consider MOTS being MidOrdTrapSpace;
set X = Af MOTS;
A1:
now let a,
b,
c,
d be
Element of
(Af MOTS);
:: thesis: for a', b', c', d' being Element of the carrier of MOTS st a = a' & b = b' & c = c' & d = d' holds
( a,b // c,d iff a',b' // c',d' )let a',
b',
c',
d' be
Element of the
carrier of
MOTS;
:: thesis: ( a = a' & b = b' & c = c' & d = d' implies ( a,b // c,d iff a',b' // c',d' ) )assume A2:
(
a = a' &
b = b' &
c = c' &
d = d' )
;
:: thesis: ( a,b // c,d iff a',b' // c',d' )A3:
now assume
a,
b // c,
d
;
:: thesis: a',b' // c',d'then
[[a,b],[c,d]] in the
CONGR of
MOTS
by ANALOAF:def 2;
hence
a',
b' // c',
d'
by A2, ANALOAF:def 2;
:: thesis: verum end; now assume
a',
b' // c',
d'
;
:: thesis: a,b // c,dthen
[[a,b],[c,d]] in the
CONGR of
MOTS
by A2, ANALOAF:def 2;
hence
a,
b // c,
d
by ANALOAF:def 2;
:: thesis: verum end; hence
(
a,
b // c,
d iff
a',
b' // c',
d' )
by A3;
:: thesis: verum end;
now let p,
q,
a,
a1,
b,
b1,
c,
c1,
d,
d1 be
Element of
(Af MOTS);
:: thesis: ( p <> q & p,q // a,a1 & p,q // b,b1 & p,q // c,c1 & p,q // d,d1 & a,b // c,d implies a1,b1 // c1,d1 )assume A4:
(
p <> q &
p,
q // a,
a1 &
p,
q // b,
b1 &
p,
q // c,
c1 &
p,
q // d,
d1 &
a,
b // c,
d )
;
:: thesis: a1,b1 // c1,d1reconsider a' =
a,
b' =
b,
c' =
c,
d' =
d,
a1' =
a1,
b1' =
b1,
c1' =
c1,
d1' =
d1,
p' =
p,
q' =
q as
Element of
MOTS ;
(
p' <> q' &
p',
q' // a',
a1' &
p',
q' // b',
b1' &
p',
q' // c',
c1' &
p',
q' // d',
d1' &
a',
b' // c',
d' )
by A1, A4;
then
a1',
b1' // c1',
d1'
by Def13;
hence
a1,
b1 // c1,
d1
by A1;
:: thesis: verum end;
then
Af MOTS is Regular
by Def16;
hence
ex b1 being non empty OrdTrapSpace st
( b1 is strict & b1 is Regular )
; :: thesis: verum