Some properties of the mapping Tμ introduced by a representation in Banach and locally convex spaces

Abstract

Let =\Ts:s∈ S\ be a representation of a semigroup S. First, we prove that the mapping Tμ introduced by a mean on a subspace of l∞(S) has many properties of the mappings in the representation , in Banach spaces. Then we consider a directed graph and then we define a Q-G-nonexpansive mapping in locally convex spaces and show that Tμ is a Q-G-nonexpansive mapping if Ts is a Q-G-nonexpansive mapping for each s∈ S. Then we define Q-G-attractive point of and show if a point a is a Q-G-attractive point of then a is a Q-G-attractive point of Tμ.