38 2. SPECIAL AND LIMIT SOLUTIONS
\ \ I I I J I I IFIGURE 2. A neckpinch forming- The neckpinch
The shrinking sphere we considered in Subsection 3.1 is the simplest
example of a finite-time singularity of the Ricci fl.ow. In this section, we
consider what is its next simplest and arguably its most important singu-
larity, the 'neckpinch'.
One says a solution (Mn, g ( t)) of the Ricci fl.ow encounters a local
singularity at T < oo if there exists a proper compact subset K c Mn
such thatbutsup IRml = oo
Kx [O,T)sup IRml < oo.
(Mn \K) x [O,T)
This type of singularity formation is also called pinching behavior in
the literature. The first rigorous examples of pinching behavior for the
Ricci fl.ow were constructed by Miles Simon [119] on noncompact warped
products lRx f 5n. In these examples, a supersolution of the Ricci fl.ow PDE
is used as an upper barrier to force a singularity occur on a compact
subset in finite time. Another family of examples was constructed in [40].
Here, the metric is a complete U (n)-invariant shrinking gradient Kahler-
Ricci soliton on the holomorphic line bundle L - k over (::JP'n-l with twisting
number k E {1, ... , n - 1 }. Ast/ T, the CIP'n-l which constitutes the zero-
section of the bundle pinches off, while the metric remains nonsingular and
indeed converges to a Kahler cone on the set (Cn\ {O} )/Zk which constitutes
the rest of the bundle. Both of these families of examples live on noncompact
manifolds.