Critical points of the solution to the HR=HL surface equation

Abstract

Spacelike surfaces with the same mean curvature in R3 and L3 are locally described as the graph of the solutions to the HR=HL surface equation, which is an elliptic partial differential equation except at the points at which the gradient vanishes, because the equation degenerates. In this paper we study precisely the critical points of the solutions to such equation. Specifically, we give a necessary geometrical condition for a point to be critical, we obtain a new uniqueness result for the Dirichlet problem related to the HR=HL surface equation and we get a Heinz-type bound for the inradius of the domain of any solution to such equation, improving a previous result by the authors. Finally, we also get a bound for the inradius of the domain of any function of class C2 in terms of the curvature of its level curves.

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