124 2. KAHLER-RICCI FLOW
Hence
(8 ). :
Bt - b.L Sa/3 2: fa,rff31 + \17f\lrySa/3 + \l~f\11Sa/3- ~Sa1 (ff3ry - c:Rry/3 - ~gry/3)
+ 2 1 (. fa1 - c:Ra7 - tga7^1 ) S13ry·
The estimate (2.141) follows from an application of the maximum principle;
see [287] for details. D
Tracing (2.140), i.e., multiplying by ga/3 and summing, we haveCOROLLARY 2.102 (Trace interpolated differential Harnack estimate).
Under the hypotheses of Theorem 2.101,
nu -
b.u + c:uR + t + gaf3 ( Ua V13 + u13 Va + u Va V13) 2: 0,which, by taking Va = -~ and then dividing the resulting expression by u,
implies the equivalent inequality
n
b. log u + c:R + -t > - 0.Let N ~JM ulogudμ be the (classical) entropy of u. We have under
(2.139), gtdμ = -c:Rdμ (since gt detg'YJ = -c:RdetgryJ), and. d: =JM (b.u + c:Ru + (logu) b.u) dμ
=JM (b.logu + c:R) udμ
2: -~ r udμ.
. }M
In other words,(2.143)11. Notes and commentary
Some books containing material on or devoted to complex manifolds and
Kahler geometry, in essentially chronological order, are Weil [370], Chern
[95], Goldberg [157], Kobayashi and Nomizu [236], Morrow and Kodaira
[275], Griffiths and Harris [166], Aubin [13], Kodaira [238], Besse [27], Siu
[334], Mok [270], Tian [347], Wells [371], and Zheng [383]. We refer the
reader to these books for the proper study of Kahler geometry.
For the Ricci flow on real 2-dimensional orbifolds, see L.-F. Wu [372] and
[112]. For the Ricci flow on noncompact Riemannian surfaces, see Wu [373],