The ground state and the long-time evolution in the CMC Einstein flow

Abstract

Let (g,K)(k) be a CMC (vacuum) Einstein flow over a compact three-manifold M with non-positive Yamabe invariant (Y(M)). As noted by Fischer and Moncrief, the reduced volume V(k)=(-k/3)3Volg(k)(M) is monotonically decreasing in the expanding direction and bounded below by V∈f=(-1/6)Y(M))3/2. Inspired by this fact we define the ground state of the manifold M as "the limit" of any sequence of CMC states (gi,Ki) satisfying: i. ki=-3, ii. Vi --> Vinf, iii. Q0((gi,Ki))< L where Q0 is the Bel-Robinson energy and L is any arbitrary positive constant. We prove that (as a geometric state) the ground state is equivalent to the Thurston geometrization of M. Ground states classify naturally into three types. We provide examples for each class, including a new ground state (the Double Cusp) that we analyze in detail. Finally consider a long time and cosmologically normalized flow (,)(s)=((-k/3)2g,(-k/3))K) where s=-ln(-k) is in [a,∞). We prove that if E1=E1((,))< L (where E1=Q0+Q1, is the sum of the zero and first order Bel-Robinson energies) the flow (,)(s) persistently geometrizes the three-manifold M and the geometrization is the ground state if V --> Vinf.