Positive solutions and harmonic measure for Schr\"odinger operators in uniform domains

Abstract

We give bilateral pointwise estimates for positive solutions of the equation equation* \ aligned - u & = ω u \, \,& & in \, \, , u 0, \\ u & = f \, \, & &on \, \, ∂ , aligned . equation* in a bounded uniform domain ⊂ Rn, where ω is a locally finite Borel measure in , and f 0 is integrable with respect to harmonic measure d Hx on ∂. We also give sufficient and matching necessary conditions for the existence of a positive solution in terms of the exponential integrability of M* (m ω)(z)=∫ M(x, z) m(x)\, d ω (x) on ∂ with respect to f \, d Hx0, where M(x, ·) is Martin's function with pole at x0∈ , m(x)= (1, G(x, x0)), and G is Green's function. These results give bilateral bounds for the harmonic measure associated with the Schr\"odinger operator - - ω on , and in the case f=1, a criterion for the existence of the gauge function. Applications to elliptic equations of Riccati type with quadratic growth in the gradient are given.