Topological Invariant Means on Locally Compact Groups

Abstract

Suppose G is an amenable locally compact group. If \Fγ\ = \Fγ\γ∈ is a Flner net for G, associate it with the net \Fγ / |Fγ|\ ⊂ L1(G) ⊂ L∞*(G). Thus, every accumulation point of \Fγ\ is a topological left-invariant mean on G. The following are examples of results proved in the present thesis: (1) There exists a Flner net which has as its accumulation points a set of 22 distinct topological left-invariant means on G, where is the smallest cardinality of a covering of G by compact subsets. (2) If G is unimodular and μ is a topological left-invariant mean on G, there exists a Flner net which has μ as its unique accumulation point. (3) Suppose L ⊂ G is a lattice subgroup. There is a natural bijection of the left-invariant means on L with the topological left-invariant means on G if and only if G/L is compact. (4) Every topological left-invariant mean on G is also topological right-invariant if and only if G has precompact conjugacy classes. These results lie at the intersection of functional analysis with general topology. Problems in this area can often be solved with standard tools when G is σ-compact or metrizable, but require more interesting arguments in the general case.