Sweeping out 3-manifold of positive Ricci curvature by short 1-cycles via estimates of min-max surfaces

Abstract

We prove that given a three manifold with an arbitrary metric (M3, g) of positive Ricci curvature, there exists a sweepout of M by surfaces of genus ≤ 3 and areas bounded by C vol(M3, g)2/3. We use this result to construct a sweepout of M by 1-cycles of length at most C vol(M3, g)1/3. The sweepout of surfaces is generated from a min-max minimal surface. If further assuming a positive scalar curvature lower bound, we can get a diameter upper bound for the min-max surface.