Multiplicity-free quotient tensor algebras
2001 ◽
Vol 71
(2)
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pp. 279-298
Keyword(s):
AbstractLet V be an infinite-dimensional vector space ovre a field of characteristic 0. It is well known that the tensor algebra T on V is a completely reducible module for the general linear group G on V. This paper is concerned with those quotient algebras A of T that are at the same time modules for G. A partial solution is given to the problem of determinig those A in which no irreducible constitutent has multiplicity greater thatn 1.
2017 ◽
Vol 83
(12)
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pp. 83-111
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Keyword(s):
2004 ◽
Vol 134
(3)
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pp. 477-499
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2007 ◽
Vol 22
(11)
◽
pp. 807-817
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2018 ◽
Vol 61
(2)
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pp. 437-447
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Keyword(s):