352 7. THE REDUCED DISTANCEREMARK 7.89. Note that for Euclidean space, £-Jacobi fields satisfy
IY(r)l^2 = const·r. In particular, d~loglY(r)l^2 =~(and .e is constant
along £-geodesics).PROOF. Since g (r) has nonnegative curvature operator, Hamilton's ma-
trix inequality holds and we have for any r E [O, r],H ( X, Y) ( r) + ( ~ + T ~ 7 ) Re ( Y, Y) ( r) ~ 0.
Since Re ~ 0 and ly (r) 1
2
= ¥ IY (r)l^2 , from r ::::; (1 - c) T, we get for
r E [O, r],Then (7.129) impliesdd I _ IYl^2 ::::; ( \:o: f
7
\/'TR(!' (r), r) dr + 1) IY (!')12"T T=T Cy "T lo "T
::::; (~.e (!' (r) 'r) + 1) IY ~)12'
since I is a minimal £-geodesic. Hence-d d I _log IYl^2 ::::; -:::^1 (2 -.e (!' (r) , r) + 1. )
"T T=T "T C
Finally, we leave it as an exercise to check that when T = oo, one can
in essence take c = 1 in the inequality above. D8.3. The £-exponential map. The £-exponential map£exp: TM x [O,T)---+ M
is defined by£exp (V, r) ~ £ expv (r) ~ 1v (r) ,
where IV (T) is the £-geodesic with lim 7 -+o y'T~;_ (r) = V E TpM (and
IV (0) = p). Given r, define the £-exponential map at timer
£7exp: TM---+ Mby
£7 exp (V) ~IV (r).