deffunc H1( Ordinal) -> Ordinal = inf (rng (L | ((dom L) \ $1)));
consider fi being Ordinal-Sequence such that
A7:
( dom fi = dom L & ( for A being Ordinal st A in dom L holds
fi . A = H1(A) ) )
from ORDINAL2:sch 3();
take
sup fi
; ex fi being Ordinal-Sequence st
( sup fi = sup fi & dom fi = dom L & ( for A being Ordinal st A in dom L holds
fi . A = inf (rng (L | ((dom L) \ A))) ) )
take
fi
; ( sup fi = sup fi & dom fi = dom L & ( for A being Ordinal st A in dom L holds
fi . A = inf (rng (L | ((dom L) \ A))) ) )
thus
( sup fi = sup fi & dom fi = dom L & ( for A being Ordinal st A in dom L holds
fi . A = inf (rng (L | ((dom L) \ A))) ) )
by A7; verum