- EXTENSIONS OF HAMILTON'S COMPACTNESS THEOREM 141
3.3. Compactness for solutions on orbifolds. Note that Defini-
tions 3.5 and 3.6 can be easily generalized to orbifolds. (See [343] for the
definition of orbifold.) We have the following generalizations of Theorems
3.9 and 3.10 to orbifolds. The version for metrics isTHEOREM 3.24 (Compactness theorem for metrics on orbifolds). Let
{(Mk', gk, Ok)} be a sequence of complete pointed Riemannian orbifolds and
let L:k be the singular set of Mk· Suppose that(i) [V}; Rmk [k :::; Gp on Mk for all p 2: 0 and k, where Gp < oo are
constants independent of k, and(ii) Volgk Bgk (Ok, ro) 2: vo for all k, where ro > 0 and vo > 0 are two
constants independent of k.
Then either of the following hold.(1) limk---+oodgk(Ok,L:k) > 0. In this case there exists a subsequence
{ ( Mki, gkj, Oki)} which converges to a complete pointed Riemannian orb-
ifold (M~,goo,0 00 ) with [\7~ 00 Rmg 00 [g 00 :S Gp andVolg 00 Bg 00 (0oo,ro) 2:
vo. Furthermore 000 is a smooth point in M 00 •
(2) limk---+oodgk (Ok, L:k) = 0. In this case there exists a subsequence
{(Mkj' gkj' Okj)} such that limj---+oo d(Okj, L:kj) = 0. If we choose O~j E L:kj
with dgk ( okj' O~) = d( okj' L:kj)' then a subsequence of { (Mkj' gkj' o~J}
converges to a complete pointed Riemannian orbifold (M 00 , g 00 , 000 ) with
[\7~ 00 Rmg 00 [g 00 :S Gp and Volg 00 Bg 00 (0 00 , ro) 2: vo. Furthermore 000 is a
singular point in M 00 •The version for solutions of Ricci flow is the following.THEOREM 3.25 (Compactness theorem for solutions on orbifolds). Let
{(Mk', gk(t), Ok)}, t E (a, w), be a sequence of complete pointed orbifold
solutions of the Ricci flow. Let L:k be the singular set of Mk· Suppose that(i) [Rm k [k :S Co on Mk x (a, w) for all k, where Co < oo is a constant
independent of k, and(ii) Volgk(o) Bgk(o)(Ok, ro) 2: vo for all k, where ro > 0 and vo > 0 are
two constants independent of k.
Then either of the following hold.(1) limk---+oodgk(o)(Ok,L:k) > 0. In this case there exists a subsequence
{ (Mkj, gkj (t), Okj)} which converges to a complete pointed orbifold solution
of the Ricci flow (M~,goo(t),Ooo) with [Rmg 00 [g 00 :S Co on Moo X (a,w)
and Volg 00 (o) Bg 00 (o)(0 00 ,ro) 2: vo. Furthermore 000 is a smooth point in
Moo.
(2) limk---+oodgk(o)(Ok, L:k) = 0. In this case there exists a subsequence
{(Mkj,gkj(t), Oki)} such that limj---+oo d(Oki' L:kj) = 0. Furthermore if we
choose O~i E L:ki with dgk (0) (Oki, O~i) = dgk (0) (Oki, L:ki), then there is a
subsequence of { (Mkj, gki ( t), o~J} which converges to a complete pointed
orbifold solution of the Ricci flow (M~, goo(t), Ooo) with [Rm g 00 [g 00 :S Co