Maximum solutions of normalized Ricci flows on 4-manifolds

Abstract

We consider maximum solution g(t), t∈ [0, +∞), to the normalized Ricci flow. Among other things, we prove that, if (M, ω) is a smooth compact symplectic 4-manifold such that b2+(M)>1 and let g(t),t∈[0,∞), be a solution to (1.3) on M whose Ricci curvature satisfies that |Ric(g(t))|≤ 3 and additionally (M)=3 τ (M)>0, then there exists an m∈ N, and a sequence of points \xj,k∈ M\, j=1, ..., m, satisfying that, by passing to a subsequence, (M, g(tk+t), x1,k,..., xm,k) dGH (j=1m Nj, g∞, x1,∞, ...,, xm,∞), t∈ [0, ∞), in the m-pointed Gromov-Hausdorff sense for any sequence tk ∞, where (Nj, g∞), j=1,..., m, are complete complex hyperbolic orbifolds of complex dimension 2 with at most finitely many isolated orbifold points. Moreover, the convergence is C∞ in the non-singular part of 1m Nj and Volg0(M)=Σj=1mVolg∞(Nj), where (M) (resp. τ(M)) is the Euler characteristic (resp. signature) of M.