Fixed point properties of semigroups of non-expansive mappings

Abstract: In recent years, there have been considerable interests in the study of when a closed convex subset K of a Banach space has the fixed point property, i.e. whenever T is a non-expansive mapping from K into K, then K contains a fixed point for T . In this paper we shall study fixed point properties of semigroups of non-expansive mappings on weakly compact convex subsets of a Banach space (or, more generally, a locally convex space). By considering the classes of bicyclic semigroups we answer two open questions, … Show more

“…X is amenable if X is left and right amenable. The semigroup S is called amenable if B.S / has an invariant mean (see, [27][28][29]). Moreover, S is amenable when S is a commutative semigroup or a solvable group.…”

Convergence and stability of generalized φ-weak contraction mapping in CAT(0) spaces

“…X is amenable if X is left and right amenable. The semigroup S is called amenable if B.S / has an invariant mean (see, [27][28][29]). Moreover, S is amenable when S is a commutative semigroup or a solvable group.…”

Convergence and stability of generalized φ-weak contraction mapping in CAT(0) spaces

“…It is also well-known that if AP(S), the space of continuous almost periodic functions on S, has a left invariant mean, C is compact, convex and S is a nonexpansive representation of S on C, then F (S) = ∅ (see [24,27,32]). …”

Fixed point properties for semigroups of nonlinear mappings and amenability

“…In particular, if S is left amenable as a discrete semigroup, then S is left reversible. Left reversible semigroups have played an important role in the study of common fixed point theorems and ergodic type theorems for semigroups of nonexpansive mappings (see [18,22,23,[30][31][32][34][35][36]). …”

Fixed point property for Banach algebras associated to locally compact groups