Chow's theorem

Statement

Let ${\displaystyle S^2}$ denote the 2-sphere (upto differential structure) and ${\displaystyle g}$ any Riemannian metric on ${\displaystyle S^2}$. Then, the Ricci flow on ${\displaystyle S^2}$ starting from ${\displaystyle g}$, becomes positive in finite time.

This, along with Hamilton's theorem, gives the Ricci flow convergence theorem on compact surfaces which states that any Ricci flow starting from a Riemannian metric on a compact surface converges, at time ${\displaystyle \mathrm{\infty }}$, to a constant-curvature metric.