let M be MidSp; :: thesis: for W being ATLAS of M
for a, c, b being Point of M holds
( a @ c = b iff W . (a,c) = Double (W . (a,b)) )
let W be ATLAS of M; :: thesis: for a, c, b being Point of M holds
( a @ c = b iff W . (a,c) = Double (W . (a,b)) )
let a, c, b be Point of M; :: thesis: ( a @ c = b iff W . (a,c) = Double (W . (a,b)) )
set w = the function of W;
set G = the algebra of W;
A1: ( the algebra of W is midpoint_operator & the algebra of W is add-associative & the algebra of W is right_zeroed & the algebra of W is right_complementable & the algebra of W is Abelian ) by Def12;
( the function of W is_atlas_of the carrier of M, the algebra of W & M, the algebra of W are_associated_wrp the function of W ) by Def12;
hence ( a @ c = b iff W . (a,c) = Double (W . (a,b)) ) by A1, Th35; :: thesis: verum