let a, b be Ordinal; a |^|^ (succ b) = exp (a,(a |^|^ b))
deffunc H1( Ordinal) -> Ordinal = a |^|^ $1;
deffunc H2( Ordinal, Ordinal-Sequence) -> set = lim $2;
deffunc H3( Ordinal, Ordinal) -> set = exp (a,$2);
A1:
for b, c being Ordinal holds
( c = H1(b) iff ex fi being Ordinal-Sequence st
( c = last fi & dom fi = succ b & fi . 0 = 1 & ( for c being Ordinal st succ c in succ b holds
fi . (succ c) = H3(c,fi . c) ) & ( for c being Ordinal st c in succ b & c <> 0 & c is limit_ordinal holds
fi . c = H2(c,fi | c) ) ) )
by Def4;
for b being Ordinal holds H1( succ b) = H3(b,H1(b))
from ORDINAL2:sch 15(A1);
hence
a |^|^ (succ b) = exp (a,(a |^|^ b))
; verum