- EVOLUTION OF THE CURVATURE 109
D
This formula simplifies nicely in the special case of a conformal defor-
mation.
COROLLARY 5.5. If g (t) is a smooth I -parameter family of metrics on
Mn such that
a
atg = f g
for a scalar function f : Mn ___, IR, then
~b,. = - f b. + (~ - 1) \lf. \7.
at 2In particular, if n = 2, then
a
at b. = -f b. ·
PROOF. It suffices to calculate
gke (gij\li (:tgje) -~\le (gij :tgij)) = (i -~) \lkf.
D
For later use, we also record the following immediate consequence of
Lemma 6.5.
COROLLARY 5.6. If (Mn, g (t)) is a solution of the normalized Ricci flow
a 2r- g = -2Rc+- g
at n '
where r ( t) denotes the average scalar curvature, then(5.2)a
atdμ = (r - R) dμ.2. Evolution of the curvature
In this section, we compute the PDE for the evolution of the scalar cur-
vature R and study the corresponding ODE obtained formally by ignoring
the Laplacian term. This analysis will let us apply the maximum principle
to obtain a lower bound for R.
LEMMA 5. 7. If g ( t) is a smooth 1-parameter family of metrics on aRiemannian surface M^2 such that ag /at = f g for a scalar function f , then
a