“…In [13], Kenig and Toro showed that solutions for a certain two-phase free boundary problem for harmonic measures on two-sided domains in R n are locally well approximated by H in a Hausdorff distance sense. Refined information about the structure and size of the free boundary was obtained by Badger [1,2] by studying the geometry of abstract sets approximated by H and measures on their support. For instance, in [2], Badger showed that, if A ⊆ R n is closed, A is locally well approximated by H, and A looks pointwise on small scales like the zero set of a homogeneous harmonic polynomial, then A = A 1 ∪ A 2 , where A 1 is locally well approximated by G(n, n − 1), while near each x ∈ A 2 the set A looks locally like the zero set of a homogeneous harmonic polynomial of degree at least 2.…”