let UN be Universe; for R being Ring
for f being Morphism of (LModCat (UN,R))
for f9 being Element of Morphs (LModObjects (UN,R)) st f = f9 holds
( dom f = dom f9 & cod f = cod f9 )
let R be Ring; for f being Morphism of (LModCat (UN,R))
for f9 being Element of Morphs (LModObjects (UN,R)) st f = f9 holds
( dom f = dom f9 & cod f = cod f9 )
set C = LModCat (UN,R);
set V = LModObjects (UN,R);
set X = Morphs (LModObjects (UN,R));
let f be Morphism of (LModCat (UN,R)); for f9 being Element of Morphs (LModObjects (UN,R)) st f = f9 holds
( dom f = dom f9 & cod f = cod f9 )
let f9 be Element of Morphs (LModObjects (UN,R)); ( f = f9 implies ( dom f = dom f9 & cod f = cod f9 ) )
assume A1:
f = f9
; ( dom f = dom f9 & cod f = cod f9 )
hence dom f =
dom' f9
by Def11
.=
dom f9
;
cod f = cod f9
thus cod f =
cod' f9
by A1, Def12
.=
cod f9
; verum