- DIFFERENTIATING A CONVOLUTION WITH THE PARAMETRIX 241
In particular,(23.88)
I ~~ ( x, z, t _ s) I
"5. C (i + rz (x)) (t-s)-n/2exp ( r; (x) )
t-s 4(t-s)- _ Crx (z)^2 a-n ((r; --(z)) "¥-a + --^1 (r; --(z)) "¥+1-a) exp ( ----r; (z) )
( t - st t - s r x (z) t - s 4 ( t - s)
"5_ C (t - S )-a rx (z)2a-n-I'
where C < oo is independent of x, z EM ands E (0, t] and where we used
the fact that r x ( z) is bounded.
Hence, by (23.88) we have, provided a E (~, 1),
I~ (x,y,s,t)l "5. JM' (x,z,t-s)G(z,y,s),dμ(z)
"5.C {.. (t-s)-arx(z)^2 a-n-^1 IG(z,y,s)ldμ(z)
JB(x,mJ~g))
tnj(g)/2 ·
"5. C (t - s)-a Jo r2a-2dr(23.89) "5. C (t - s)-asince supp ( °tx1t (x, ·, t - s)) c B ( x, injJg)), where C < oo is independent
of x, y E M and s E ( O, t]. In particular, the improper integral
i
t1 8PN - it 8JN ·
8. (x,z,t-s)G(z,y,s)dμ(z)ds= -
8
. (x,y,s,t)ds
o M xi o xion the RHS of (23.80) converges absolutely.
By (23.85) and (23.86), proving (23.80) is equivalent to showing that the
partial derivative
(23.90)- a. a it it aJN
8
. (PN * G) (x, y, t) =;= -
8
xi xi. o JN (x, y, s, t) ds = o - 8 xi. (x, y, s, t) ds