Hierarchy structures in finite index CMC surfaces

Abstract

Given 0>0, I∈ N \0\ and K0,H0≥0, let X be a complete Riemannian 3-manifold with injectivity radius Inj(X)≥ 0 and with the supremum of absolute sectional curvature at most K0, and let M X be a complete immersed surface of constant mean curvature H∈ [0,H0] with index at most I. For such M X, we prove Structure Theorem 1.2 which describes how the interesting ambient geometry of the immersion is organized locally around at most I points of M where the norm of the second fundamental form takes on large local maximum values.

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