The L3/2-norm of the scalar curvature under the Ricci flow on a 3-manifold

Abstract

Assume M is a closed 3-manifold whose universal covering is not S3. We show that the obstruction to extend the Ricci flow is the boundedness L3/2-norm of the scalar curvature R(t), i.e, the Ricci flow can be extended over time T if and only if the ||R(t)||L3/2 is uniformly bounded for 0 ≤ t < T . On the other hand, if the fundamental group of M is finite and the ||R(t)||L\3/2 is bounded for all time under the Ricci flow, then M is diffeomorphic to a 3-dimensional spherical space-form.