Rigidity of spacelike translating solitons in pseudo-Euclidean space

Abstract

In this paper, we investigate the parametric version and non-parametric version of rigidity theorem of spacelike translating solitons in pseudo-Euclidean space Rm+nn. Firstly, we classify m-dimensional complete spacelike translating solitons in Rm+nn by affine technique and classical gradient estimates, and prove the only complete spacelike translating solitons in Rm+nn are the spacelike m-planes. This result provides another proof of a nonexistence theorem for complete spacelike translating solitons in C-Q, and a simple proof of rigidity theorem in X-H. Secondly, we generalize the rigidity theorem of entire spacelike Lagrangian translating solitons in X-Z to spacelike translating solitons with general codimensions. As a directly application of theorem, we obtain two interesting corollaries in terms of Gauss image.