On the nondegeneracy of constant mean curvature surfaces
Abstract
We prove that many complete, noncompact, constant mean curvature (CMC) surfaces f: 3 are nondegenerate; that is, the Jacobi operator f + |Af|2 has no L2 kernel. In fact, if has genus zero and f() is contained in a half-space, then we find an explicit upper bound for the dimension of the L2 jernel in terms of the number of non-cylindrical ends. Our main tool is a conjugation operation on Jacobi fields which linearizes the conjugate cousin construction. Consequences include partial regularity for CMC moduli space, a larger class of CMC surfaces to use in gluing constructions, and a surprising characterization of CMC surfaces via spinning spheres.
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