Sublinear equations and Schur's test for integral operators

Abstract

We study weighted norm inequalities of (p,r)-type, G (f \, d σ) Lr(, dσ) C f Lp(, σ), ∀ \, f ∈ Lp(σ), for 0 < r < p and p>1, where G(f d σ)(x)=∫ G(x, y) f(y) d σ(y) is an integral operator associated with a nonnegative kernel G on × , and σ is a locally finite positive measure in . We show that this embedding holds if and only if ∫ (G σ)prp-r d σ<+∞, provided G is a quasi-symmetric kernel which satisfies the weak maximum principle. In the case p=rq, where 0<q<1, we prove that this condition characterizes the existence of a non-trivial solution (or supersolution) u ∈ Lr(, σ), for r>q, to the the sublinear integral equation u - G(uq \, d σ) = 0, u 0. We also give some counterexamples in the end-point case p=1, which corresponds to solutions u ∈ Lq (, σ) of this integral equation. These problems appear in the investigation of weak solutions to the sublinear equation involving the (fractional) Laplacian, (-)α u - σ \, uq = 0, u 0, for 0<q<1 and 0 < α < n2 in domains ⊂eq Rn with a positive Green function.