H. R. Rostami, “Non-unitarizable groups”, Proceedings of the YSU, Physical and Mathematical Sciences, 2010, no. 3, 40

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Proceedings of the Yerevan State University, series Physical and Mathematical Sciences, 2010, Issue 3, Pages 40–43 (Mi uzeru223)

Mathematics

Non-unitarizable groups

H. R. Rostami

Chair of Algebra and Geometry YSU, Armenia

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Abstract: A group

G

$G$ is called unitarizable, if every uniformly bounded representation

π : G \to B (H)

$\pi:G\to B(H)$ of

G

$G$ on a Hilbert space

H

$H$ is unitarizable. N. Monod and N. Ozawa in [6] prove that free Burnside groups

B (m, n)

$B(m,n)$ are non unitarizable for arbitrary composite odd number

n = n_{1} n_{2}

$n=n_1n_2$ , where

n_{\geq} 665

$n_\geq665$ . We prove that for the same

n

$n$ the groups

B (4, n)

$B(4,n)$ have continuum many non-isomorphic factor-groups, each one of which is non-unitarizable and uniformly non-amenable.

Keywords: representation of group, unitarizable group, free Burnside group, periodic group.

Received: 05.09.2009
Accepted: 15.10.2009

Document Type: Article

Language: English

Citation: H. R. Rostami, “Non-unitarizable groups”, Proceedings of the YSU, Physical and Mathematical Sciences, 2010, no. 3, 40–43

Citation in format AMSBIB

\Bibitem{Ros10}

\by H.~R.~Rostami

\paper Non-unitarizable groups

\jour Proceedings of the YSU, Physical  and Mathematical Sciences

\yr 2010

\issue 3

\pages 40--43

\mathnet{http://mi.mathnet.ru/uzeru223}

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https://www.mathnet.ru/eng/uzeru/y2010/i3/p40

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Proceedings of the Yerevan State University, series Physical and Mathematical Sciences

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