1. Disjoint hypercyclic powers of weighted translations on groups
- Author
-
Hui-Qiang Lu, Ze-Hua Zhou, Xiao-Mei Fu, and Liang Zhang
- Subjects
Discrete mathematics ,Mathematics::Functional Analysis ,010102 general mathematics ,Holomorphic function ,Disjoint sets ,Locally compact group ,01 natural sciences ,010101 applied mathematics ,Combinatorics ,Disjoint union (topology) ,Aperiodic graph ,Ordinary differential equation ,Standard probability space ,Locally compact space ,0101 mathematics ,Mathematics - Abstract
Let G be a locally compact group and let 1 ≤ p < 1. Recently, Chen et al. characterized hypercyclic, supercyclic and chaotic weighted translations on locally compact groups and their homogeneous spaces. There has been an increasing interest in studying the disjoint hypercyclicity acting on various spaces of holomorphic functions. In this note, we will study disjoint hypercyclic and disjoint supercyclic powers of weighted translation operators on the Lebesgue space L p(G) in terms of the weights. Sufficient and necessary conditions for disjoint hypercyclic and disjoint supercyclic powers of weighted translations generated by aperiodic elements on groups will be given.
- Published
- 2017