let X be non empty set ; :: thesis: for S being SigmaField of X
for M being sigma_Measure of S
for f, g being PartFunc of X,REAL st f in L1_Functions M & g in L1_Functions M holds
( a.e-eq-class f,M = a.e-eq-class g,M iff f a.e.= g,M )
let S be SigmaField of X; :: thesis: for M being sigma_Measure of S
for f, g being PartFunc of X,REAL st f in L1_Functions M & g in L1_Functions M holds
( a.e-eq-class f,M = a.e-eq-class g,M iff f a.e.= g,M )
let M be sigma_Measure of S; :: thesis: for f, g being PartFunc of X,REAL st f in L1_Functions M & g in L1_Functions M holds
( a.e-eq-class f,M = a.e-eq-class g,M iff f a.e.= g,M )
let f, g be PartFunc of X,REAL ; :: thesis: ( f in L1_Functions M & g in L1_Functions M implies ( a.e-eq-class f,M = a.e-eq-class g,M iff f a.e.= g,M ) )
assume A0:
( f in L1_Functions M & g in L1_Functions M )
; :: thesis: ( a.e-eq-class f,M = a.e-eq-class g,M iff f a.e.= g,M )
assume A2:
f a.e.= g,M
; :: thesis: a.e-eq-class f,M = a.e-eq-class g,M
now let x be
set ;
:: thesis: ( x in a.e-eq-class f,M implies x in a.e-eq-class g,M )assume
x in a.e-eq-class f,
M
;
:: thesis: x in a.e-eq-class g,Mthen consider r being
PartFunc of
X,
REAL such that A3:
(
x = r &
r in L1_Functions M &
f in L1_Functions M &
f a.e.= r,
M )
;
g a.e.= f,
M
by Th05, A2;
then
g a.e.= r,
M
by Th06, A3;
hence
x in a.e-eq-class g,
M
by A0, A3;
:: thesis: verum end;
then A4:
a.e-eq-class f,M c= a.e-eq-class g,M
by TARSKI:def 3;
now let x be
set ;
:: thesis: ( x in a.e-eq-class g,M implies x in a.e-eq-class f,M )assume
x in a.e-eq-class g,
M
;
:: thesis: x in a.e-eq-class f,Mthen consider r being
PartFunc of
X,
REAL such that A5:
(
x = r &
r in L1_Functions M &
g in L1_Functions M &
g a.e.= r,
M )
;
f a.e.= r,
M
by A2, A5, Th06;
hence
x in a.e-eq-class f,
M
by A0, A5;
:: thesis: verum end;
then
a.e-eq-class g,M c= a.e-eq-class f,M
by TARSKI:def 3;
hence
a.e-eq-class f,M = a.e-eq-class g,M
by A4, XBOOLE_0:def 10; :: thesis: verum