let a be Ordinal; for U being Universe st omega in U & a in U & (U -Veblen) . a is normal Ordinal-Sequence of U holds
(U -Veblen) . (succ a) is normal Ordinal-Sequence of U
let U be Universe; ( omega in U & a in U & (U -Veblen) . a is normal Ordinal-Sequence of U implies (U -Veblen) . (succ a) is normal Ordinal-Sequence of U )
assume that
A1:
omega in U
and
A2:
a in U
; ( not (U -Veblen) . a is normal Ordinal-Sequence of U or (U -Veblen) . (succ a) is normal Ordinal-Sequence of U )
assume
(U -Veblen) . a is normal Ordinal-Sequence of U
; (U -Veblen) . (succ a) is normal Ordinal-Sequence of U
then reconsider f = (U -Veblen) . a as normal Ordinal-Sequence of U ;
succ a in U
by A2, CLASSES2:5;
then
succ a in On U
by ORDINAL1:def 9;
then
(U -Veblen) . (succ a) = criticals f
by Def15;
hence
(U -Veblen) . (succ a) is normal Ordinal-Sequence of U
by A1, Th44; verum