On the structure of $C^*$-algebra generated by a family of partial isometries and multipliers

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  • A. Yu. Kuznetsova Institute of Physics Kazan Federal University 18, Kremlevskaya str. 20008 Kazan, Russia
  • Ye. V. Patrin Institute of Physics Kazan Federal University 18, Kremlevskaya str. 20008 Kazan, Russia

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In the paper we consider an operator algebra generated by a family of partial isometries associated with a self-mapping on a countable set and by multipliers. An action of the unit circle on this algebra is specified that determines its $\mathbb{Z}$-grading. Under some conditions on the mapping the algebra is isomorphic to the crossed product of its fixed point subalgebra and the semigroup $\mathbb{N}$.

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2015-05-27

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Հտ․ 7 No. 1 (2015)

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Articles

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[1]
A. Y. Kuznetsova and Y. V. Patrin, “On the structure of $C^*$-algebra generated by a family of partial isometries and multipliers”, Armen.J.Math., vol. 7, no. 1, pp. 50–58, May 2015, Accessed: May 09, 2026. [Online]. Available: http://test.armjmath.sci.am/index.php/ajm/article/view/110