assume A2: for a, b being Point of RAS
for x being Tuple of (n + 1),W holds Phi a,x = Phi b,x ; :: thesis: RAS is being_invariance
let a be Point of RAS; :: according to MIDSP_3:def 5 :: thesis: for b being Point of RAS
for p, q being Tuple of (n + 1),RAS st ( for m being Nat of n holds a @ (q . m) = b @ (p . m) ) holds
a @ (*' b,q) = b @ (*' a,p)
let b be Point of RAS; :: thesis: for p, q being Tuple of (n + 1),RAS st ( for m being Nat of n holds a @ (q . m) = b @ (p . m) ) holds
a @ (*' b,q) = b @ (*' a,p)
let p, q be Tuple of (n + 1),RAS; :: thesis: ( ( for m being Nat of n holds a @ (q . m) = b @ (p . m) ) implies a @ (*' b,q) = b @ (*' a,p) )
A3: W . a,(*' a,(a,(W . a,p) . W)) = Phi a,(W . a,p)
.= Phi b,(W . a,p) by A2
.= W . b,(*' b,(b,(W . a,p) . W)) ;
assume A4: for m being Nat of n holds a @ (q . m) = b @ (p . m) ; :: thesis: a @ (*' b,q) = b @ (*' a,p)
W . a,(*' a,p) = W . a,(*' a,(a,(W . a,p) . W)) by Th17
.= W . b,(*' b,(b,(W . b,q) . W)) by A5, A3, Th16
.= W . b,(*' b,q) by Th17 ;
hence a @ (*' b,q) = b @ (*' a,p) by MIDSP_2:39; :: thesis: verum

assume A7: RAS is being_invariance ; :: thesis: for a, b being Point of RAS
for x being Tuple of (n + 1),W holds Phi a,x = Phi b,x
let a, b be Point of RAS; :: thesis: for x being Tuple of (n + 1),W holds Phi a,x = Phi b,x
let x be Tuple of (n + 1),W; :: thesis: Phi a,x = Phi b,x
set p = a,x . W;
set q = b,x . W;
A8: W . a,(a,x . W) = x by Th17
.= W . b,(b,x . W) by Th17 ;
then a @ (*' b,(b,x . W)) = b @ (*' a,(a,x . W)) by A7, Def5;
hence Phi a,x = Phi b,x by MIDSP_2:39; :: thesis: verum