On weighted Hardy inequality with two-dimensional rectangular operator -- extension of the E. Sawyer theorem
Abstract
A characterization is obtained for those pairs of weights v and w on R2+, for which the two--dimensional rectangular integration operator is bounded from a weighted Lebesgue space Lpv(R2+) to Lqw(R2+) for 1<p= q<∞, which is an essential complement to E. Sawyer's result Saw1 given for 1<p≤ q<∞. Besides, we declare that the E. Sawyer theorem is actual if p=q only, for p<q the criterion is less complicated. The case q<p is new.
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