Sequences of embedded minimal disks whose curvatures blow up on a prescribed subset of a line
arXiv:0905.0851
Abstract
For any prescribed closed subset of a line segment in Euclidean 3-space, we construct a sequence of minimal disks that are properly embedded in an open solid cylinder around the segment and that have curvatures blowing up precisely at the points of the closed set.
This version (Aug 31, 2011) corrects a few typos