G- Cyclicity And Somewhere Dense Orbit

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Zeana Zaki Jamil

Abstract

let H be an infinite – dimensional separable complex Hilbert space, and S be a multiplication semigroup of  with 1. An operator T is called G-cyclic over S if there is a non-zero vector xÎ H such that {aTn  x½aÎS, n ≥0} is norm-dense in H. Bourdon and Feldman have proved that the existence of somewhere dense orbits implies hypercyclicity. We show the corresponding result for G-cyclicity.

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G- Cyclicity And Somewhere Dense Orbit. Baghdad Sci.J [Internet]. 2010 Jun. 6 [cited 2024 Dec. 19];7(2):1053-5. Available from: https://bsj.uobaghdad.edu.iq/index.php/BSJ/article/view/11927
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How to Cite

1.
G- Cyclicity And Somewhere Dense Orbit. Baghdad Sci.J [Internet]. 2010 Jun. 6 [cited 2024 Dec. 19];7(2):1053-5. Available from: https://bsj.uobaghdad.edu.iq/index.php/BSJ/article/view/11927

References

Naoum, A. G. and Jamil, Z. Z.,(2005). G-cyclicity. Journal of Al-Nahrain University , 8 (2), 103-108.

Bourdon, P. and Feldman, N. (2003) Somewhere dense orbits are everywhere dense, Indiana Univ. math. J., 52(3), , 11-189.

Ansari, S., (1995) Hypercyclic and cyclic vectors, J. Funct. Anal. 12, 374-383.

Peris, A., (2001) Multi-hypercyclic operators are hypercyclic, Math. 2.236 779-786.

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