280 6. ENTROPY AND NO LOCAL COLLAPSINGREMARK 6.92. Note that(V'i - V'd) ('Yj - Y'jf) Vij=div (divv) +\Re, v) - 2 div (v) · V' f + VijV'dV'jf - (Rij + Y'iV'jf) Vij·
Also,andFor any closed Riemannian manifold (.Mn,§) with variation gs§ = v,
by (5.10), (5.51), and JM(~ - h) e-f dμ = 0, we have:s >.. (§) = - JM Vij (Rij + V'iV'jf) e-f dμ,
where f is the minimizer of :F (§, ·). Thus the critical points of ).. (§) are the
steady gradient Ricci solitons fl.owing along the gradient of the minimizer.
Since, given v, equality holds in (6.112) when h satisfies (6.111), we obtain
the following second variation formula proved in [53].THEOREM 6.93 (Cao, Hamilton, and Ilmanen). Let (.Mn,§) be a closed
Ricci fiat manifold and let v be a symmetric 2-tensor. If g ( s) = §+sh, thend2
ds2^1 s=O).. (g (s)) =JM r ( -2^1 IV'vl^2 + jd1vvl.^2 -^1 2 IV'wj^2 + ~pjqViqVjp ) dμ= JM \L v, v) dμ,
where w is defined by (up to an additive constant)l:::..w ~div (divv)andLv ~ ~l:::..v - ~.L(divv)Q§ +Rm (v).
Similarly, one can compute the variation ofv (§) ~ inf μ (§, T) = inf W (§, f, T) ,
TE[O,oo) 7',/where JM e-f dμ = (47rrr/^2 , on an Einstein manifold with positive scalar
curvature (see [53]).
THEOR8M 6.94 (Cao, Hamilton, and Ilmanen). Let (.Mn,§) be a closed