Ditkin sets for some functional spaces and applications to grand Lebesgue spaces
Abstract
Let G be a locally compact Abelian group with dual group G and Haar measures dμ and dμ respectively. In this work we have proved that if X is an essential Banach ideal in Beurling algebra L1ω(G), then a closed subset E⊂ G is a Ditkin set for X if and only if E is a Ditkin set for L1ω(G). Next, as an application we have investigated the Ditkin sets for grand Lebesgue space Lp),θ(G) and Ditkin sets for [Lp(G)]Lp),θ , where [Lp(G)]Lp),θ is the closure of the set Cc(G) in Lp),θ(G).
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