The Generalized Grand Wiener Amalgam Spaces and the boundedness of Hardy-Littlewood maximal operators

Abstract

In g5, we defined and investigated the grand Wiener amalgam space W(Lp),θ1(), Lq),θ2()) , where 1<p,q<∞, θ1>0, θ2>0, ⊂ Rn and the Lebesgue measure of is finite. In the present paper we generalize this space and define the generalized grand Wiener amalgam space W(Lap)( Rn), Lbq)( Rn)), where Lap)( Rn) and Lbq)( Rn), are the generalized grand Lebesgue spaces, (see u, su3). Later we investigate some basic properties. Next we study embeddings for these spaces and we discuss boundedness and unboundedness of the Hardy-Littlewood maximal operator between some generalized grand Wiener amalgam spaces.