1547845440-The_Ricci_Flow_-_Techniques_and_Applications_-_Part_III__Chow_

(jair2018) #1
i7o 21. PERELMAN'S PSEUDOLOCALITY THEOREM

Let^8 (xii, lii) E Mia denote the bad points given by Counterstatement
A and Lemma 21.12. In particular, we have

dgi(tii) (Xii, Xoi) < C:Qi


and
a 1
I Rmgil(xii, tii) > - + 2·
tii c: 0 i
We apply the 'point picking' Claim 1 in §1 of Chapter 22 to the solutions
(Mr, 9i (t), xoi), t E [o, c:rJ,
1
(21.20) A--'---
i ...,.... lOOnc:oi'
and (xii, tii) E Mia as in Counterstatement A. Note that Ai --+ oo as
i--+ oo. Then we obtain 'well-chosen' ex-large curvature space-time points:
(21.21)
(21.22)

satisfying
(21.23)

and

(21.24)

for all (x, t) E Mia with

(xi, ti) E Mia,
Qi ~ I Rm gi I (xi,ti)

1
(21.25) 0 < t S 4 and dgi(t) (x, xoi) S dgi(ti) (xi, xoi) + AiQ~^2 •

Furthermore, by Claim 2 in §1 of Chapter 22 (which uses a< i 3 (n!i)vn)'
the (xi, ti) in (21.21) also satisfy

(21.26) I Rm gi I (x, t) S 4Qi
for all (x, t) such that


  • a - i -


t· i - -Q-:- 2 i < - t < - t· i


That is, we have curvature control in backward parabolic cylinders centered
at (xi, ti) with relatively large spatial radii (since Ai--+ oo).
Note that since (xi, ti) E Mia, by (21.17) we have


  • a


(21.27) Qi > 4'


in particular, ti - ~Qii > ti/2.





    • i
      i.e., ti > aQi ,




(^8) The subscript 'l' is introduced here to mesh better with the notation of Claim 1 in
§1 of Chapter 22.

Free download pdf