Quantitative propagation of smallness for solutions of elliptic equations

Abstract

Let u be a solution to an elliptic equation div(A∇ u)=0 with Lipschitz coefficients in Rn. Assume |u| is bounded by 1 in the ball B=\|x|≤ 1\. We show that if |u| < on a set E ⊂ 12 B with positive n-dimensional Hausdorf measure, then |u|≤ Cγ on 12B, where C>0, γ ∈ (0,1) do not depend on u and depend only on A and the measure of E. We specify the dependence on the measure of E in the form of the Remez type inequality. Similar estimate holds for sets E with Hausdorff dimension bigger than n-1. For the gradients of the solutions we show that a similar propagation of smallness holds for sets of Hausdorff dimension bigger than n-1-c, where c>0 is a small numerical constant depending on the dimension only.