Criteria for the Boundedness of Potential Operators in Grand Lebesgue Spaces

Abstract

It is shown that that the fractional integral operators with the parameter α, 0<α<1, are not bounded between the generalized grand Lebesgue spaces Lp), θ1 and Lq), θ2 for θ2 < (1+α q)θ1, where 1<p<1/α and q=p1-α p. Besides this, it is proved that the one--weight inequality \|Iα(fwα)\|Lwq),θ(1+α q)≤ c\|f\|Lwp),θ, where Iα is the Riesz potential operator on the interval [0,1], holds if and only if w∈ A1+q/p'.