1547845439-The_Ricci_Flow_-_Techniques_and_Applications_-_Part_I__Chow_

(jair2018) #1

220 5. ENERGY, MONOTONICITY, AND BREATHERS


using ~ = h ~ 8 f. Integrating by parts yields

8:F = 8 JM Re-f dμ + 5 JM IVJl^2 e-f dμ = - JM Vij (Rij + \7i"'\ljf) e-f dμ.


Although the Ricci tensor is not strictly elliptic in g, one can ask if the
RHS of equation (5.27)


.§_g· at tJ · = -2 [R tJ · + "'\7 i ·"'\7 J ·log ( dm dμ)]


is elliptic in g. The answer is still no. In particular, if 8g = v, then

Hence


Since


we have


8 (-2 [Rij + "'\li"'\ljlog (:~) ]) = b..vij - "'\li"'\lkvjk - "'\lj"'\lkvik


+. lower-order terms,


where the last pair of terms form a Lie derivative of the metric term. How-
ever the second-order operator on the RHS is still not elliptic in v.

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