let f be Function; for x being set st x in dom f holds
f orbit (f . x) c= f orbit x
let x be set ; ( x in dom f implies f orbit (f . x) c= f orbit x )
assume A1:
x in dom f
; f orbit (f . x) c= f orbit x
let a be set ; TARSKI:def 3 ( a nin f orbit (f . x) or not a nin f orbit x )
assume
a in f orbit (f . x)
; not a nin f orbit x
then consider n being Element of NAT such that
A2:
a = (iter f,n) . (f . x)
and
A3:
f . x in dom (iter f,n)
;
A4:
iter f,(n + 1) = (iter f,n) * f
by FUNCT_7:71;
then A5:
a = (iter f,(n + 1)) . x
by A1, A2, FUNCT_1:23;
x in dom (iter f,(n + 1))
by A1, A3, A4, FUNCT_1:21;
hence
not a nin f orbit x
by A5; verum