m at h . FA ] 2 1 Ju n 20 06 OPERATOR AMENABILITY OF FOURIER – STIELTJES ALGEBRAS , II
نویسنده
چکیده
We give an example of a non-compact, locally compact group G such that its Fourier–Stieltjes algebra B(G) is operator amenable. Furthermore, we characterize those G for which A * (G)—the spine of B(G) as introduced by M. Ilie and the second named author—is operator amenable and show that A * (G) is operator weakly amenable for each G.
منابع مشابه
ar X iv : m at h / 05 07 37 3 v 1 [ m at h . FA ] 1 8 Ju l 2 00 5 OPERATOR AMENABILITY OF FOURIER – STIELTJES ALGEBRAS , II
We give an example of a non-compact, locally compact group G such that its Fourier–Stieltjes algebra B(G) is operator amenable. Furthermore, we characterize those G for which A * (G)—the spine of B(G) as introduced by M. Ilie and the second named author is operator amenable and show that A * (G) is operator weakly amenable for each G.
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We give an example of a non-compact, locally compact group G such that its Fourier–Stieltjes algebra B(G) is operator amenable. Furthermore, we characterize those G for which A * (G)—the spine of B(G) as introduced by M. Ilie and the second named author—is operator amenable and show that A * (G) is operator weakly amenable for each G.
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