let R1, R2 be Relation of X; ( ( for x, y being set holds
( x,y in R1 iff ( x in X & y in X & A <- (f . x) <> 0 & ( A <- (f . x) < A <- (f . y) or A <- (f . y) = 0 ) ) ) ) & ( for x, y being set holds
( x,y in R2 iff ( x in X & y in X & A <- (f . x) <> 0 & ( A <- (f . x) < A <- (f . y) or A <- (f . y) = 0 ) ) ) ) implies R1 = R2 )
assume that
A2:
for x, y being set holds
( x,y in R1 iff ( x in X & y in X & A <- (f . x) <> 0 & ( A <- (f . x) < A <- (f . y) or A <- (f . y) = 0 ) ) )
and
A3:
for x, y being set holds
( x,y in R2 iff ( x in X & y in X & A <- (f . x) <> 0 & ( A <- (f . x) < A <- (f . y) or A <- (f . y) = 0 ) ) )
; R1 = R2
let x, y be object ; RELAT_1:def 2 ( ( not [x,y] in R1 or [x,y] in R2 ) & ( not [x,y] in R2 or [x,y] in R1 ) )
reconsider xx = x, yy = y as set by TARSKI:1;
( [x,y] in R1 iff xx,yy in R1 )
;
then
( [x,y] in R1 iff ( x in X & y in X & A <- (f . x) <> 0 & ( A <- (f . x) < A <- (f . y) or A <- (f . y) = 0 ) ) )
by A2;
then
( [x,y] in R1 iff xx,yy in R2 )
by A3;
hence
( ( not [x,y] in R1 or [x,y] in R2 ) & ( not [x,y] in R2 or [x,y] in R1 ) )
; verum