English

Subspace-hypercyclic conditional type operators on $L^p$-spaces

Functional Analysis 2022-11-16 v1

Abstract

A conditional weighted composition operator Tu:Lp(Σ)Lp(A)T_u: L^p(\Sigma)\rightarrow L^p(\mathcal{A}) (1p<1\leq p<\infty), is defined by Tu(f):=EA(ufφ)T_u(f):= E^{\mathcal{A}}(u f\circ \varphi), where φ:XX\varphi: X\rightarrow X is a measurable transformation, uu is a weight function on XX and EAE^{\mathcal{A}} is the conditional expectation operator with respect to A\mathcal{A}. In this paper, we study the subspace-hypercyclicity of TuT_u with respect to Lp(A)L^p(\mathcal{A}). First, we show that if φ\varphi is a periodic nonsingular transformation, then TuT_u is not Lp(A)L^p(\mathcal{A})-hypercyclic. The necessary conditions for the subspace-hypercyclicity of TuT_u are obtained when φ\varphi is non-singular and finitely non-mixing. For the sufficient conditions, the normality of φ\varphi is required. The subspace-weakly mixing and subspace-topologically mixing concepts are also studied for TuT_u. Finally, we give an example which is subspace-hypercyclic while is not hypercyclic.

Keywords

Cite

@article{arxiv.2211.07939,
  title  = {Subspace-hypercyclic conditional type operators on $L^p$-spaces},
  author = {M. R. Azimi and Z. Naghdi},
  journal= {arXiv preprint arXiv:2211.07939},
  year   = {2022}
}
R2 v1 2026-06-28T05:55:33.660Z