A global Morse index theorem and applications to Jacobi fields on CMC surfaces

Abstract

In this paper, we establish a "global" Morse index theorem. Given a hypersurface Mn of constant mean curvature, immersed in Rn+1. Consider a continuous deformation of "generalized" Lipschitz domain D(t) enlarging in Mn. The topological type of D(t) is permitted to change along t, so that D(t) has an arbitrary shape which can "reach afar" in Mn, i.e., cover any preassigned area. The proof of the global Morse index theorem is reduced to the continuity in t of the Sobolev space Ht of variation functions on D(t), as well as the continuity of eigenvalues of the stability operator. We devise a "detour" strategy by introducing a notion of "set-continuity" of D(t) in t to yield the required continuities of Ht and of eigenvalues. The global Morse index theorem thus follows and provides a structural theorem of the existence of Jacobi fields on domains in Mn.

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