Nonlinear potential estimates for sublinear problems with applications to elliptic semilinear and quasilinear equations

Abstract

We give a survey of nonlinear potential estimates and their applications obtained recently for positive solutions to sublinear problems of the type \[ u = G(σ uq) + f in \,\, , \] where 0 < q < 1, σ 0 is a Radon measure in , f 0 is a measurable function, and G is a linear integral operator with positive kernel G on ×. For quasi-metric (or quasi-metrically modifiable) kernels G, these bilateral pointwise estimates yield existence criteria and uniqueness of solutions u ∈ Lq loc (, σ). Applications are considered to semilinear elliptic equations involving the (fractional) Laplacian, \[ (-)α2 u = σ uq + μ in \,\, , u=0 \, \, in \,\, c. \] Here 0<q<1, μ, σ 0 are Radon measures, and is a bounded uniform domain in Rn, if 0 < α 2, or the entire space Rn, a ball or half-space, if 0 < α <n. Analogues of these results are presented for elliptic equations involving the p-Laplace operator on the entire space Rn, \[ -p u = σ uq + μ in \,\, Rn, x ∞ u(x)=0, \] where 0<q<p-1, and μ, σ 0 are Radon measures. More general quasilinear equations with A-Laplace operators div A(x, ∇ u) in place of p are covered as well.