1-bases, algebraic structure and strong Arens irregularity of Banach algebras in harmonic analysis1

Abstract

A long standing problem in abstract harmonic analysis concerns the strong Arens irregularity (sAir, for short) of the Fourier algebra A(G) of a locally compact group G. The groups for which A(G) is known to be sAir are all amenable. So far this class includes the abelian groups, the discrete amenable groups, the second countable amenable groups G such that [G, G] is not open in G, the groups of the form Πi=0∞ Gi where each Gi, i1, is a non-trivial metrizable compact group and G0 is an amenable second countable locally compact group, the groups of the form G0× G, where G is a compact group whose local weight w(G) has uncountable cofinality and G0 is any locally compact amenable group with w(G0) w(G), and the compact group SU(2). We were primarily concerned with the groups for which A(G) is sAir. We introduce a new class of 1-bases in Banach algebras. These new 1-bases enable us, among other results, to unify most of the results related to Arens products proved in the past seventy years since Arens defined his products. This includes the strong Arens irregularity of algebras in harmonic analysis, and in particular almost all the cases mentioned above for the Fourier algebras. In addition, we also show that A(G) is sAir for compact connected groups with an infinite dual rank. The 1-bases for the Fourier algebra are constructed with coefficients of certain irreducible representations of the group. With this new approach using 1-bases, the rich algebraic structure of the algebras and semigroups under study such as the second dual of Banach algebras with an Arens product or certain semigroup compactifications (the Stone- Cech compactification of an infinite discrete group, for instance) is also unveiled

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