228 33. NONCOMPACT HYPERBOLIC LIMITSNow suppose that the proposition is false for some A E (0, A] and some k.
Without loss of generality we may assume that k 2: k 0. By Proposition 33.14, we
then have t hat for each i E N there exists a finite maximal time interval [ti, ,Bi]
on which there exists a smooth 1-parameter family of harmonic embeddings Fi (t)with Fi (ti) = Fi satisfying properties (i) and (ii) in the proposition, with t = ,Bi
being the first time at which(33.22) II Fi (t)* g (t) - hl'HA llck('HA,h) = ~-
Consider the sequence of pointed solutions of the NRF translated in time by{(M, g (t +,Bi) , Fi (,Bi) (xoo))}iEN ·
Choosing k 0 even larger if necessary, it follows from (33.22) that (with x 00 E
int(f-lA))
inj g(f3,) (Fi (,Bi) (xoo))
is uniformly bounded from below by a positive constant. From the Cheeger-
Gromov-type compactness theorem for pointed solutions of the NRF, i.e., Theorem32.5, there exists a subsequence {(M, g (t +,Bi), Fi (,Bi) (x 00 ))}iEN converging to a
limit solution
(M:3x,,g 00 (t),y 00 ), tE(-00,00).
Since we are in the negative Case III and ,Bi ~ oo, we m ay apply Proposition 32.12
to obtain that
(33.23)
is a finite-volume hyperbolic 3 -manifold. Since we have chosen (7-l, h) to have the
minimal number of cusp ends in the space SJIJp(M, g (t)), we have that (il , h) has
at least as many cusp ends as (7-l, h).By the definition of C^00 pointed Cheeger- Gromov convergence at t = 0, there
exists an exhaustion {Ui}iEN of fl by open sets with x 00 E Ui and there exists a
sequence of diffeomorphisms cI>i : ui ~Vi ~ cI>i(Ui) c M with
(33.24)
sue~ that {(Ui, cI>i[g (,Bi) lvJ)} converges in C^00 to (il , h) uniformly on compact sets
in 7-l.
Using this, we now construct a harmonic embedding from (7-lA, hl'HJ into
(il, h). Consider the sequence of embeddings(33.25) cI>i
1
o Fi (,8i)IF,(f3,)-1(v,) : Fi (,Bi)-
1
(Vi)~ UiWe shall show below that for i sufficiently large,
(33.26)
so that
(33.27)In particular,
n n
7-{A 7-{.-1 -
cl> i o Fi (,Bi) : 7-lA ~ 7-l
is an embedding for i sufficiently large.