The Structure of Stable Codimension One Integral Varifolds near Classical Cones of Density Q+1/2

Abstract

For each positive integer Q∈Z≥ 2, we prove a multi-valued C1,α regularity theorem for varifolds in the class SQ, i.e., stable codimension one stationary integral n-varifolds which have no classical singularities of vertex density <Q, which are sufficiently close to a stationary integral cone comprised of 2Q+1 half-hyperplanes (counted with multiplicity) meeting along a common axis. Such a result furthers the understanding of the local structure about singularities in the (possibly branched) varifolds in SQ achieved by the author and N.~Wickramasekera (minterwick) and generalises the authors' previous work in the case Q=2 (minter-5-2) to arbitrary Q∈ Z≥ 2. One notable difference with previous works is that our methods do not need any a priori size restriction on the (density Q) branch set to rule out density gaps.