Chaos in convolution operators on the space of entire functions of infinitely many complex variables

Abstract

A classical result of Godefroy and Shapiro states that every nontrivial convolution operator on the space H(Cn) of entire functions of several complex variables is hypercyclic. In sharp contrast with this result F\'avaro and Mujica show that no translation operator on the space H(CN) of entire functions of infinitely many complex variables is hypercyclic. In this work we study the linear dynamics of convolution operators on H(CN). First we show that no convolution operator on H(CN) is neither cyclic nor n-supercyclic for any positive integer n. After we study the notion of Li--Yorke chaos in non-metrizable topological vector spaces and we show that every nontrivial convolution operator on H(CN) is Li--Yorke chaotic.