now let m,
n be
Nat;
:: thesis: ( n in dom (IncAddr I,k) & m < n implies m in dom (IncAddr I,k) )assume A1:
n in dom (IncAddr I,k)
;
:: thesis: ( m < n implies m in dom (IncAddr I,k) )assume A2:
m < n
;
:: thesis: m in dom (IncAddr I,k)
dom (IncAddr I,k) = dom I
by SCMFSA_4:def 6;
hence
m in dom (IncAddr I,k)
by A1, A2, SCMNORM:def 1;
:: thesis: verum end;
hence
( IncAddr I,k is initial & IncAddr I,k is NAT -defined )
by SCMNORM:def 1; :: thesis: verum