let X be non empty set ; for S being SigmaField of X
for f being PartFunc of X,ExtREAL st f is_simple_func_in S holds
ex F being Finite_Sep_Sequence of S ex a being FinSequence of ExtREAL st F,a are_Re-presentation_of f
let S be SigmaField of X; for f being PartFunc of X,ExtREAL st f is_simple_func_in S holds
ex F being Finite_Sep_Sequence of S ex a being FinSequence of ExtREAL st F,a are_Re-presentation_of f
let f be PartFunc of X,ExtREAL; ( f is_simple_func_in S implies ex F being Finite_Sep_Sequence of S ex a being FinSequence of ExtREAL st F,a are_Re-presentation_of f )
assume
f is_simple_func_in S
; ex F being Finite_Sep_Sequence of S ex a being FinSequence of ExtREAL st F,a are_Re-presentation_of f
then consider F being Finite_Sep_Sequence of S, a being FinSequence of ExtREAL such that
A1:
( dom f = union (rng F) & dom F = dom a & ( for n being Nat st n in dom F holds
for x being object st x in F . n holds
f . x = a . n ) )
and
for x being object st x in dom f holds
ex ax being FinSequence of ExtREAL st
( dom ax = dom a & ( for n being Nat st n in dom ax holds
ax . n = (a . n) * ((chi ((F . n),X)) . x) ) )
by Th3;
take
F
; ex a being FinSequence of ExtREAL st F,a are_Re-presentation_of f
take
a
; F,a are_Re-presentation_of f
thus
F,a are_Re-presentation_of f
by A1; verum