Blow-ups of caloric measure in time varying domains and applications to two-phase problems

Abstract

We develop a method to study the structure of the common part of the boundaries of disjoint and possibly non-complementary time-varying domains in Rn+1, n ≥ 2, at the points of mutual absolute continuity of their respective caloric measures. Our set of techniques, which is based on parabolic tangent measures, allows us to tackle the following problems: 1) Let 1 and 2 be disjoint domains in Rn+1, n ≥ 2, which are quasi-regular for the heat equation and regular for the adjoint heat equation, and their complements satisfy a mild non-degeneracy hypothesis on the set E of mutual absolute continuity of the associated caloric measures ωi with poles at pi=(pi,ti)∈i, i=1,2. Then, we obtain a parabolic analogue of the results of Kenig, Preiss, and Toro, i.e., we show that the parabolic Hausdorff dimension of ω1|E is n+1 and the tangent measures of ω1 at ω1-a.e. point of E are equal to a constant multiple of the parabolic (n+1)-Hausdorff measure restricted to hyperplanes containing a line parallel to the time-axis. 2) If, additionally, ω1 and ω2 are doubling, dω2|Edω1|E ∈ VMO(ω1|E), and E is relatively open in the support of ω1, then their tangent measures at every point of E are caloric measures associated with adjoint caloric polynomials. As a corollary we obtain that in complementary δ-Reifenberg flat domains, if δ is small enough and dω2dω1 ∈ VMO(ω1), then 1 \t<t2\ is vanishing Reifenberg flat. This generalizes results of Kenig and Toro for the Laplacian. 3) We establish a parabolic version of a theorem of Tsirelson about triple-points for harmonic measure.