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Let $G$ be a non-abelian locally compact group, when$M(G)$ be the measure algebra of $G$ ($M(G)$), and$B(G)$ be the Fourier Stieltjes algebra of $G$ ($B(G)$), are semi simple?..
Question. When are $M(G)$ and $B(G)$ semi-simple?
Let $G$ be a non-abelian locally compact group, when the measure algebra of $G$ ($M(G)$), and the Fourier Stieltjes algebra of $G$ ($B(G)$), are semi simple?
Let $G$ be a non-abelian locally compact group, $M(G)$ be the measure algebra and$B(G)$ be the Fourier Stieltjes algebra of $G$..
Let $G$ be a non-abelian locally compact group, when the measure algebra of $G$ ($M(G)$), and the Fourier Stieltjes algebra of $G$ ($B(G)$), are semi simple?
