A Minimal Lamination with Cantor Set-Like Singularities

Abstract

Given a compact closed subset M of a line segment in R3, we construct a sequence of minimal surfaces k embedded in a neighborhood C of the line segment that converge smoothly to a limit lamination of C away from M. Moreover, the curvature of this sequence blows up precisely on M, and the limit lamination has non-removable singularities precisely on the boundary of M.