Kubin, A., Lussardi, L., & Morandotti, M. (2024). Direct Minimization of the Canham–Helfrich Energy on Generalized Gauss Graphs. Journal of Geometric Analysis, 34, Article 121. https://doi.org/10.1007/s12220-024-01564-2
Canham–Helfrich functional; Energy minimization; Generalized Gauss graphs
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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 functional in case there is lack of coerciveness are presented.
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Project title:
Alternierende Minimierung in der Bruchmechanik: P 35359-N (FWF - Österr. Wissenschaftsfonds)
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Project (external):
Italian Ministry for University and Research Italian Ministry for University and Research INdAM–GNAMPA
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Project ID:
E53D23005880006 E11G18000350001 E53C22001930001
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Research Areas:
Surfaces and Interfaces: 50% Biological and Bioactive Materials: 50%