- THE FUNCTIONALS μ AND v 235
of this chapter). In particular, by taking a = l~ in (6.65) below, we have
for£< 0,
WE:(g, f, T) 2:: JM ( 4T l'Vwl^2 + cw^2 log ( w^2 )) dμ
- TRmin +£(~log (47rT) + n)
(6.46) 2:: -2 lcl C (~:i, g) + TRmin +£(~log (47rT) + n) ~ -oo,
where(2T ) _ 2T -2/n 4 lcl
C ~,g - ~ Vol(g) + 2Tn 2 e 2 C 8 (M,g)
is as in Lemma 6.36.REMARK 6.19. On a Riemannian manifold (Mn, [J) , Jensen's inequality
says that if 'P is convex on JR and u E L^1 (.All) , then
(. ) r. <po u dμ, ?. <p ( ( • ) r. u dμ).
Vol M JM Vol M JMApplying Jensen's inequality with 'P (x) = x log x, we see that for any posi-
tive function u with JM udμ = 1,(6.47) JM ulogu dμ 2:: -log (vol (M)).
This is an alternative estimate to (6.45).
2. The functionalsμ and v
Similarly to defining >. (g) using the energy :F (g, f) , we define two func-tionalsμ and v using the entropy W(g, f, T). In this section we first discuss
the elementary properties of μ and v obtained directly from the properties
of the entropY. W. We show using the logarithmic Sobolev inequality thatμ(g, T) is finite and we show that a constrained minimizer f of W(g, f, T)
exists. We end this section with the monotonicity of μ.
2.1. The diffeomorphism-invariant functionalsμ and v. Let u ~(47rT)-nl^2 e-f as in (6.3). We define a subset X of Wtet x C^00 (M) x JR+ by
(6.48) X = { (g,j,T): JM udμ = 1}.