Some properties of subspaces-hypercyclic operators

TL;DR

This paper investigates properties of subspace-hypercyclic operators, establishing density results, relations between hypercyclicity in orthogonal complements, and criteria for bilateral weighted shifts to be subspace-hypercyclic.

Contribution

It provides new results on the density of orbits in subspaces, links between hypercyclicity in orthogonal complements, and conditions for bilateral weighted shifts to exhibit subspace-hypercyclicity.

Findings

Density of projected orbits in subspaces

Relations between ${ m M}^ot$-hypercyclicity and projections

Sufficient conditions for bilateral weighted shifts to be subspace-hypercyclic

Abstract

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