Self-shrinkers with any number of ends in R3 by stacking R2

Abstract

For each half-integer J and large enough integer m we construct by PDE gluing methods a self-shrinker M[J,m] with 2J+1 ends and genus 2J(m-1). M[J,m] resembles the stacking of 2J+1 levels of the plane R2 in R3 that have been connected by 2Jm catenoidal bridges with m bridges connecting each pair of adjacent levels. It observes the symmetry of an m-gonal prism (when J is a half integer) or an m-gonal antiprism (when J is an integer). The construction is based on the Linearised Doubling (LD) methodology which was first introduced by Kapouleas in the construction of minimal surface doublings of S2eq in S3.