Improved generic regularity of codimension-1 minimizing integral currents

Abstract

Let be a smooth, closed, oriented, (n-1)-dimensional submanifold of Rn+1. We show that there exist arbitrarily small perturbations ' of with the property that minimizing integral n-currents with boundary ' are smooth away from a set of Hausdorff dimension ≤ n-9-n, where n ∈ (0, 1] is a dimensional constant. This improves on our previous result (where we proved generic smoothness of minimizers in 9 and 10 ambient dimensions). The key ingredients developed here are a new method to estimate the full singular set of the foliation by minimizers and a proof of superlinear decay of closeness (near singular points) that holds even across non-conical scales.