Norm one idempotent cb-multipliers with applications to the Fourier algebra in the cb-multiplier norm

Abstract

For a locally compact group G, let A(G) be its Fourier algebra, let McbA(G) denote the completely bounded multipliers of A(G), and let AMcb(G) stand for the closure of A(G) in McbA(G). We characterize the norm one idempotents in McbA(G): the indicator function of a set E ⊂ G is a norm one idempotent in McbA(G) if and only if E is a coset of an open subgroup of G. As applications, we describe the closed ideals of AMcb(G) with an approximate identity bounded by 1, and we characterize those G for which AMcb(G) is 1-amenable in the sense of B. E. Johnson. (We can even slightly relax the norm bounds.)