Amenability of Closed Subgroups and Orlicz Spaces
Abstract
We prove that a closed subgroup H of a second countable locally compact group G is amenable if and only if its left regular representation on an Orlicz space L(G) for some 2-regular N-function almost has invariant vectors. We also show that a noncompact second countable locally compact group G is amenable if and ony if the first cohomology space H1(G,L(G)) is non-Hausdorff for some 2-regular N-function .
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