Abstract and Applied Analysis (Jan 2011)
On the Generalized Weighted Lebesgue Spaces of Locally Compact Groups
Abstract
Let πΊ be a locally compact group with a fixed left Haar measure π and Ξ© be a system of weights on πΊ. In this paper, we deal with locally convex space πΏπ(πΊ,Ξ©) equipped with the locally convex topology generated by the family of norms (β.βπ,π)πβΞ©. We study various algebraic and topological properties of the locally convex space πΏπ(πΊ,Ξ©). In particular, we characterize its dual space and show that it is a semireflexive space. Finally, we give some conditions under which πΏπ(πΊ,Ξ©) with the convolution multiplication is a topological algebra and then characterize its closed ideals and its spectrum.
