14 1. THE RICCI FLOW OF SPECIAL GEOMETRIESLEMMA 1.19. There exists a time To > 0 depending only on the initialdata (Ao, Bo, Co) such that the solution 9t: (t) of (1.5) exists for all 0 :St< To
and all 0 < E :::; 1.PROOF. Since ft (AE) = -16A < 0, there is ko such that ABC:::; ko/A
for as long as a solution exists. So it will suffice to prove that ABC > 0.
The calculation
:t (:c) = AB;C2 [2AE
2- 4ABC - EE (A
2
+ F2
)] :::; 8 (:c)2shows that there is k 1 > 0 depending only on Bo and C 0 such that
E< BC
- k1 - 8t
for as long as a solution exists. Then since
d 8
dt (BC) = 8 (EA - E) 2:: -8E 2:: -ki _St (BC),
there is k2 > 0 depending only on Bo and Co such that
(1.6)
for as long as a solution exists. This implies that- d A>--^4 A^2 > -^4 A^2
dt - BC - k2 (k1 - 8t) '
whence the conclusion follows readily. D
Our final observation is that there may be a jump discontinuity in the
collapsing structure at t = 0. This reflects the fact that the Ricci fl.ow on
SU (2) assiduously avoids collapse.
LEMMA 1.20. If (Ao, Bo, Co)t: is a family of initial data parameterized
by E E (0, 1) such thatt:-tO lim F (0, E) > 0,
then for all t E (0, To),lim F ( t, E) = 0.
t:-tOPROOF. It will suffice to prove the result fort E [O, T], where T E (0, To)
is arbitrary. Define
recalling that
Since
and4E^2Q =o= ABC'
!!:_F = (EP-Q) F.
dt Ed 16F- (AF)= - - < 0
dt E '