thus
( R is symmetric iff for x, y being Element of X holds R . x,y = R . y,x )
verumproof
assume A1:
for
x,
y being
Element of
X holds
R . x,
y = R . y,
x
;
R is symmetric
A2:
for
x,
y being
set st
[x,y] in dom R holds
(converse R) . x,
y = R . x,
y
proof
let x,
y be
set ;
( [x,y] in dom R implies (converse R) . x,y = R . x,y )
assume
[x,y] in dom R
;
(converse R) . x,y = R . x,y
then reconsider x =
x,
y =
y as
Element of
X by ZFMISC_1:106;
R . x,
y = R . y,
x
by A1;
hence
(converse R) . x,
y = R . x,
y
by FUZZY_4:26;
verum
end;
(
dom (converse R) = [:X,X:] &
dom R = [:X,X:] )
by FUNCT_2:def 1;
then
converse R = R
by A2, BINOP_1:32;
hence
R is
symmetric
by Def4;
verum
end;