let I be set ; :: thesis: for A being ObjectsFamily of I,(EnsCat {{}})
for o being Object of (EnsCat {{}})
for P being MorphismsFamily of o,A st P = I --> {} holds
( P is feasible & P is projection-morphisms )
let A be ObjectsFamily of I,(EnsCat {{}}); :: thesis: for o being Object of (EnsCat {{}})
for P being MorphismsFamily of o,A st P = I --> {} holds
( P is feasible & P is projection-morphisms )
let o be Object of (EnsCat {{}}); :: thesis: for P being MorphismsFamily of o,A st P = I --> {} holds
( P is feasible & P is projection-morphisms )
let P be MorphismsFamily of o,A; :: thesis: ( P = I --> {} implies ( P is feasible & P is projection-morphisms ) )
assume A1: P = I --> {} ; :: thesis: ( P is feasible & P is projection-morphisms )
thus P is feasible :: thesis: P is projection-morphisms
proof
let i be set ; :: according to ALTCAT_5:def 4 :: thesis: ( i in I implies ex o being Object of (EnsCat {{}}) st
( o = A . i & P . i in <^o,o^> ) )
assume A2: i in I ; :: thesis: ex o being Object of (EnsCat {{}}) st
( o = A . i & P . i in <^o,o^> )
then reconsider I = I as non empty set ;
reconsider i = i as Element of I by A2;
reconsider A = A as ObjectsFamily of I,(EnsCat {{}}) ;
P . i = {} by A1, FUNCOP_1:7;
then P . i in <^o,(A . i)^> by Lm3;
hence ex o being Object of (EnsCat {{}}) st
( o = A . i & P . i in <^o,o^> ) ; :: thesis: verum
end;
let Y be Object of (EnsCat {{}}); :: according to ALTCAT_5:def 6 :: thesis: for F being MorphismsFamily of Y,A st F is feasible holds
ex f being Morphism of Y,o st
( f in <^Y,o^> & ( for i being set st i in I holds
ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f ) ) & ( for f1 being Morphism of Y,o st ( for i being set st i in I holds
ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f1 ) ) holds
f = f1 ) )
let F be MorphismsFamily of Y,A; :: thesis: ( F is feasible implies ex f being Morphism of Y,o st
( f in <^Y,o^> & ( for i being set st i in I holds
ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f ) ) & ( for f1 being Morphism of Y,o st ( for i being set st i in I holds
ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f1 ) ) holds
f = f1 ) ) )
assume F is feasible ; :: thesis: ex f being Morphism of Y,o st
( f in <^Y,o^> & ( for i being set st i in I holds
ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f ) ) & ( for f1 being Morphism of Y,o st ( for i being set st i in I holds
ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f1 ) ) holds
f = f1 ) )
reconsider f = {} as Morphism of Y,o by Lm3;
take f ; :: thesis: ( f in <^Y,o^> & ( for i being set st i in I holds
ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f ) ) & ( for f1 being Morphism of Y,o st ( for i being set st i in I holds
ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f1 ) ) holds
f = f1 ) )
thus f in <^Y,o^> by Lm3; :: thesis: ( ( for i being set st i in I holds
ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f ) ) & ( for f1 being Morphism of Y,o st ( for i being set st i in I holds
ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f1 ) ) holds
f = f1 ) )
thus for i being set st i in I holds
ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f ) :: thesis: for f1 being Morphism of Y,o st ( for i being set st i in I holds
ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f1 ) ) holds
f = f1
proof
let i be set ; :: thesis: ( i in I implies ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f ) )
assume A3: i in I ; :: thesis: ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f )
then reconsider I = I as non empty set ;
reconsider j = i as Element of I by A3;
reconsider M = {} as Morphism of o,o by Lm3;
reconsider A1 = A as ObjectsFamily of I,(EnsCat {{}}) ;
reconsider F1 = F as MorphismsFamily of Y,A1 ;
take o ; :: thesis: ex Pi being Morphism of o,o st
( o = A . i & Pi = P . i & F . i = Pi * f )
take M ; :: thesis: ( o = A . i & M = P . i & F . i = M * f )
A1 . j = {} by Lm1, TARSKI:def 1;
hence o = A . i by Lm5; :: thesis: ( M = P . i & F . i = M * f )
thus M = P . i by A1, A3, FUNCOP_1:7; :: thesis: F . i = M * f
( F1 . j is Morphism of Y,o & M * f is Morphism of Y,o ) by Lm5;
hence F . i = M * f by Lm6; :: thesis: verum
end;
thus for f1 being Morphism of Y,o st ( for i being set st i in I holds
ex si being Object of (EnsCat {{}}) ex Pi being Morphism of o,si st
( si = A . i & Pi = P . i & F . i = Pi * f1 ) ) holds
f = f1 by Lm4; :: thesis: verum