Nonlocal Sublinear Elliptic Problems Involving Measures

Abstract

We study Dirichlet problems for fractional Laplace equations of the form (-)α2 u = f(x,u) in Rn for 0<α<n where the nonlinearity f(x,u) = Σi=1M σi uqi + ω involves sublinear terms with 0<qi<1 and the coefficients σi, ω are nonnegative locally finite Borel measures on Rn. We develop a potential theoretic approach for the existence of positive minimal solutions in Lorentz spaces to the problems under certain assumptions on σi and ω. The uniqueness properties of such solutions are discussed. Our techniques are also applicable to similar sublinear problems on uniform bounded domains when 0<α< 2, or on arbitrary domains with positive Green's functions in the classical case α =2.

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