consider t being State of SCM;
let l be Element of NAT ; :: thesis: for i being Instruction of SCM st ( for s being State of SCM st IC s = l holds
(Exec (i,s)) . (IC SCM) = succ (IC s) ) holds
NIC (i,l) = {(succ l)}
let i be Instruction of SCM; :: thesis: ( ( for s being State of SCM st IC s = l holds
(Exec (i,s)) . (IC SCM) = succ (IC s) ) implies NIC (i,l) = {(succ l)} )
reconsider I = i as Element of the Object-Kind of SCM . l by COMPOS_1:def 8;
assume A1: for s being State of SCM st IC s = l holds
(Exec (i,s)) . (IC SCM) = succ (IC s) ; :: thesis: NIC (i,l) = {(succ l)}
hereby :: according to TARSKI:def 3,XBOOLE_0:def 10 :: thesis: {(succ l)} c= NIC (i,l)
let x be set ; :: thesis: ( x in NIC (i,l) implies x in {(succ l)} )
assume x in NIC (i,l) ; :: thesis: x in {(succ l)}
then consider s being Element of product the Object-Kind of SCM such that
W: ( x = IC (Exec (i,s)) & IC s = l ) ;
x = succ l by A1, W;
hence x in {(succ l)} by TARSKI:def 1; :: thesis: verum
end;
reconsider il1 = l as Element of ObjectKind (IC SCM) by COMPOS_1:def 6;
reconsider n = l as Element of NAT ;
reconsider p = ((IC SCM),l) --> (il1,I) as PartState of SCM by COMPOS_1:37;
reconsider u = t +* p as Element of product the Object-Kind of SCM by PBOOLE:155;
let x be set ; :: according to TARSKI:def 3 :: thesis: ( not x in {(succ l)} or x in NIC (i,l) )
X: (ProgramPart u) /. l = u . l by COMPOS_1:38;
assume x in {(succ l)} ; :: thesis: x in NIC (i,l)
then A2: x = succ l by TARSKI:def 1;
A3: ( IC u = n & u . n = i ) by EXTPRO_1:26;
then IC (Following ((ProgramPart u),u)) = succ l by A1, X;
hence x in NIC (i,l) by A2, A3, X; :: thesis: verum