Intermediate curvature and splitting theorem

Abstract

In this paper, we prove several rigidity results for complete noncompact manifolds with nonnegative intermediate curvatures. We show that when either 3≤ n≤ 5, 1≤ m≤ n-1, or 6≤ n≤ 7, m∈ \1,n-1,n-2\, any manifold of the topological type Mn-m× Tm-1× R with nonnegative m-intermediate curvature is isometrically covered by the canonical product M× Rm. We also construct smooth metrics on Mn-m× Tm-1× R with uniformly positive m-intermediate curvature for 6≤ n≤ 7, 2≤ m≤ n-3. This proves that the algebraic condition m2-mn+m+n>0 from chenshuliend is sharp. The proof is based on a new recursion theorem for spectral intermediate curvatures and cylindrical splitting theorems. In particular, when m=n-1, this provides a new proof of some results by Chodosh--Li chodoshlisoapbubble and Zhu zhu-splitting. Moreover, the recursion theorem can be used to reprove the result of Brendle--Hirsch--Johne brendlegeroch'sconjecture.