- HEAT BALLS AND THE SPACE-TIME MEAN VALUE PROPERTY 369
Its time slices are given byE;^1 (xo, to) =i= Er(xo, to) n { T (t) = T1} c M x {to - T1}
for TI > 0. Equivalently, define
Er,t 1 (xo, to) =i= Er(xo, to) n {t =ti} c M x {ti},
so thatfor ti <to.
In order to ensure that the integral (26.106) below, which appears in the
statement of the mean value property, is well defined, we shall make some
additional assumptions on the heat kernel H(x, y, T) which guarantee thatthe time slices E; are compact. In particular, we assume that along the
diagonal we have a bound of the form(26.104)c
H(y,y,T):'S f(T)' (y,T)EMx(O,oo),
for some constant C < oo and some positive, continuous, strictly increasing
function f : (0, oo) --+ (0, oo) which is (!', A)-regular in the sense of Definition
26.20 with T = oo.
Under assumption (26.104) on the heat kernel along the diagonal, by
a general result of Davies and Grigor'yan (see Theorem 1.1 of [76]), there
exist constants 5, D, C 1 E (0, oo) such that the heat kernel has the upper
bound
(26.105) C1 ( d2(x,y))
H(x, y, T) ::::; f(5T) exp - DTfor all x,y EM and TE (O,oo).^6
Using this estimate, we shall prove the following, which is a generaliza-
tion of (26.98).
THEOREM 26.41 (Space-time mean value property for the heat equation- manifold version). Let (Mn,g) be a complete Riemannian manifold with
heat kernel H(x, y, T) satisfying assumption (26.104). If u: M x [O, T] --+JR
is a classical solution to the heat equation ~~ - b.u = 0, then for any fixed
to E (0, T] there exists r > 0 such that for any r E (0, r) and xo E M, the
heat ball Er(xo, to) lies inside a compact subset of M x (0, T] and(26.106) u(xo,to) = r~ ff u(y,t)l\7logHl^2 (xo,y,T(t))dμ(y) dt,
Er(xo,to)where T(t) =to - t.
(^6) In fact, for any D > 4 there exists J > 0 and C1 < oo such that (26.105) holds.