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Group Identities on Units and Symmetric Units of Group Rings

Group Identities on Units and Symmetric Units of Group Rings
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Dewey Class 512.46
Titel Group Identities on Units and Symmetric Units of Group Rings ([Ebook]) / by Gregory T. Lee.
Verfasser Lee, Gregory T.
Other name(s) SpringerLink (Online service)
Veröffentl London : Springer London , 2010.
Physical Details XII, 196 pages : online resource.
Reihe Algebra and Applications ; 12
ISBN 9781849965040
Summary Note Let FG be the group ring of a group G over a field F. Write U(FG) for the group of units of FG. It is an important problem to determine the conditions under which U(FG) satisfies a group identity. In the mid 1990s, a conjecture of Hartley was verified, namely, if U(FG) satisfies a group identity, and G is torsion, then FG satisfies a polynomial identity. Necessary and sufficient conditions for U(FG) to satisfy a group identity soon followed. Since the late 1990s, many papers have been devoted to the study of the symmetric units; that is, those units u satisfying u* = u, where * is the involution on FG defined by sending each element of G to its inverse. The conditions under which these symmetric units satisfy a group identity have now been determined. This book presents these results for arbitrary group identities, as well as the conditions under which the unit group or the set of symmetric units satisfies several particular group identities of interest.:
Contents note Group Identities on Units of Group Rings -- Group Identities on Symmetric Units -- Lie Identities on Symmetric Elements -- Nilpotence of U(FG) and U+(FG) -- The Bounded Engel Property -- Solvability of U(FG) and U+(FG) -- Further Reading -- Some Results on Prime and Semiprime Rings.
System details note Online access to this digital book is restricted to subscription institutions through IP address (only for SISSA internal users).
Internet Site http://dx.doi.org/10.1007/978-1-84996-504-0
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  • Schlagwörter: .
  • Algebra .
  • Associative Rings and Algebras .
  • Group theory .
  • Group Theory and Generalizations .
  • Mathematics .

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