- LI-YAU ESTIMATE FOR POSITIVE SOLUTIONS OF HEAT EQUATIONS 31g
for each TE [O, T]. If
u: U Bg( 7 ) (p, 2R) x {r}-+ IR+
TE[O,Tjis a positive solution tothen for each TE [O, T] we have in Bg( 7 )(P, R)(25.56) --alog u - (1-c-) IV'logul^2 +Q 2: ---n ( -^1 + - + - + Cs Cg C10 )
or 2 - 3c- T R R^2 'where Cs depends only on n and K, where Cg depends only on n and E, and
where C10 depends only on n, K, E, and C'.REMARK 25.10. A difference in the above two theorems is that, in the
latter case, the bounds in the hypothesis are assumed only on a ball instead
of on the whole manifold.
PROBLEM 25.11. Prove a Li-Yau-type differential Harnack estimate for
positive solutions of heat-type equations coupled to the backward Ricci flow
using only local bounds on the curvature and potential function.2.2. Some consequences - classical-type Harnack estimates.
A standard integration along paths of the gradient estimate (25.54)
yields the following 'classical-type' Harnack inequality, which compares the
solution at different points in space-time.
COROLLARY 25.12 (Classical-type Harnack inequality for evolving met-
rics). Assume that g is a complete metric on Mn such that for each T E
[O, T],