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Necessary and sufficient conditions governing one and two weight inequalities for one-sided strong fractional maximal operators, one-sided and Riesz potentials with product kernels are established on the cone of non-increasing functions. From the two– weight results it follows criteria for the trace inequality Lp (Rn ) → Lq (v, Rn ) bound- + + dec edness for these operators, where v, in general, is not product of one-dimensional weights. Various type of two-weight necessary and sufficient conditions for the dis- crete Riemann–Liouville transform with product kernels are also established. The most of the derived two-weight results (continuous and discrete) are new even for potentials with single kernels
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