let i be Element of NAT ; for A being closed-interval Subset of REAL
for D being Division of A
for f being Function of A,REAL st f | A is bounded_above & i in dom D holds
(upper_bound (rng f)) * (vol (divset D,i)) >= (upper_bound (rng (f | (divset D,i)))) * (vol (divset D,i))
let A be closed-interval Subset of REAL ; for D being Division of A
for f being Function of A,REAL st f | A is bounded_above & i in dom D holds
(upper_bound (rng f)) * (vol (divset D,i)) >= (upper_bound (rng (f | (divset D,i)))) * (vol (divset D,i))
let D be Division of A; for f being Function of A,REAL st f | A is bounded_above & i in dom D holds
(upper_bound (rng f)) * (vol (divset D,i)) >= (upper_bound (rng (f | (divset D,i)))) * (vol (divset D,i))
let f be Function of A,REAL ; ( f | A is bounded_above & i in dom D implies (upper_bound (rng f)) * (vol (divset D,i)) >= (upper_bound (rng (f | (divset D,i)))) * (vol (divset D,i)) )
A1:
dom f = A
by FUNCT_2:def 1;
assume
f | A is bounded_above
; ( not i in dom D or (upper_bound (rng f)) * (vol (divset D,i)) >= (upper_bound (rng (f | (divset D,i)))) * (vol (divset D,i)) )
then A2:
rng f is bounded_above
by Th15;
assume
i in dom D
; (upper_bound (rng f)) * (vol (divset D,i)) >= (upper_bound (rng (f | (divset D,i)))) * (vol (divset D,i))
then
dom (f | (divset D,i)) = divset D,i
by A1, Th10, RELAT_1:91;
then A3:
rng (f | (divset D,i)) is non empty Subset of REAL
by RELAT_1:65;
A4:
0 <= vol (divset D,i)
by SEQ_4:24, XREAL_1:50;
rng (f | (divset D,i)) c= rng f
by RELAT_1:99;
hence
(upper_bound (rng f)) * (vol (divset D,i)) >= (upper_bound (rng (f | (divset D,i)))) * (vol (divset D,i))
by A3, A2, A4, SEQ_4:65, XREAL_1:66; verum