpatski Anatolij K.; Blackmore Denis L.

doi:10.1515/taa-2018-0005

Topological Algebra and its Applications (Mar 2018)

Examples of Lie and Balinsky-Novikov algebras related to Hamiltonian operators

Artemovych Orest D.,
Prykarpatski Anatolij K.,
Blackmore Denis L.

Affiliations

Artemovych Orest D.: Institute of Mathematics Cracow University of Technology, ul Warszawska 24, Kraków 31-155, Poland
Prykarpatski Anatolij K.: Institute of Mathematics Cracow University of Technology, ul Warszawska 24, Kraków 31-155, Poland
Blackmore Denis L.: Department of Mathematical Sciences at NJIT, University Heights, Newark, NJ 07-102, USA

DOI: https://doi.org/10.1515/taa-2018-0005
Journal volume & issue: Vol. 6, no. 1
pp. 43 – 52

Abstract

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We study algebraic properties of Poisson brackets on non-associative non-commutative algebras, compatible with their multiplicative structure. Special attention is paid to the Poisson brackets of the Lie-Poisson type, related with the special Lie-structures on the differential-topological torus and brane algebras, generalizing those studied before by Novikov-Balinsky and Gelfand-Dorfman. Illustrative examples of Lie and Balinsky-Novikov algebras are discussed in detail. The non-associative structures (induced by derivation and endomorphism) of commutative algebras related to Lie and Balinsky-Novikov algebras are described in depth.

Published in Topological Algebra and its Applications

ISSN: 2299-3231 (Online)
Publisher: De Gruyter
Country of publisher: Poland
LCC subjects: Science: Mathematics
Website: https://www.degruyter.com/journal/key/taa/html

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