On the Dirichlet problem for the Schr\"odinger equation with boundary value in BMO space

Abstract

Let (X,d,μ) be a metric measure space satisfying a Q-doubling condition, Q>1, and an L2-Poincar\'e inequality. Let L=L+V be a Schr\"odinger operator on X, where L is a non-negative operator generalized by a Dirichlet form, and V is a non-negative Muckenhoupt weight that satisfies a reverse H\"older condition RHq for some q (Q+1)/2. We show that a solution to (L-∂t2)u=0 on X× R+ satisfies the Carleson condition, B(xB,rB)1μ(B(xB,rB)) ∫0rB ∫B(xB,rB) |t∇ u(x,t)|2 dμd tt<∞, if and only if, u can be represented as the Poisson integral of the Schr\"odinger operator L with trace in the BMO space associated with L.