Homological propeties of Bimeasure algebras and their BSE properties

Abstract

Let G and H be locally compact groups. BM(G, H) denoted the Banach algebra of bounded bilinear forms on C0(G)× C0(H).In this paper, the homological properties of Bimeasure algebras are investigated. It is found and approved that the Bimeasure algebras BM(G, H) is amenable if and only if G and H are discrete. The correlation between the weak amenability of BM(G, H) and M(G× H) is assessed. It is found and approved that the biprojectivity of the bimeasure algebra BM(G, H) is equivalent to the finiteness of G and H. Furthermore, we show that the bimeasure group algebra BMa(G, H) is a BSE algebra. It will be concluded that BM(G, H) is a BSE- algebra if and only if G and H are discrete groups.