Existence of constant mean curvature disks in R3 with capillary boundary condition

Abstract

We extend Struwe's result (Acta Math., 1988) on the existence of free boundary constant mean curvature disks to almost every prescribed boundary contact angle in (0, π). Specifically, let be a surface in R3 diffeomorphic to the sphere, and let ' be a convex surface enclosing . Given τ ∈ (-1, 1) and a constant H ≥ 0 below the infimum of the mean curvature of ', we show that for almost every r ∈ (0, 1), in the region enclosed by ' there exists a branched immersed disk with constant mean curvature rH whose boundary meets at an angle with cosine value rτ. Moreover, the constant mean curvature disks we construct have index at most 1.

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