Extreme non-Arens regularity of the group algebra

Abstract

Following Granirer, a Banach algebra A is extremely non-Arens regular when the quotient space A*/WAP(A) contains a closed linear subspace which has A* as a continuous linear image. We prove that the group algebra L1(G) of any infinite locally compact group is always extremely non-Arens regular. When G is not discrete, this result is deduced from the much stronger property that, in fact, there is a linear isometric copy of L∞(G) in the quotient space L∞(G)/CB(G), where CB(G) stands for the algebra of all continuous and bounded functions on G.