Litcius/Paper detail

Li–Yau inequalities for the Helfrich functional and applications

Fabian Rupp, Christian Scharrer

2022Calculus of Variations and Partial Differential Equations11 citationsDOIOpen Access PDF

Abstract

We prove a general Li-Yau inequality for the Helfrich functional where the spontaneous curvature enters with a singular volume type integral. In the physically relevant cases, this term can be converted into an explicit energy threshold that guarantees embeddedness. We then apply our result to the spherical case of the variational Canham-Helfrich model. If the infimum energy is not too large, we show existence of smoothly embedded minimizers. Previously, existence of minimizers was only known in the classes of immersed bubble trees or curvature varifolds.

Topics & Concepts

Infimum and supremumMathematicsCurvatureEnergy functionalType (biology)Mathematical analysisInequalityPure mathematicsGeometryEcologyBiologyNonlinear Partial Differential EquationsGeometric Analysis and Curvature FlowsAdvanced Mathematical Modeling in Engineering