let fi be Ordinal-Sequence; for A being Ordinal st fi is increasing & A in dom fi holds
A c= fi . A
let A be Ordinal; ( fi is increasing & A in dom fi implies A c= fi . A )
assume that
A1:
for A, B being Ordinal st A in B & B in dom fi holds
fi . A in fi . B
and
A2:
A in dom fi
and
A3:
not A c= fi . A
; ORDINAL2:def 12 contradiction
defpred S1[ set ] means ( $1 in dom fi & not $1 c= fi . $1 );
A4:
ex A being Ordinal st S1[A]
by A2, A3;
consider A being Ordinal such that
A5:
S1[A]
and
A6:
for B being Ordinal st S1[B] holds
A c= B
from ORDINAL1:sch 1(A4);
reconsider B = fi . A as Ordinal ;
A7:
B in A
by A5, ORDINAL1:16;
then
not B c= fi . B
by A1, A5, ORDINAL1:5;
hence
contradiction
by A5, A6, A7, ORDINAL1:10; verum