Direct minimization of the Canham--Helfrich energy on generalized Gauss graphs

Abstract: The existence of minimizers of the Canham-Helfrich functional in the setting of generalized Gauss graphs is proved. As a first step, the Canham-Helfrich functional, usually defined on regular surfaces, is extended to generalized Gauss graphs, then lower semicontinuity and compactness are proved under a suitable condition on the bending constants ensuring coerciveness; the minimization follows by the direct methods of the Calculus of Variations. Remarks on the regularity of minimizers and on the behavior of the… Show more