Examples of Ricci-mean curvature flows

Abstract

Let π:P(O(0) O(k)) Pn-1 be a projective bundle over Pn-1 with 1≤ k ≤ n-1. In this paper, we show that lens space L(k\, ;1)(r) with radius r embedded in P(O(0) O(k)) is a self-similar solution, where P(O(0) O(k)) is endowed with the U(n)-invariant gradient shrinking Ricci soliton structure. We also prove that there exists a pair of critical radii r1<r2 which satisfies the following. The lens space L(k\, ;1)(r) is a self-shrinker if r<r2 and self-expander if r2<r, and the Ricci-mean curvature flow emanating from L(k\, ;1)(r) collapses to the zero section of π if r<r1 and to the ∞-section of π if r1<r. This gives explicit examples of Ricci-mean curvature flows.