Rigidity and vanishing theorems for complete translating solitons

Abstract

In this paper, we prove some rigidity theorems for complete translating solitons. Assume that the Lq-norm of the trace-free second fundamental form is finite, for some q∈R and using a Sobolev inequality, we show that translator must be hyperspace. Our results can be considered as a generalization of Ma, WXZ16, Xin15. We also investigate a vanishing property for translators which states that there are no nontrivial Lfp\ (p≥2) weighted harmonic 1-forms on M if the Ln-norm of the second fundamental form is bounded.