let AFV be WeakAffVect; :: thesis: for p, q, a being Element of AFV holds
( PSym p,(PSym q,a) = PSym q,(PSym p,a) iff ( p = q or MDist p,q or MDist q, PSym p,q ) )
let p, q, a be Element of AFV; :: thesis: ( PSym p,(PSym q,a) = PSym q,(PSym p,a) iff ( p = q or MDist p,q or MDist q, PSym p,q ) )
A1:
now assume
PSym p,
(PSym q,a) = PSym q,
(PSym p,a)
;
:: thesis: ( ( p = q or MDist q,p or MDist q, PSym p,q ) & ( p = q or MDist p,q or MDist q, PSym p,q ) )then
PSym p,
(PSym q,(PSym p,a)) = PSym q,
a
by Th36;
then
PSym (PSym p,q),
a = PSym q,
a
by Th44;
then
(
q = PSym p,
q or
MDist q,
PSym p,
q )
by Th43;
then A2:
(
Mid q,
p,
q or
MDist q,
PSym p,
q )
by Def4;
hence
(
p = q or
MDist q,
p or
MDist q,
PSym p,
q )
by Th23;
:: thesis: ( p = q or MDist p,q or MDist q, PSym p,q )thus
(
p = q or
MDist p,
q or
MDist q,
PSym p,
q )
by A2, Th23;
:: thesis: verum end;
now assume
(
p = q or
MDist p,
q or
MDist q,
PSym p,
q )
;
:: thesis: PSym p,(PSym q,a) = PSym q,(PSym p,a)then
(
Mid q,
p,
q or
MDist q,
PSym p,
q )
by Th23;
then
PSym (PSym p,q),
a = PSym q,
a
by Def4, Th43;
then
PSym p,
(PSym q,(PSym p,a)) = PSym q,
a
by Th44;
hence
PSym p,
(PSym q,a) = PSym q,
(PSym p,a)
by Th36;
:: thesis: verum end;
hence
( PSym p,(PSym q,a) = PSym q,(PSym p,a) iff ( p = q or MDist p,q or MDist q, PSym p,q ) )
by A1; :: thesis: verum