On the Canham Problem: Bending Energy Minimizers for any Genus and Isoperimetric Ratio

Abstract

Building on work of Mondino-Scharrer, we show that among closed, smoothly embedded surfaces in R3 of genus g and given isoperimetric ratio v, there exists one with minimum bending energy W. We do this by gluing g+1 small catenoidal bridges to the bigraph of a singular solution for the linearized Willmore equation ( +2)=0 on the (g+1)-punctured sphere S2 to construct a comparison surface of genus g with arbitrarily small isoperimetric ratio v∈ (0, 1) and W < 8π.