Minimum principles and a priori estimates for some translating soliton type problems
Abstract
In this paper we are dealing with two classes of mean curvature type problems that generalize the translating soliton problem. A first result proves that the solutions to these problems have unique interior critical points. Using this uniqueness result, we next derive a priori C0 and C1 estimates for the solutions to these problems, by means of some minimum principles for appropriate P-functions, in the sense of L.E. Payne.
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