let R be good Ring; :: thesis: for I being Instruction of (SCM R) st InsCode I = 0 holds
I = halt (SCM R)
let I be Instruction of (SCM R); :: thesis: ( InsCode I = 0 implies I = halt (SCM R) )
A1: ( I = [0 ,{} ] or ex a, b being Data-Location of R st I = a := b or ex a, b being Data-Location of R st I = AddTo a,b or ex a, b being Data-Location of R st I = SubFrom a,b or ex a, b being Data-Location of R st I = MultBy a,b or ex i1 being Element of NAT st I = goto i1,R or ex a being Data-Location of R ex i1 being Element of NAT st I = a =0_goto i1 or ex a being Data-Location of R ex r being Element of R st I = a := r ) by SCMRING2:8;
assume InsCode I = 0 ; :: thesis: I = halt (SCM R)
hence I = halt (SCM R) by A1, MCART_1:def 1, SCMRING2:30; :: thesis: verum