232 7. DERIVATIVE ESTIMATES
of the Ricci flow existing for t E (a , w) with the properties that
sup [sect [goo] I :::::; K
M~x(a,w)
and
inj 900 (0) (Ooo) 2: 5.
The convergence is in the following specific sense: there exist a sequence
of open sets Ui ~ M~ such that 000 E Ui for all i E N and such that
any compact subset of M~ is contained in Ui for all i sufficiently large,
a sequence of open sets Vi E Mi such that Oi E Vi for all i E N, anda sequence of diffeomorphisms 'Pi : Ui __, Vi such that 'Pi (Ooo) = Oi and
('Pi)* (F 00 ) =Fi for all i EN; these diffeomorphisms have the property that
the pullbacks 'Pi (gi) converge uniformly to g 00 in every cm norm on any
compact subset of M~ x (a, w).N ates and commentaryTwo good references for derivative estimates that apply to general par-
abolic equations are [94] and [89]. The reader may also be interesting in
consulting some of Bernstein's original papers, notably [16, 17, 18]. For
the Ricci fl.ow in particular, the early Bemelmans- Min-Oo-Ruh paper [11],
Bando's paper [9], and Shi's papers [117, 118] are all useful references. Our
approach is a modification of the method outlined in Section 7 of [63].
The convergence theory of Cheeger and Gromov and in particular the
Gromov- Hausdorff convergence of Riemannian manifolds is currently an ac-
tive and rich area of research. An interested reader is urged to consult the
influential book [53] and the fine survey [109]. Good examples of conver-
gence results in the literature can be found in [2], [26], [45], [50, 51], [108],
and [130, 131].