Self-similar solutions of curvature flows in warped products
Abstract
In this paper we study self-similar solutions in warped products satisfying F-F=g(λ(r)∂r,), where F is a nonnegative constant and F is in a class of general curvature functions including powers of mean curvature and Gauss curvature. We show that slices are the only closed strictly convex self-similar solutions in the hemisphere for such F. We also obtain a similar uniqueness result in hyperbolic space H3 for Gauss curvature F and F≥ 1.
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