TY - JOUR
AB - In this article we answer a question raised by N. Feldman in 2008 concerning the dynamics of tuples of operators on R-n. In particular, we prove that for every positive integer n >= 2 there exist n-tuples (A1, A2,..., A(n)) of n x n matrices over R such that (A1, A2,..., A(n)) is hypercyclic. We also establish related results for tuples of 2 x 2 matrices over R or C being in Jordan form.
AU - Costakis, G.
AU - Hadjiloucas, D.
AU - Manoussos, Antonios
ID - 1636629
IS - 03
JF - Proceedings of the American Mathematical Society
KW - Hypercyclic operators
KW - tuples of matrices
SN - 0002-9939
TI - Dynamics of tuples of matrices
VL - 137
ER -