Para-chaotic tuples of operators (Q2895756)

In the paper, para-chaotic tuples of operators are introduced and some relations between para-chaoticity and the hypercyclicity criterion for a tuple of operators are given.NEWLINENEWLINE The main results of the paper are as follows.NEWLINENEWLINE (1) Let \(X\) be a separable infinite-dimensional Banach space and \({\mathcal T}=(T_1 ,T_2 ,\dots ,T_n )\) be an \(n\)-tuple of operators \(T_1 ,T_2 ,\dots ,T_n \) acting on \(X\). If there exist two dense subsets \(Y\) and \(Z\) in \(X\), and strictly increasing sequences \(\{ m_j(i) \}\) for \(i= 1,\dots, n\) such that (a) \(T_1 ^{m_j(1)} \cdots T_n ^{m_j(n)} y\rightarrow 0\;\forall y\in Y\), (b) there exists a sequence of functions \(\{ S_j :Z \rightarrow X \}\) such that for all \(z\in Z, \;S_j Z\rightarrow 0\), and \(T_1 ^{m_j(1)} \cdots T_n ^{m_j(n)} S_j z \rightarrow Z\), then \(\mathcal T\) is a hypercyclic tuple.NEWLINENEWLINE (2) Let \({\mathcal T}=(T_1 ,\dots ,T_n )\) be a tuple of continuous linear operators acting on a separable infinite-dimensional Banach space \(X\). If \(\mathcal T\) is para-chaotic, then \(\mathcal T\) satisfies the hypercylicity criterion.