- CURVATURE ESTIMATES USING RICCI SOLITONS 115
To compute the evolution equation for l\7 fl^2 , we use equation (5.10) and
recall that Rg = 2 Re on a surface, obtaining
at a IY'fl^2 =at a (.. lJ\7/vjf ) ( = atlJ a. ·) \i'if\i'jf + 2 ( at a \i'd ). \i'if
= (R - r) l\7 fl^2 + 2 (\7 !:::..f + r\7 f, \7 J)
= r l\7f1^2 + 2 (!:::.. \7 f, \7 J)
(5.14) = !:::.. l\7 fl^2 - 2 l\7\7 fl^2 + r l\7 f l^2 ·
Combining (5.13) and (5.14) gives the result, becauseIMl^2 = l\7\7 f l^2 - ~ 2 (t:::..!)^2.
DApplying the maximum principle to equation (5.12) yields a useful esti-
mate.COROLLARY 5.17. On a solution of the normalized Ricci flow on a com-
pact surface, there exists a constant C depending only on the initial metric
such that
R- r :SH :S Cert.Combining this result with Lemma 5.9 lets us estimate R both from
above and below.PROPOSITION 5.18. For any solution (M^2 , g (t)) of the normalized Ricci
flow on a compact surface, there exists a constant C > 0 depending only on
the initial metric such that:- If r < 0, then
- If r = 0, then
•If r > 0, then
C < R < C.
1 +Ct - -
In summary, we now have time-dependent upper and lower bounds for
the scalar curvature that are valid for as long as a solution exists. As we
shall see later in this volume, the long-time existence of solutions is a con-
sequence of these estimates. For now, we shall assume Corollary 7.2, which
tells us that long-time existence of solutions follows from appropriate a pri-
ori bounds on their curvature. To guide the reader's understanding, we
summarize the relevant arguments here.
STEP l. The smoothing properties of the Ricci flow (Theorem 7.1) reveal
that bounds on the curvature imply a priori bounds on all its derivatives