28 17. ENTROPY, μ,-INVARIANT, AND FINITE TIME SINGULARITIESthere exists a constant C < oo such that
(17.81) F' (r) :::; G (r) + CrF (r).
Now we proceed to estimate G (r) from above. Let <p E C 0 (B) be a
radial function (i.e., a function of d (·,p)), where B = B (p, inj (p)). We have
1 1
inj(p) 1 aw
\Jw 00 • \J<p dμ = dr
000
<p^1 (r) dO'
B 0 S(p,r) r
tnj(p)
=lo <p^1 (r) A (r) G (r) dr,where
A (r) = { dO'
1 S(p,r)is the ( n - 1 )-dimensional volume of S (p, r). Since w 00 is a weak solution
to (17.77),
(17.82)
tnj(p)
lo <p1
(r) A (r) G (r) dr= ~ L W 00 log (w 00 ) i.p dμ
- ~ L (-R + ~ log(47r) + n + μ(g, 1)) w 00 <pdμ.
Let
(17.83) L (r) = 2Al( ) r Woo log Woo dO'
r 1 S(p,r)and
(17.84) K (r) =
4 A\r) ls(p,r) ( R - ~log( 47r) - n - μ(g, 1)) w^00 dO',so that (17.82) implies that G (r) satisfies
tnj(p)lo ('P^1 (r) G (~) - <p (r) L (r) + <p (r) K (r)) A (r) dr = O
for all radial functions <p E C 0 (B). This implies (Rothaus says, 'By the
usual one-dimensional regularity result, ... ')
(17.85)d.
dr (G(r)A(r)) = (K(r)-L(r))A(r).Now from definition (17.84) we haveK(r):SAC() r WoodO'
r 1 S(p,r)
=CF(r),