64 2. KAHLER-RICCI FLOWEXERCISE 2.11 ( J-invariance of curvature). Show that for a Kahler man-
ifold Rm (X, Y) is J-invariant, i.e., Rm (X, Y) JZ = J (Rm (X, Y) Z).
SOLUTION. We compute
Rm (X, Y) JZ = \7x\7yJZ - \7y\7xJZ - \J[X,Y]JZ
= \Jx (J\JyZ) - \ly (J\JxZ) - J (\J[X,YJZ)
= J (\7x\7yZ) - J (\7y\7xZ) - J (\J[X,YJZ)
= J (Rm (X, Y) Z).
The components of Rec are defined similarly:Rec ( a~a, a~f3) ~ Rai3'Rec (a~a' a~/3) ~ Raf3,etc. Tracing (2.4), we see that components of the Ricci tensor Rai3 = R~i3a
are given byLEMMA 2.12 (Kahler Re).(2.6)a2
azaaz/3 log det (g'YJ).It is easy to see that Rai3 = Rf3a and Raf3 = Rai3 = 0.. EXERCISE 2.13. Show that for a Kahler manifold Re is J-invariant, i.e.,
Re (JX, JY) =Re (X, Y).
The Ricci form p is the 2-form associated to Re,
1
p ( X, Y) ~ "2 Re ( J X, Y) ,which is also a real (1, 1)-form.EXERCISE 2.14. Show that if g is a Kahler metric, then the Ricci form
p is a closed 2-form.HINT: See Proposition 2.4 7 on p. 7 4 of [27].The real de Rham cohomology class [ 2 ~p] ~ c 1 (M) is the first Chern
class of M. It is a beautiful fact that [ 2 ~p] only depends on the complex
structure of M.
The Ricci form, which is a real (1, 1)-form, is i~ holomorphic coordinates:P = HRai3dza /\ dz!3.
From (2.10) below and r~/3 = ria we have
a a
a za RM = a z/3 Ra;y'