let p be non NAT -defined autonomic FinPartState of ; for s1, s2 being State of SCM+FSA st p c= s1 & p c= s2 holds
for i being Element of NAT
for da, db being Int-Location
for f being FinSeq-Location st CurInstr (ProgramPart (Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s1),s1,i) = da := f,db & da in dom p holds
for k1, k2 being Element of NAT st k1 = abs ((Comput (ProgramPart s1),s1,i) . db) & k2 = abs ((Comput (ProgramPart s2),s2,i) . db) holds
((Comput (ProgramPart s1),s1,i) . f) /. k1 = ((Comput (ProgramPart s2),s2,i) . f) /. k2
let s1, s2 be State of SCM+FSA ; ( p c= s1 & p c= s2 implies for i being Element of NAT
for da, db being Int-Location
for f being FinSeq-Location st CurInstr (ProgramPart (Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s1),s1,i) = da := f,db & da in dom p holds
for k1, k2 being Element of NAT st k1 = abs ((Comput (ProgramPart s1),s1,i) . db) & k2 = abs ((Comput (ProgramPart s2),s2,i) . db) holds
((Comput (ProgramPart s1),s1,i) . f) /. k1 = ((Comput (ProgramPart s2),s2,i) . f) /. k2 )
assume A1:
( p c= s1 & p c= s2 )
; for i being Element of NAT
for da, db being Int-Location
for f being FinSeq-Location st CurInstr (ProgramPart (Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s1),s1,i) = da := f,db & da in dom p holds
for k1, k2 being Element of NAT st k1 = abs ((Comput (ProgramPart s1),s1,i) . db) & k2 = abs ((Comput (ProgramPart s2),s2,i) . db) holds
((Comput (ProgramPart s1),s1,i) . f) /. k1 = ((Comput (ProgramPart s2),s2,i) . f) /. k2
let i be Element of NAT ; for da, db being Int-Location
for f being FinSeq-Location st CurInstr (ProgramPart (Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s1),s1,i) = da := f,db & da in dom p holds
for k1, k2 being Element of NAT st k1 = abs ((Comput (ProgramPart s1),s1,i) . db) & k2 = abs ((Comput (ProgramPart s2),s2,i) . db) holds
((Comput (ProgramPart s1),s1,i) . f) /. k1 = ((Comput (ProgramPart s2),s2,i) . f) /. k2
let da, db be Int-Location ; for f being FinSeq-Location st CurInstr (ProgramPart (Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s1),s1,i) = da := f,db & da in dom p holds
for k1, k2 being Element of NAT st k1 = abs ((Comput (ProgramPart s1),s1,i) . db) & k2 = abs ((Comput (ProgramPart s2),s2,i) . db) holds
((Comput (ProgramPart s1),s1,i) . f) /. k1 = ((Comput (ProgramPart s2),s2,i) . f) /. k2
let f be FinSeq-Location ; ( CurInstr (ProgramPart (Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s1),s1,i) = da := f,db & da in dom p implies for k1, k2 being Element of NAT st k1 = abs ((Comput (ProgramPart s1),s1,i) . db) & k2 = abs ((Comput (ProgramPart s2),s2,i) . db) holds
((Comput (ProgramPart s1),s1,i) . f) /. k1 = ((Comput (ProgramPart s2),s2,i) . f) /. k2 )
set Cs1i1 = Comput (ProgramPart s1),s1,(i + 1);
set Cs2i1 = Comput (ProgramPart s2),s2,(i + 1);
A2:
(Comput (ProgramPart s1),s1,(i + 1)) | (dom p) = (Comput (ProgramPart s2),s2,(i + 1)) | (dom p)
by A1, AMI_1:def 25;
set Cs2i = Comput (ProgramPart s2),s2,i;
set Cs1i = Comput (ProgramPart s1),s1,i;
set I = CurInstr (ProgramPart (Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s1),s1,i);
T:
ProgramPart s1 = ProgramPart (Comput (ProgramPart s1),s1,i)
by AMI_1:144;
A3: Comput (ProgramPart s1),s1,(i + 1) =
Following (ProgramPart s1),(Comput (ProgramPart s1),s1,i)
by AMI_1:14
.=
Exec (CurInstr (ProgramPart (Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s1),s1,i)
by T
;
A4:
( da in dom p implies ( ((Comput (ProgramPart s1),s1,(i + 1)) | (dom p)) . da = (Comput (ProgramPart s1),s1,(i + 1)) . da & ((Comput (ProgramPart s2),s2,(i + 1)) | (dom p)) . da = (Comput (ProgramPart s2),s2,(i + 1)) . da ) )
by FUNCT_1:72;
T:
ProgramPart s2 = ProgramPart (Comput (ProgramPart s2),s2,i)
by AMI_1:144;
A5: Comput (ProgramPart s2),s2,(i + 1) =
Following (ProgramPart s2),(Comput (ProgramPart s2),s2,i)
by AMI_1:14
.=
Exec (CurInstr (ProgramPart (Comput (ProgramPart s2),s2,i)),(Comput (ProgramPart s2),s2,i)),(Comput (ProgramPart s2),s2,i)
by T
;
assume that
A6:
CurInstr (ProgramPart (Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s1),s1,i) = da := f,db
and
A7:
da in dom p
; for k1, k2 being Element of NAT st k1 = abs ((Comput (ProgramPart s1),s1,i) . db) & k2 = abs ((Comput (ProgramPart s2),s2,i) . db) holds
((Comput (ProgramPart s1),s1,i) . f) /. k1 = ((Comput (ProgramPart s2),s2,i) . f) /. k2
A8:
( ex k1 being Element of NAT st
( k1 = abs ((Comput (ProgramPart s1),s1,i) . db) & (Exec (CurInstr (ProgramPart (Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s1),s1,i)) . da = ((Comput (ProgramPart s1),s1,i) . f) /. k1 ) & ex k2 being Element of NAT st
( k2 = abs ((Comput (ProgramPart s2),s2,i) . db) & (Exec (CurInstr (ProgramPart (Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s1),s1,i)),(Comput (ProgramPart s2),s2,i)) . da = ((Comput (ProgramPart s2),s2,i) . f) /. k2 ) )
by A6, SCMFSA_2:98;
let i1, i2 be Element of NAT ; ( i1 = abs ((Comput (ProgramPart s1),s1,i) . db) & i2 = abs ((Comput (ProgramPart s2),s2,i) . db) implies ((Comput (ProgramPart s1),s1,i) . f) /. i1 = ((Comput (ProgramPart s2),s2,i) . f) /. i2 )
assume
( i1 = abs ((Comput (ProgramPart s1),s1,i) . db) & i2 = abs ((Comput (ProgramPart s2),s2,i) . db) & ((Comput (ProgramPart s1),s1,i) . f) /. i1 <> ((Comput (ProgramPart s2),s2,i) . f) /. i2 )
; contradiction
hence
contradiction
by A1, A3, A5, A4, A2, A7, A8, Th18; verum