Supercyclicity of the left and right multiplication operators on Banach ideal of operators

Abstract

Let X be a Banach space with X>1 such that X, its dual, is separable and B(X) the algebra of bounded linear operators on X. In this paper, we study the passage of property of being supercyclic from an operator T∈B(X) to the left and right multiplication induced by T on separable admissible Banach ideal of B(X). We give a sufficient condition for the tensor product TR of two operators to be supercyclic. As a consequence, we give another equivalent conditions for the Supercyclicity Criterion.