let C be non empty set ; for f being PartFunc of C,COMPLEX holds dom ((f ^) ^) = dom (f | (dom (f ^)))
let f be PartFunc of C,COMPLEX; dom ((f ^) ^) = dom (f | (dom (f ^)))
A1:
dom (f ^) = (dom f) \ (f " {0c})
by Def2;
thus dom ((f ^) ^) =
(dom (f ^)) \ ((f ^) " {0c})
by Def2
.=
(dom (f ^)) \ {}
by Th9
.=
(dom f) /\ (dom (f ^))
by A1, XBOOLE_1:28, XBOOLE_1:36
.=
dom (f | (dom (f ^)))
by RELAT_1:61
; verum