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Sibirskii Matematicheskii Zhurnal, 2011, Volume 52, Number 2, Pages 416–429
(Mi smj2207)
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This article is cited in 5 scientific papers (total in 5 papers)
Identities in the varieties generated by the algebras of upper triangular matrices
S. M. Ratseev Ul'yanovsk State University, Ul'yanovsk, Russia
Abstract:
Consider the algebra $UT_s$ of upper triangular matrices of size $s$ over an arbitrary field. Petrogradsky proved that the exponent of an arbitrary subvariety in $\operatorname{var}(UT_s)$ exists and is an integer. We strengthen the estimates for the growth of these varieties and provide equivalent conditions for finding these exponents. Kemer showed that in the case of a ground field of characteristic zero there exists no varieties of associative algebras with growth intermediate between polynomial and exponential. We prove that this property extends to the case of the fields of arbitrary characteristic distinct from 2.
Keywords:
associative algebra, variety of algebras, growth of varieties, algebra of upper triangular matrices.
Received: 28.01.2010
Citation:
S. M. Ratseev, “Identities in the varieties generated by the algebras of upper triangular matrices”, Sibirsk. Mat. Zh., 52:2 (2011), 416–429; Siberian Math. J., 52:2 (2011), 329–339
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https://www.mathnet.ru/eng/smj2207 https://www.mathnet.ru/eng/smj/v52/i2/p416
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Abstract page: | 361 | Full-text PDF : | 85 | References: | 49 | First page: | 2 |
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