Convex-Cyclicity and K-Transitivity Of Semigroups of Operators on Finite and Infinite Dimensional Spaces

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Authors

  • Abhay Kumar
     Department of Mathematics, H.N.B. Garhwal Central University, Srinagar, Uttarakhand ,IN

DOI:

https://doi.org/10.18311/jims/2024/30002

Keywords:

Convex-cyclic operator, E-convex-cyclic operator, Convex cone transitive, Somewhere dense orbits
47A16, 37B05

Abstract

We study convex-cyclicity, various weak notions of convexcyclicity, and their relation to somewhere density. Further, we give another proof that does not use the structure theorem of the result that there does not exist a k-transitive semigroup T of matrices for k ≥ 2 given by Adlene Ayadi.

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Published

2024-01-01

How to Cite

Kumar, A. (2024). Convex-Cyclicity and K-Transitivity Of Semigroups of Operators on Finite and Infinite Dimensional Spaces. The Journal of the Indian Mathematical Society, 91(1-2), 83–94. https://doi.org/10.18311/jims/2024/30002

Issue

Volume 91, Issue 1-2, January-June 2024

Section

Articles

License

Copyright (c) 2024 Abhay Kumar

Creative Commons License

This work is licensed under a Creative Commons Attribution 4.0 International License.

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Europe PMC
Received 2022-04-18
Accepted 2022-10-12
Published 2024-01-01

 

References

A. Ayadi, Hypercyclic abelian semigroup of matrices on Rn and Cn and k-transitivity (k ≥ 2), Applied General Topology, 12(1), (2011), 35-39.

A. Ayadi, H. Marzougui, Hypercyclic abelian semigroup of matrices on Rn, Topology and its Applications, 210, (2016), 29-45.

F. Bayart, E. Matheron, Dynamics of linear operators, Cambridge University Press, Cambridge, 2009.

T. Bermudez, A. Bonilla, and N. S. Feldman, On convex-cyclic operators, Journal of Mathematical Analysis and Applications, 434(2), (2016), 1166-1181.

P. S. Bourdon, and N. S. Feldman, Somewhere dense orbits are everywhere dense, Indiana Uni. Math. Journal, 52, (2003), 811-819.

N. S. Feldman, and P. McGuire, Convex-cyclic matrices, convex-polynomial interpolation and invariant convex sets, Operators and Matrices, 11(2), (2015), 11-31.

K. G. Grosse-Erdmann, A. P. Manguillot, Linear Chaos, Springer, 2011.

A. Kumar, S. Srivastava, Supercyclic C0-semigroups, stability and somewhere dense orbits, Journal of Mathematical Analysis and Applications, 476, (2019), 539-548.

A. Kumar, S. Srivastava, Supercyclicity Criteria for C0-Semigroups, Advances in Operator Theory, 5(2), (2020), 1646-1666.

A. Kumar, Hypercyclicity and Supercyclicity of Unbounded Operators, Advances in Operator Theory, 7(4), (2022), 1-20.

A. Kumar, Supercyclic Composition C0-Semigroups, The Journal of Analysis, 31(2), (2023), 1175-1190.

H. Rezaei, On the convex hull generated by orbit of operators, Linear Algebra and its Applications, 438(11), (2013), 4190-4203.