Nonsingular Ricci flow on a noncompact manifold in dimension three

Abstract

We consider the Ricci flow ∂∂ tg=-2Ric on the 3-dimensional complete noncompact manifold (M,g(0)) with non-negative curvature operator, i.e., Rm≥ 0, |Rm(p)| 0, ~as ~d(o,p) 0. We prove that the Ricci flow on such a manifold is nonsingular in any finite time.