let N be non empty with_non-empty_elements set ; :: thesis: for S being non empty IC-Ins-separated AMI-Struct of N
for p being NAT -defined the Instructions of b₁ -valued finite Function
for s being State of holds Comput p,s,0 = s
let S be non empty IC-Ins-separated AMI-Struct of N; :: thesis: for p being NAT -defined the Instructions of S -valued finite Function
for s being State of holds Comput p,s,0 = s
let p be NAT -defined the Instructions of S -valued finite Function; :: thesis: for s being State of holds Comput p,s,0 = s
let s be State of ; :: thesis: Comput p,s,0 = s
ex f being Function of NAT , product the Object-Kind of S st
( Comput p,s,0 = f . 0 & f . 0 = s & ( for i being Nat holds f . (i + 1) = Following p,(f . i) ) ) by Def6;
hence Comput p,s,0 = s ; :: thesis: verum