Fine properties of branch point singularities: stationary two-valued graphs and stable minimal hypersurfaces near points of density < 3

Abstract

We study (higher order) asymptotic behaviour near branch points of stationary n-dimensional two-valued C1, μ graphs in an open subset of Rn+m. Specifically, if M is the graph of a two-valued C1, μ function u on an open subset ⊂ Rn taking values in the space of un-ordered pairs of points in Rm, and if the integral varifold V = (M, θ), where the multiplicity function θ \, : \, M → \1, 2\ is such that θ =2 on the set where the two values of u agree and θ =1 otherwise, is stationary in × Rm with respect to the mass functional, we show that at Hn-2-a.e.\ point Z along its branch locus u decays asymptotically, modulo its single valued average, to a unique non-zero two-valued cylindrical harmonic tangent function (Z) which is homogeneous of some degree ≥ 3/2. As a corollary, we obtain that the branch locus of u is countably (n-2)-rectifiable, and near points Z where the degree of homogeneity of (Z) is equal to 3/2, the branch locus is an embedded real analytic submanifold of dimension n-2. These results, combined with the recent works M and MW, imply a stratification theorem for the (relatively open) set of density < 3 points of a stationary codimension 1 integral n-varifold with stable regular part and no triple junction singularities.