VARIETY OF BICOMMUTATIVE ALGEBRAS DEFINED BY IDENTITY Γ[(AB)C − 2(BA)C + (CA)B] + Δ[C(BA) − 2C(AB) + B(AC)] = 0

Bakirova, Altynay

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dc.contributor.author	Bakirova, Altynay
dc.date.accessioned	2022-05-16T10:37:56Z
dc.date.available	2022-05-16T10:37:56Z
dc.date.issued	2022-05
dc.identifier.citation	Altynay Bakirova (2022). Variety of Bicommutative Algebras defined by identity γ[(ab)c − 2(ba)c + (ca)b] + δ[c(ba) − 2c(ab) + b(ac)] = 0. Nazarbayev University, Nur-sultan, Kazakhstan	en_US
dc.identifier.uri	http://nur.nu.edu.kz/handle/123456789/6153
dc.description.abstract	One of the important problem of the theory of polynomial identi tites in algebra is describe all varieties of algebras with given system of identities. Our aim is to classify all subvarieties of the variety of bicom mutative algebras. Classifying is usually done in the language of lattices. Of course this problem is equivalent to describing of T-ideals. In order to construct a lattice of subvarieties of given variety of algebras, we need to define the following 1) determine the module structure of Pn(M) over the symmetric group; 2) find for each irreducible Sn-module in Pn(M) a consequence in Pn+1(M).	en_US
dc.language.iso	en	en_US
dc.publisher	Nazarbayev University School of Sciences and Humanities	en_US
dc.rights	Attribution-NonCommercial-ShareAlike 3.0 United States	*
dc.rights.uri	http://creativecommons.org/licenses/by-nc-sa/3.0/us/	*
dc.subject	Type of access: Restricted	en_US
dc.subject	algebra	en_US
dc.title	VARIETY OF BICOMMUTATIVE ALGEBRAS DEFINED BY IDENTITY Γ[(AB)C − 2(BA)C + (CA)B] + Δ[C(BA) − 2C(AB) + B(AC)] = 0	en_US
dc.type	Master's thesis	en_US
workflow.import.source	science