Abstract:

We investigate conditions for the extendibility of continuous algebra homomorphisms ϕ from the Fourier algebra A(F ) of a locally compact group F to the Fourier-Stieltjes algebra B(G) of a locally compact group G to maps between the corresponding L^∞ algebras which are weak* continuous. When ϕ is completely bounded and F is amenable, it is induced by a piecewise affine map α : Y → F where Y ⊆ G. We show that extendibility of ϕ is equivalent to α being an open map.
We also study the dual problem for contractive homomorphisms
ϕ : L¹ (F ) → M (G). We show that ϕ induces a w* continuous homomorphism between the von Neumann algebras of the groups if and only if the naturally associated map θ (Greenleaf [1965], Stokke [2011]) is a proper map.

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