Adlene Ayadi, Habib Marzougui
Published 2011-05-07Version 1
We give a characterization of hypercyclic finitely generated abelian semigroups of matrices on C^n using the extended limit sets (the J-sets). Moreover we construct for any n\geq 2 an abelian semigroup G of GL(n;C) generated by n + 1 diagonal matrices which is locally hypercyclic but not hypercyclic and such that JG(e_k) = C^n for every k = 1; : : : ; n, where (e_1; : : : ; e_n) is the canonical basis of C^n. This gives a negative answer to a question raised by Costakis and Manoussos.
A review of some recent work on hypercyclicity
Hypercyclicity of Weighted shifts on weighted Bergman and Dirichlet spaces
Hypercyclicity of Shifts on Weighted ${\mathbf L}^p$ Spaces of Directed Trees
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