Geometry of CMC surfaces of finite index
Abstract
Given r0>0, I∈ N \0\ and K0,H0≥ 0, let X be a complete Riemannian 3-manifold with injectivity radius Inj(X)≥ r0 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] and with index at most I. We will obtain geometric estimates for such an M X as a consequence of the Hierarchy Structure Theorem in [9]. The Hierarchy Structure Theorem (see Theorem 2.2 below) will be applied to understand global properties of M X, especially results related to the area and diameter of M. By item E of Theorem 2.2, the area of such a non-compact M X is infinite. We will improve this area result by proving the following when M is connected; here g(M) denotes the genus of the orientable cover of M: 1. There exists C1=C1(I,r0,K0,H0)>0 such that Area(M)≥ C1(g(M)+1). 2. There exists C>0,G(I)∈ N independent of r0,K0,H0 and also C independent of I such that if g(M)≥ G(I), then Area(M)≥ C(\1,1r0,K0, H0\)2(g(M)+1). 3. If the scalar curvature of X satisfies 3H2+12≥ c in X for some c>0, then there exist A,D>0 depending on c,I,r0,K0,H0 such that Area(M)≤ A and Diameter(M)≤ D. Hence, M is compact and, by item 1, g(M)≤ A/C -1.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.