Existence of minimal H-bubbles by Caldiroli P., Musina R.
By Caldiroli P., Musina R.
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Additional resources for Existence of minimal H-bubbles
Ann. 222 (1976), 97-144. K. Steffen, On the Existence of Surfaces with Prescribed Mean Curvature and Boundary, Math. Z. 146 (1976), 113-135. M. Struwe, Plateau’s problem and the Calculus of Variations, Mathematical Notes 35, Princeton University Press (1985). M. H. Rabinowitz, E. ), Academic Press, Boston 1990, 639-666. G. Wang, The Dirichlet problem for the equation of prescribed mean curvature, Ann. Inst. H. Poincar´e Anal. non lin´eaire 9 (1992), 643-655. H. Wente, The differential equation ∆x = 2(xu ∧ xv ) with vanishing boundary values, Proc.
Rat. Mech. Anal. 89 (1985), 21-56. P. Caldiroli and R. Musina, On a Steffen’s result about parametric surfaces with prescribed mean curvature, Preprint SISSA, Trieste (2000). R. Garabedian, On the shape of electrified droplets, Comm. Pure Appl. Math. 18 (1965), 31-34. M. Gr¨ uter, Regularity of weak H-surfaces, J. Reine Angew. Math. 329 (1981), 1-15. A. Gyemant, K¨ apillaritat, in Handbuch der Physik, Bd. , Springer, Berlin (1927). ¨ E. Heinz, Uber die regularit¨ at schwarcher L¨ osungen nicht linear elliptisher Systeme, Nachr.
Morrey, Multiple Integrals in the Calculus of Variations, Springer (1966). J. Sacks and K. Uhlenbeck, The existence of minimal immersions of 2-spheres, Ann. Math. 113 (1981), 1-24. K. Steffen, Isoperimetric inequalities and the problem of Plateau, Math. Ann. 222 (1976), 97-144. K. Steffen, On the Existence of Surfaces with Prescribed Mean Curvature and Boundary, Math. Z. 146 (1976), 113-135. M. Struwe, Plateau’s problem and the Calculus of Variations, Mathematical Notes 35, Princeton University Press (1985).