On gradient flows initialized near maxima
Abstract
Let (M,g) be a closed Riemannian manifold, and let F:M R be a smooth function on M. We show the following holds generically for the function F: for each maximum p of F, there exist two minima, denoted by m+(p) and m-(p), so that the gradient flow initialized at a random point close to p converges to either m-(p) or m+(p) with high probability. The statement also holds for F ∈ C∞(M) fixed and a generic metric g on M. We conclude by associating to a given a generic pair (F, g) what we call its max-min graph, which captures the relation between minima and maxima derived in the main result.
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