- SPACE-TIME POINT PICKING WITH RESTRICTIONS 57
nonnegative sectional curvature and 0 EM, then there are at most a finite
number of disjoint balls B (p, r) with
E
sect (g) 2': 2 in B (p, r)
r
(called curvature c:-bump) andd (p, 0) 2': Ar
(called A-remote).3. Space-time point picking with restrictions
Besides spatial location, as considered in the previous section, in Ricci
flow we also have temporal location. In this section we discuss space-time
point picking techniques which we shall apply in §2 of Chapter 20 when
discussing almost 11:-solutions.
Let (Nn, h (t)), t E [to, OJ, be a (not necessarily complete) solution to
the Ricci flow with nonnegative Ricci curvature. Let B and C be positive
constants and define
(18.26) NB,c ~ { (y, t) EN x (to, OJ : R (y, t) > C + B(t - t 0 )-i}.
We call NB,c the set of 'large curvature points'.
Let p EN and suppose the metric ball Bh(o)(P, 1) is compactly contained
in N. Assume there exists (yi, ti) E Bh(t 1 )(P, ~) x (to, OJ which satisfies
(18.27) R(yi, ti) > C + B(ti - to)-1,
i.e., (yi, ti) E NB,C·
Let (}' E (0, 1) and(18.28) Ai((}') ~ ( C + B(ti - to)-i) ·min {~(ti - to), 23
1
04 }.
LEMMA 18.24 (Existence of a large curvature point with local control).Let (Nn, h (t)) with Re 2': 0, p E N, (yi, ti), and Ai((}') be as above. If
Ai((}') > 1, then the following property holds. For any A E (1, Ai((}')] there
exist t E (to, ti] and y E Bh(t) (p, i) such that t - to 2': (1 - (}')(ti - to),
R (y, t) > C + B(t* - to)-1,
and(18.29)for those points (y, t) E NB,C which satisfy
(18.30a)(18.30b)t E (t* - AR-i(y*, t*), t*],YE Bh(t) (p, dh(t) (y,p) + Ai/^2 R-if^2 (y, t)).