On the rigidity theorems for Lagrangian translating solitons in pseudo-Euclidean space II
Abstract
Let u be a smooth convex function in Rn and the graph M∇ u of ∇ u be a space-like translating soliton in pseudo-Euclidean space R2nn with a translating vector 1n(a1, a2, ·s, an; b1, b2, ·s, bn), then the function u satisfies D2u= \ Σi=1n- ai∂ u∂ xi +Σi=1n bixi+c\ on Rn where ai, bi and c are constants. The Bernstein type results are obtained in the course of the arguments.
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