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This article is cited in 8 scientific papers (total in 8 papers)
Growth in Poisson algebras
S. M. Ratseev Ul'yanovsk State University, Ul'yanovsk, Russia
Abstract:
A criterion for polynomial growth of varieties of Poisson algebras is stated in terms of Young diagrams for fields of characteristic zero. We construct a variety of Poisson algebras with almost polynomial growth. It is proved that for the case of a ground field of arbitrary characteristic other than two, there are no varieties of Poisson algebras whose growth would be intermediate between polynomial and exponential. Let $V$ be a variety of Poisson algebras over an arbitrary field whose ideal of identities contains identities
$$
\{\{x_1,y_1\},\{x_2,y_2\},\dots,\{x_m,y_m\}\}=0,\qquad\{x_1,y_1\}\cdot\{x_2,y_2\}\cdot\ldots\cdot\{x_m,y_m\}=0,
$$
for some $m$. It is shown that the exponent of $V$ exists and is an integer.
For the case of a ground field of characteristic zero, we give growth estimates for multilinear spaces of a special form in varieties of Poisson algebras. Also equivalent conditions are specified for such spaces to have polynomial growth.
Keywords:
Poisson algebra, growth of variety, colength of variety.
Received: 22.11.2008 Revised: 20.04.2010
Citation:
S. M. Ratseev, “Growth in Poisson algebras”, Algebra Logika, 50:1 (2011), 68–88; Algebra and Logic, 50:1 (2011), 46–61
Linking options:
https://www.mathnet.ru/eng/al475 https://www.mathnet.ru/eng/al/v50/i1/p68
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Abstract page: | 477 | Full-text PDF : | 105 | References: | 65 | First page: | 9 |
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