Frequently hypercyclic $C_0$-semigroups indexed with complex sectors

Abstract: In this paper, we study frequent hypercyclicity for strongly continuous semigroups of operators $\left{T_{t}\right}{t\in\Delta}$ indexed with complex sectors. We propose a revised and more natural definition of frequent hypercyclicity compared to the one in [Chaouchi et al.,2020]. Additionally, we establish a sufficient condition and a necessary condition for a $C_0$-semigroup ${T{t}}{t \in \Delta}$ to be frequently hypercyclic. Moreover, we derive a practical and applicable criterion for translation semigroups ${T{t}}{t \in \Delta}$ on $L^p\rho(\Delta, \mathbb{K})$ spaces, expressed in terms of the integral of the weight function. As a result, we provide explicit examples of frequently hypercyclic translation semigroups on $L^{p}_{\rho}(\Delta, \mathbb{K})$. Lastly, we present a necessary condition on the weight function for the translation semigroups, under which it is demonstrated that Example I (i) [Chaouchi,2020] is not frequently hypercyclic under the revised definition.