On character amenability of Banach algebras

Abstract: Weakly sequentially complete algebra F -algebra We continue our work [E. Kaniuth, A.T. Lau, J. Pym, On ϕ-amenability of Banach algebras, Math. Proc. Cambridge Philos. Soc. 144 (2008) 85-96] in the study of amenability of a Banach algebra A defined with respect to a character ϕ of A. Various necessary and sufficient conditions of a global and a pointwise nature are found for a Banach algebra to possess a ϕ-mean of norm 1. We also completely determine the size of the set of ϕ-means for a separable weakly sequent… Show more

“…Suppose that LA(G) is a left ideal in its second dual, and let ρ ∈ G. Since G is amenable, it follows that there exists a bounded net (f α ) ⊆ L 1 (G) such that for all f ∈ L 1 (G); see Theorem 1.4 of Kaniuth, Lau, and Pym [11], and Corollary 2.4 of Monfared [12]; see also [10]. Fix h 0 ∈ LA(G) such that φ ρ (h 0 ) = 1, and set…”

On $${\phi}$$ -contractibility of the Lebesgue–Fourier algebra of a locally compact group

“…Suppose that LA(G) is a left ideal in its second dual, and let ρ ∈ G. Since G is amenable, it follows that there exists a bounded net (f α ) ⊆ L 1 (G) such that for all f ∈ L 1 (G); see Theorem 1.4 of Kaniuth, Lau, and Pym [11], and Corollary 2.4 of Monfared [12]; see also [10]. Fix h 0 ∈ LA(G) such that φ ρ (h 0 ) = 1, and set…”

On $${\phi}$$ -contractibility of the Lebesgue–Fourier algebra of a locally compact group

“…These notions have been studied for various classes of Banach algebras. For more details, we refer the reader to [8,10,11,14].…”

A characterization of biflatness of Segal algebras based on a character

“…For this reason by relaxing some of the constrains in the definition of amenability new concepts have been introduced. The most notable are the concepts of Connes amenability [11,13], weak amenability [2,5] and character amenability [17,18]. More recently, F. Ghahramani and R. J. Loy have introduced and studied the concepts of approximate amenability (contractibility) and uniform approximate amenability (contractibility) for Banach algebras [9,10].…”

Generalized notions of character amenability