Boundedness of Positive Integral Operators on Lorentz-Gamma Spaces

Abstract

We characterize the boundedness of a positive integral operator TK, with kernel K∈ M+(2n), between Lorentz-Gamma spaces p,φ2(n) and q,φ1(n), 1<p q<∞. The key step reduces the n-dimensional problem to a one-dimensional weighted norm inequality for the composed operator TLS, where L=(K*2)*1 is the iterated rearrangement of K introduced by Blozinski~B and S is the Stieltjes transform. Explicit Muckenhoupt-type conditions are obtained for the case L(t,s)=(t+s)-1, corresponding to the iterated Stieltjes operator S2.

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