Some remarks on invariant means

AbstractLet with . If G is a nondiscrete locally compact group which is amenable as a discrete group and m ∈ LIM(CB(G)), then we can embed into the set of all extensions of m to left invariant means on L∞(G) which are mutually singular to every element of TLIM(L∞(G)), where LIM(S) and TLIM(S) are the sets of left invariant means and topologically left invariant means on S with S = CB(G) or L∞(G). It follows that the cardinalities of LIM(L∞(G)) ̴ TLIM(L∞(G)) and LIM(L∞(G)) are equal. Note that which contains is a very big set. We also embed into the set of all left invariant means on CB(G) which are mutually singular to every element of TLIM(CB(G)) for G = G1 ⨯ G2, where G1 is nondiscrete, non–compact, σ–compact and amenable as a discrete group and G2 is any amenable locally compact group. The extension of any left invariant mean on UCB(G) to CB(G) is discussed. We also provide an answer to a problem raised by Rosenblatt.

Download Full-text

Fixed points and left invariant means on subspaces of C(S)

Lecture Notes in Mathematics - Compact Right Topological Semigroups and Generalizations of Almost Periodicity ◽

10.1007/bfb0061385 ◽

1978 ◽

pp. 150-165

Author(s):

John F. Berglund ◽

Hugo D. Junghenn ◽

Paul Milnes

Keyword(s):

Fixed Points ◽

Invariant Means

Download Full-text

Invariant means on weakly almost periodic functions and generalized fixed point properties

The Journal of Analysis ◽

10.1007/s41478-020-00254-w ◽

2020 ◽

Author(s):

Ahmed H. Soliman ◽

Mohammad Imdad ◽

Md Ahmadullah

Keyword(s):

Fixed Point ◽

Almost Periodic Functions ◽

Almost Periodic ◽

Periodic Functions ◽

Weakly Almost Periodic ◽

Fixed Point Properties ◽

Invariant Means

Download Full-text

Invariant Means and Reversible Semigroup of Relatively Nonexpansive Mappings in Banach Spaces

Abstract and Applied Analysis ◽

10.1155/2014/694783 ◽

2014 ◽

Vol 2014 ◽

pp. 1-9

Author(s):

Kyung Soo Kim

Keyword(s):

Banach Space ◽

Convex Subset ◽

Nonexpansive Mappings ◽

Nonempty Closed Convex Subset ◽

Common Element ◽

Mild Conditions ◽

Relatively Nonexpansive Mappings ◽

Relatively Nonexpansive ◽

Reversible Semigroup ◽

Invariant Means

The purpose of this paper is to study modified Halpern type and Ishikawa type iteration for a semigroup of relatively nonexpansive mappingsI={T(s):s∈S}on a nonempty closed convex subsetCof a Banach space with respect to a sequence of asymptotically left invariant means{μn}defined on an appropriate invariant subspace ofl∞(S), whereSis a semigroup. We prove that, given some mild conditions, we can generate iterative sequences which converge strongly to a common element of the set of fixed pointsF(I), whereF(I)=⋂{F(T(s)):s∈S}.

Download Full-text