Geometry of branched minimal surfaces of finite index

Abstract

Given I,B∈N \0\, we investigate the existence and geometry of complete finitely branched minimal surfaces M in R3 with Morse index at most I and total branching order at most B. Previous works of Fischer-Colbrie and Ros explain that such surfaces are precisely the complete minimal surfaces in R3 of finite total curvature and finite total branching order. Among other things, we derive scale-invariant weak chord-arc type results for such an M with estimates that are given in terms of I and B. In order to obtain some of our main results for these special surfaces, we obtain general intrinsic monotonicity of area formulas for m-dimensional submanifolds of an n-dimensional Riemannian manifold X, where these area estimates depend on the geometry of X and upper bounds on the lengths of the mean curvature vectors of . We also describe a family of complete, finitely branched minimal surfaces in R3 that are stable and non-orientable; these examples generalize the classical Henneberg minimal surface.

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