Singular Minimal Translation Graphs in Euclidean Spaces
Abstract: In this paper, we consider the problem of finding the hypersurface Mn in the Euclidean (n+1)-space R{n+1} that satisfies an equation of mean curvature type, called singular minimal hypersurface equation. Such an equation physically characterizes the hypersurfaces in the upper halfspace (R{n+1})_{+} with lowest gravity center, for a fixed unit vector u in R{n+1}. We first state that a singular minimal cylinder Mn in R{n+1} is either a hyperplane or a {\alpha}-catenary cylinder. It is also shown that this result remains true when Mn is a translation hypersurface and u a horizantal vector. As a further application, we prove that a singular minimal translation graph in R3 of the form z=f(x)+g(y+cx), c in R-{0}, with respect to a certain horizantal vector u is either a plane or a {\alpha}-catenary cylinder.
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