On operator Connes-amenability of the Fourier-Stieltjes algebra
Abstract
Runde and Spronk showed in 2004 that there are non-amenable groups G, including F2, whose Fourier-Stieltjes algebra, B(G), is operator Connes-amenable. This result was surprising since the measure algebra M(G) is Connes-amenable if and only if G is amenable, which might lead one to guess that B(G) should be operator Connes-amenable if and only if G is amenable. This leads to the question: for which groups G is B(G) operator Connes-amenable? We make progress on this problem by exhibiting the first examples of groups for which B(G) is not operator Connes-amenable. More specifically, we show that B(G) is not operator Connes-amenable when G is a non-compact locally compact group with property (T) and finite almost periodic compactification, or when G is a discrete group without the factorization property.
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