Generalized group algebras and generalized measure algebras on non-discrete locally compact abelian groups

Abstract

Let G be a non-discrete LCA group with the dual group . We define generalized group algebra, L1(G), and generalized measure algebra, M(G), on G as generalizations of the group algebra L1(G) and the measure algebra M(G), respectively. Generalized Fourier transforms of elements of L1(G) and generalized Fourier-Stieltjes transforms of elements of M(G) are also defined as generalizations of the Fourier transforms and the Fourier-Stieltjes transforms, respectively. The image A() of L1(G) by the generalized Fourier transform becomes a function algebra on with norm inherited from L1(G) through this transform. It is shown that A() is a natural Banach function algebra on\, \,which is BSE and BED. It turns out that L1(G) contains all Rajchman measures. Segal algebras in L1(G) are defined and investigated. It is shown that there exists the smallest isometrically character invariant Segal algebra in L1(G), which (eventually) coincides with the smallest isometrically character invariant Segal algebra in L1(G), the Feichtinger algebra of G. A notion of locally bounded elements of M(G) is introduced and investigated. It is shown that for each locally bounded element μ of M(G) there corresponds a unique Radon measure μ on G which characterizes μ. We investigate the multiplier algebra M( L1(G)) of L1(G), and obtain a result that there is a natural continuous isomorphism from M ( L1(G)) into A(G)*, the algebra of pseudomeasures on G. When G is compact, this map becomes surjective and isometric.