Inner invariant means on locally compact topological semigroups

AbstractLet S and T be locally compact topological semigroups and a semidirect product. Conditions are determined under which topological left amenability of S and T implies that of , and conversely. The results are used to show that for a large class of semigroups which are neither compact nor groups, various notions of topological left amenability coincide.

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Topological semigroups with invariant means in the convex hull of multiplicative means

Transactions of the American Mathematical Society ◽

10.1090/s0002-9947-1970-0257260-5 ◽

1970 ◽

Vol 148 (1) ◽

pp. 69-69 ◽

Cited By ~ 10

Author(s):

Anthony To-ming Lau

Keyword(s):

Convex Hull ◽

Topological Semigroups ◽

Invariant Means

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Equivalent types of invariant means on locally compact groups

Proceedings of the American Mathematical Society ◽

10.1090/s0002-9939-1972-0304974-1 ◽

1972 ◽

Vol 31 (2) ◽

pp. 495-495 ◽

Cited By ~ 2

Author(s):

P. F. Renaud

Keyword(s):

Locally Compact Groups ◽

Compact Groups ◽

Locally Compact ◽

Invariant Means

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The Extensions of an Invariant Mean and the Set LIM ∽ TLIM

Canadian Journal of Mathematics ◽

10.4153/cjm-1994-046-x ◽

1994 ◽

Vol 46 (4) ◽

pp. 808-817

Author(s):

Tianxuan Miao

Keyword(s):

Compact Group ◽

Discrete Group ◽

Locally Compact Group ◽

Invariant Mean ◽

Locally Compact ◽

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.

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Certain semigroups embeddabable in topological groups

Journal of the Australian Mathematical Society. Series A. Pure Mathematics and Statistics ◽

10.1017/s1446788700017584 ◽

1982 ◽

Vol 33 (1) ◽

pp. 30-39 ◽

Cited By ~ 2

Author(s):

Heneri A. M. Dzinotyiweyi

Keyword(s):

Invariant Measures ◽

Locally Compact Group ◽

Continuous Measure ◽

Topological Groups ◽

Empty Interior ◽

Locally Compact ◽

Absolutely Continuous ◽

Topological Semigroups ◽

Absolutely Continuous Measure ◽

Locally Compact Topological Group

AbstractIn this paper we study commutative topological semigroups S admitting an absolutely continuous measure. When S is cancellative we show that S admits a weaker topology J with respect to which (S, J) is embeddable as a subsemigroup with non-empty interior in some locally compact topological group. As a consequence, we deduce certain results related to the existence of invariant measures on S and for a large class of locally compact topological semigroups S, we associate S with some useful topological subsemigroup of a locally compact group.

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Algebras of measures on C-distinguished topological semigroups

Mathematical Proceedings of the Cambridge Philosophical Society ◽

10.1017/s0305004100055146 ◽

1978 ◽

Vol 84 (2) ◽

pp. 323-336 ◽

Cited By ~ 3

Author(s):

H. A. M. Dzinotyiweyi

Keyword(s):

Total Variation ◽

Topological Semigroup ◽

Continuous Mapping ◽

Continuous Functions ◽

Compact Set ◽

Locally Compact ◽

Radon Measures ◽

Topological Semigroups ◽

Bounded Complex ◽

Complex Valued

Let S be a (jointly continuous) topological semigroup, C(S) the set of all bounded complex-valued continuous functions on S and M (S) the set of all bounded complex-valued Radon measures on S. Let (S) (or (S)) be the set of all µ ∈ M (S) such that x → │µ│ (x-1C) (or x → │µ│(Cx-1), respectively) is a continuous mapping of S into ℝ, for every compact set C ⊆ S, and . (Here │µ│ denotes the measure arising from the total variation of µ and the sets x-1C and Cx-1 are as defined in Section 2.) When S is locally compact the set Ma(S) was studied by A. C. and J. W. Baker in (1) and (2), by Sleijpen in (14), (15) and (16) and by us in (3). In this paper we show that some of the results of (1), (2), (14) and (15) remain valid for certain non-locally compact S and raise some new problems for such S.

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The cardinality of the set of left invariant means on topological semigroups

Bulletin of the Australian Mathematical Society ◽

10.1017/s0004972700026800 ◽

1988 ◽

Vol 37 (2) ◽

pp. 247-262 ◽

Cited By ~ 1

Author(s):

Heneri A.M. Dzinotyiweyi

Keyword(s):

Large Class ◽

Topological Semigroup ◽

Continuous Functions ◽

Upper Bounds ◽

Compact Sets ◽

Lower And Upper Bounds ◽

Topological Semigroups ◽

Invariant Means ◽

Uniformly Continuous

For a very large class of topological semigroups, we establish lower and upper bounds for the cardinality of the set of left invariant means on the space of left uniformly continuous functions. In certain cases we show that such a cardinality is exactly , where b is the smallest cardinality of the covering of the underlying topological semigroup by compact sets.

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