theorem
for
X1,
X2 being non
empty set for
S1 being
SigmaField of
X1 for
S2 being
SigmaField of
X2 for
M1 being
sigma_Measure of
S1 for
M2 being
sigma_Measure of
S2 for
f being
PartFunc of
[:X1,X2:],
ExtREAL st
M2 is
sigma_finite &
f is_integrable_on Prod_Measure (
M1,
M2) holds
(
Integral (
M1,
(max+ (Integral2 (M2,|.f.|))))
= Integral (
M1,
(Integral2 (M2,|.f.|))) &
Integral (
M1,
(max- (Integral2 (M2,|.f.|))))
= 0 )