168 5. THE RICCI FLOW ON SURFACES
IR (xi, ti) I maxM2 IR(., ti) I and consider the sequence of parabolically
dilated solutions
(5.55)defined for -tjR(xj,tj) ::::; t < (T-tj)R(xj,tj)- The dilated solutions
(M^2 , gj (t)) satisfy a curvature bound which depends on t but is uniform in
j. Indeed, if we are dilating about a Type I singularity, there exists
such that
n ~ limsup (T-t) Rmax (t) < oo
t/Tn
R[gj(t)]::::; n-t;whereas if the original singularity is Type Ila, there is a sequence nj / oo
such that
1
R [gj (t)] ::::; 1 - t/Oj
Since by Corollary 5.95, there is a uniform positive lower bound for allinj (M^2 , gj (0)), we can apply the Compactness Theorem from Section 3 of
Chapter 7 to obtain a pointed subsequence (M^2 ,gj (t) ,xj) that converges
uniformly on any compact time interval and in every Ck-norm to a complete
pointed solution
(M~, 900 (t), Xoo)
of the Ricci flow with scalar curvature R 00 • In the case of a Type I limit,
g 00 (t) is an ancient solution that exists for -oo < t < n and satisfies the
curvature bound
n
Roo::::; Q-(
In the case of a Type Ila limit, 9= (t) is an eternal solution that exists for
-oo < t < oo and satisfies
Roo (·, ·) ::::; 1 = R 00 (x 00 , 0).
The key step toward our goal will be to show that a Type Ila limit
cannot occur. This is a consequence of the fact that an eternal solution
with strictly positive curvature that attains the space-time maximum of its
scalar curvature must be a steady Ricci soliton. In the particular case of a
surface, the result is the following result.LEMMA 5.96. The only eternal solution (N^2 , g (t)) of the Ricci flow on
a surface of strictly positive curvature that attains its maximum curvature
in space and time is the cigar (JH.^2 , 92: ( t)).PROOF. We claim that (N^2 , g (t)) is a gradient Ricci soliton. The result
follows from this claim and Lemma 2.7, which proves that the only gradient
soliton of positive curvature in dimension n = 2 is the cigar.