let P be Instruction-Sequence of SCMPDS; :: thesis: for s being State of SCMPDS
for I being Program of
for a, b being Int_position
for i being Integer
for n being Nat st s . (DataLoc ((s . a),i)) <= 0 holds
(IExec ((for-down (a,i,n,I)),P,(Initialize s))) . b = s . b
let s be State of SCMPDS; :: thesis: for I being Program of
for a, b being Int_position
for i being Integer
for n being Nat st s . (DataLoc ((s . a),i)) <= 0 holds
(IExec ((for-down (a,i,n,I)),P,(Initialize s))) . b = s . b
let I be Program of ; :: thesis: for a, b being Int_position
for i being Integer
for n being Nat st s . (DataLoc ((s . a),i)) <= 0 holds
(IExec ((for-down (a,i,n,I)),P,(Initialize s))) . b = s . b
let a, b be Int_position; :: thesis: for i being Integer
for n being Nat st s . (DataLoc ((s . a),i)) <= 0 holds
(IExec ((for-down (a,i,n,I)),P,(Initialize s))) . b = s . b
let i be Integer; :: thesis: for n being Nat st s . (DataLoc ((s . a),i)) <= 0 holds
(IExec ((for-down (a,i,n,I)),P,(Initialize s))) . b = s . b
let n be Nat; :: thesis: ( s . (DataLoc ((s . a),i)) <= 0 implies (IExec ((for-down (a,i,n,I)),P,(Initialize s))) . b = s . b )
assume s . (DataLoc ((s . a),i)) <= 0 ; :: thesis: (IExec ((for-down (a,i,n,I)),P,(Initialize s))) . b = s . b
then A1: IExec ((for-down (a,i,n,I)),P,(Initialize s)) = s +* (Start-At (((card I) + 3),SCMPDS)) by Th43;
not b in dom (Start-At (((card I) + 3),SCMPDS)) by SCMPDS_4:18;
hence (IExec ((for-down (a,i,n,I)),P,(Initialize s))) . b = s . b by A1, FUNCT_4:11; :: thesis: verum