References
- Müller F. Analyticity of solutions for semilinear elliptic systems of second order. Calc Var Partial Differ Equ. 2002;15:257–288.
- Hildebrandt S. On the Plateau problem for surfaces of constant mean curvature. Commun Pure Appl Math. 1970;XXIII:97–114.
- Hopf H. Über Flächen mit einer Relation zwischen den Hauptkrümmungen [On surfaces with a relation between the principal curvatures]. Math Nachr. 1951;4:232–249.
- Hopf H. Differential geometry in the large. Lecture notes in mathematics. Vol. 1000. Berlin: Springer-Verlag; 1989.
- Brezis H, Coron J. Multiple solutions of h-systems and Rellich’s conjecture. Commun Pure Appl Math. 1984;37:149–187.
- Steffen K. On the nonuniqueness of surfaces with constant mean curvature spanning a given contour. Arch Ration Mech Anal. 1986;94:101–122.
- Koiso M. Symmetry of hypersurfaces of constant mean curvature with symmetric boundary. Math Z. 1986;191:567–574.
- Earp R, Brito F, Meeks W, et al. Structure theorems for constant mean curvature surfaces bounded by a planar curve. Indiana Univ Math J. 1991;40:333–343.
- López R. Constant mean curvature surfaces with boundary. Springer monographs in mathematics Heidelberg: Springer; 2013.
- Brito F, Sa Earp R. Geometric configurations of constant mean curvature surfaces with planar boundary. An Acad Brasil Ciênc. 1991;63:5–19.
- Korevaar N, Kusner R, Solomon B. The structure of complete embedded surfaces with constant mean curvature. J Differ Geom. 1989;30:465–503.
- Lopez R, Montiel S. Constant mean curvature surfaces with planar boundary. Duke Math J. 1996;85:583–604.
- Alías L, López R, Palmer B. Stable constant mean curvature surfaces with circular boundary. Proc Amer Math Soc. 1999;127:1195–1200.
- Palmer B. A remark on the stability of constant mean curvature surfaces of higher genus and circular boundary. Complex Variables Theory Appl. 2003;48:663–669.
- Nitsche J. Stationary partitioning of convex bodies. Arch Ration Mech Anal. 1985;89:1–19.
- Finn R, McCuan J. Vertex theorems for capillary drops on support planes. Math Nach. 2000;209:115–135.
- Choe J. Sufficient conditions for constant mean curvature surfaces to be round. Math Ann. 2002;323:143–156.
- Spivak M. A comprehensive introduction to differential geometry. Vol. III. Berkeley: Publish or Perish; 1979.