Some properties of subspaces-hypercyclic operators

Abstract

In this paper, we answer a question posed in the introduction of sub hyp positively, i.e, we show that if T is M-hypercyclic operator with M-hypercyclic vector x in a Hilbert space H, then P(Orb(T,x)) is dense in the subspace M where P is the orthogonal projection onto M. Furthermore, we give some relations between M-hypercyclicity and the orthogonal projection onto M. We also give sufficient conditions for a bilateral weighted shift operators on a Hilbert space 2( Z) to be subspace-hypercyclic, cosequently, there exists an operator T such that both T and T* are subspace-hypercyclic operators. Finally, we give an M-hypercyclic criterion for an operator T in terms of its eigenvalues.