Minimal Lp-Solutions to Singular Sublinear Elliptic Problems

Abstract

We solve the existence problem for the minimal positive solutions u∈ Lp(, dx) to the Dirichlet problems for sublinear elliptic equations of the form \[ cases Lu=σ uq+μ in , \\ x → yu(x) = 0 y ∈ ∂∞, cases \] where 0<q<1 and Lu:=-div (A(x)∇ u) is a linear uniformly elliptic operator with bounded measurable coefficients. The coefficient σ and data μ are nonnegative Radon measures on an arbitrary domain ⊂ Rn with a positive Green function associated with L. Our techniques are based on the use of sharp Green potential pointwise estimates, weighted norm inqualities, and norm estimates in terms of generalized energy.

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