let AFP be AffinPlane; for a, b being Element of
for K being Subset of
for f being Permutation of the carrier of AFP st a,b // K & not a in K & ( for x, y being Element of holds
( f . x = y iff ( ( x in K & x = y ) or ( not x in K & ex p, p' being Element of st
( p in K & p' in K & p,a // p',x & p,b // p',y & x,y // K ) ) ) ) ) holds
f . a = b
let a, b be Element of ; for K being Subset of
for f being Permutation of the carrier of AFP st a,b // K & not a in K & ( for x, y being Element of holds
( f . x = y iff ( ( x in K & x = y ) or ( not x in K & ex p, p' being Element of st
( p in K & p' in K & p,a // p',x & p,b // p',y & x,y // K ) ) ) ) ) holds
f . a = b
let K be Subset of ; for f being Permutation of the carrier of AFP st a,b // K & not a in K & ( for x, y being Element of holds
( f . x = y iff ( ( x in K & x = y ) or ( not x in K & ex p, p' being Element of st
( p in K & p' in K & p,a // p',x & p,b // p',y & x,y // K ) ) ) ) ) holds
f . a = b
let f be Permutation of the carrier of AFP; ( a,b // K & not a in K & ( for x, y being Element of holds
( f . x = y iff ( ( x in K & x = y ) or ( not x in K & ex p, p' being Element of st
( p in K & p' in K & p,a // p',x & p,b // p',y & x,y // K ) ) ) ) ) implies f . a = b )
assume that
A1:
a,b // K
and
A2:
not a in K
; ( ex x, y being Element of st
( ( not f . x = y or ( x in K & x = y ) or ( not x in K & ex p, p' being Element of st
( p in K & p' in K & p,a // p',x & p,b // p',y & x,y // K ) ) ) implies ( ( ( x in K & x = y ) or ( not x in K & ex p, p' being Element of st
( p in K & p' in K & p,a // p',x & p,b // p',y & x,y // K ) ) ) & not f . x = y ) ) or f . a = b )
consider p, q being Element of such that
A3:
p in K
and
q in K
and
p <> q
by A1, AFF_1:31, AFF_1:40;
A4:
p,b // p,b
by AFF_1:11;
assume A5:
for x, y being Element of holds
( f . x = y iff ( ( x in K & x = y ) or ( not x in K & ex p, p' being Element of st
( p in K & p' in K & p,a // p',x & p,b // p',y & x,y // K ) ) ) )
; f . a = b
p,a // p,a
by AFF_1:11;
hence
f . a = b
by A1, A2, A5, A3, A4; verum