let A, B be non empty transitive AltCatStr ; ( A,B are_opposite & A is with_units implies B is with_units )
assume A1:
A,B are_opposite
; ( not A is with_units or B is with_units )
assume
A is with_units
; B is with_units
then reconsider A = A as non empty transitive with_units AltCatStr ;
deffunc H1( set , set , set , set , set ) -> set = ( the Comp of A . ($3,$2,$1)) . ($4,$5);
A2:
now for a, b, c being Object of B st <^a,b^> <> {} & <^b,c^> <> {} holds
for f being Morphism of a,b
for g being Morphism of b,c holds g * f = H1(a,b,c,f,g)let a,
b,
c be
Object of
B;
( <^a,b^> <> {} & <^b,c^> <> {} implies for f being Morphism of a,b
for g being Morphism of b,c holds g * f = H1(a,b,c,f,g) )assume that A3:
<^a,b^> <> {}
and A4:
<^b,c^> <> {}
;
for f being Morphism of a,b
for g being Morphism of b,c holds g * f = H1(a,b,c,f,g)let f be
Morphism of
a,
b;
for g being Morphism of b,c holds g * f = H1(a,b,c,f,g)let g be
Morphism of
b,
c;
g * f = H1(a,b,c,f,g)reconsider a9 =
a,
b9 =
b,
c9 =
c as
Object of
A by A1;
A5:
<^a,b^> = <^b9,a9^>
by A1, Th7;
A6:
<^b,c^> = <^c9,b9^>
by A1, Th7;
reconsider f9 =
f as
Morphism of
b9,
a9 by A1, Th7;
reconsider g9 =
g as
Morphism of
c9,
b9 by A1, Th7;
thus g * f =
f9 * g9
by A1, A3, A4, Th9
.=
H1(
a,
b,
c,
f,
g)
by A3, A4, A5, A6, ALTCAT_1:def 8
;
verum end;
A7:
now for a being Object of B ex f being set st
( f in <^a,a^> & ( for b being Object of B
for g being set st g in <^a,b^> holds
H1(a,a,b,f,g) = g ) )let a be
Object of
B;
ex f being set st
( f in <^a,a^> & ( for b being Object of B
for g being set st g in <^a,b^> holds
H1(a,a,b,f,g) = g ) )reconsider a9 =
a as
Object of
A by A1;
reconsider f =
idm a9 as
set ;
take f =
f;
( f in <^a,a^> & ( for b being Object of B
for g being set st g in <^a,b^> holds
H1(a,a,b,f,g) = g ) )
idm a9 in <^a9,a9^>
;
hence
f in <^a,a^>
by A1, Th7;
for b being Object of B
for g being set st g in <^a,b^> holds
H1(a,a,b,f,g) = glet b be
Object of
B;
for g being set st g in <^a,b^> holds
H1(a,a,b,f,g) = glet g be
set ;
( g in <^a,b^> implies H1(a,a,b,f,g) = g )reconsider b9 =
b as
Object of
A by A1;
assume A8:
g in <^a,b^>
;
H1(a,a,b,f,g) = gthen A9:
g in <^b9,a9^>
by A1, Th7;
reconsider g9 =
g as
Morphism of
b9,
a9 by A1, A8, Th7;
thus H1(
a,
a,
b,
f,
g) =
(idm a9) * g9
by A9, ALTCAT_1:def 8
.=
g
by A9, ALTCAT_1:20
;
verum end;
A10:
now for a being Object of B ex f being set st
( f in <^a,a^> & ( for b being Object of B
for g being set st g in <^b,a^> holds
H1(b,a,a,g,f) = g ) )let a be
Object of
B;
ex f being set st
( f in <^a,a^> & ( for b being Object of B
for g being set st g in <^b,a^> holds
H1(b,a,a,g,f) = g ) )reconsider a9 =
a as
Object of
A by A1;
reconsider f =
idm a9 as
set ;
take f =
f;
( f in <^a,a^> & ( for b being Object of B
for g being set st g in <^b,a^> holds
H1(b,a,a,g,f) = g ) )
idm a9 in <^a9,a9^>
;
hence
f in <^a,a^>
by A1, Th7;
for b being Object of B
for g being set st g in <^b,a^> holds
H1(b,a,a,g,f) = glet b be
Object of
B;
for g being set st g in <^b,a^> holds
H1(b,a,a,g,f) = glet g be
set ;
( g in <^b,a^> implies H1(b,a,a,g,f) = g )reconsider b9 =
b as
Object of
A by A1;
assume A11:
g in <^b,a^>
;
H1(b,a,a,g,f) = gthen A12:
g in <^a9,b9^>
by A1, Th7;
reconsider g9 =
g as
Morphism of
a9,
b9 by A1, A11, Th7;
thus H1(
b,
a,
a,
g,
f) =
g9 * (idm a9)
by A12, ALTCAT_1:def 8
.=
g
by A12, ALTCAT_1:def 17
;
verum end;
thus
B is with_units
from YELLOW18:sch 3(A2, A7, A10); verum