let N be non empty with_non-empty_elements set ; :: thesis: for S being non empty stored-program IC-Ins-separated definite realistic COM-Struct of N
for p being PartState of S
for j, k being Nat holds DecIC ((p +* (Start-At (j,S))),k) = p +* (Start-At ((j -' k),S))
let S be non empty stored-program IC-Ins-separated definite realistic COM-Struct of N; :: thesis: for p being PartState of S
for j, k being Nat holds DecIC ((p +* (Start-At (j,S))),k) = p +* (Start-At ((j -' k),S))
let p be PartState of S; :: thesis: for j, k being Nat holds DecIC ((p +* (Start-At (j,S))),k) = p +* (Start-At ((j -' k),S))
let j, k be Nat; :: thesis: DecIC ((p +* (Start-At (j,S))),k) = p +* (Start-At ((j -' k),S))
thus DecIC ((p +* (Start-At (j,S))),k) = (p +* (Start-At (j,S))) +* (Start-At (((IC (p +* (Start-At (j,S)))) -' k),S))
.= p +* (Start-At (((IC (p +* (Start-At (j,S)))) -' k),S)) by FUNCT_4:122
.= p +* (Start-At ((j -' k),S)) by Th142 ; :: thesis: verum