let X be non empty set ; :: thesis: for S being SigmaField of X
for M being sigma_Measure of S
for f being PartFunc of ,
for x being Point of st f in x holds
( x = a.e-eq-class f,M & ||.x.|| = Integral M,(abs f) )
let S be SigmaField of X; :: thesis: for M being sigma_Measure of S
for f being PartFunc of ,
for x being Point of st f in x holds
( x = a.e-eq-class f,M & ||.x.|| = Integral M,(abs f) )
let M be sigma_Measure of S; :: thesis: for f being PartFunc of ,
for x being Point of st f in x holds
( x = a.e-eq-class f,M & ||.x.|| = Integral M,(abs f) )
let f be PartFunc of ,; :: thesis: for x being Point of st f in x holds
( x = a.e-eq-class f,M & ||.x.|| = Integral M,(abs f) )
let x be Point of ; :: thesis: ( f in x implies ( x = a.e-eq-class f,M & ||.x.|| = Integral M,(abs f) ) )
assume A1: f in x ; :: thesis: ( x = a.e-eq-class f,M & ||.x.|| = Integral M,(abs f) )
reconsider y = x as Point of ;
y in the carrier of (Pre-L-Space M) ;
then y in CosetSet M by Def18;
then consider g being PartFunc of , such that
A2: ( y = a.e-eq-class g,M & g in L1_Functions M ) ;
g in y by A2, Th38;
then f a.e.= g,M by A1, Th46;
hence ( x = a.e-eq-class f,M & ||.x.|| = Integral M,(abs f) ) by A1, A2, Th39, Th50; :: thesis: verum