let s be State of SCM+FSA; :: thesis: for I, J being Program of SCM+FSA
for l being Element of NAT holds
( I is_closed_on s iff I is_closed_on s +* (I +* (Start-At (l,SCM+FSA))) )
let I, J be Program of SCM+FSA; :: thesis: for l being Element of NAT holds
( I is_closed_on s iff I is_closed_on s +* (I +* (Start-At (l,SCM+FSA))) )
let l be Element of NAT ; :: thesis: ( I is_closed_on s iff I is_closed_on s +* (I +* (Start-At (l,SCM+FSA))) )
DataPart s = DataPart (s +* (I +* (Start-At (l,SCM+FSA)))) by SCMFSA8A:11;
hence ( I is_closed_on s iff I is_closed_on s +* (I +* (Start-At (l,SCM+FSA))) ) by Th6; :: thesis: verum