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http://repositorio.ufla.br/jspui/handle/1/34598| Title: | Group algebras whose units satisfy a laurent polynomial identity |
| Keywords: | Group rings Polynomial identities Laurent identities |
| Issue Date: | Oct-2018 |
| Publisher: | Springer |
| Citation: | BROCHE, O.; GONÇALVES, J. Z.; DEL RÍO, Á. Group algebras whose units satisfy a laurent polynomial identity. Archiv der Mathematik, [S.l.], v. 111, n. 4, p. 353 - 367, Oct. 2018. |
| Abstract: | Let KG be the group algebra of a torsion group G over a field K. We show that if the units of KG satisfy a Laurent polynomial identity, which is not satisfied by the units of the relative free algebra K[α,β:α2=β2=0] , then KG satisfies a polynomial identity. This extends Hartley’s Conjecture which states that if the units of KG satisfy a group identity, then KG satisfies a polynomial identity. As an application we prove that if the units of KG satisfy a Laurent polynomial identity whose support has cardinality at most 3, then KG satisfies a polynomial identity. |
| URI: | https://link.springer.com/article/10.1007/s00013-018-1223-8 http://repositorio.ufla.br/jspui/handle/1/34598 |
| Appears in Collections: | DEX - Artigos publicados em periódicos |
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