let F be non degenerated right_complementable Abelian add-associative right_zeroed distributive Field-like doubleLoopStr ; :: thesis: for a, b being Element of the carrier of F \ {(0. F)} holds a * b = b * a
let a, b be Element of H1(F) \ {(0. F)}; :: thesis: a * b = b * a
set B = H1(F) \ {(0. F)};
set P = (omf F) ! H1(F),(0. F);
reconsider e = 1. F as Element of H1(F) \ {(0. F)} by Lm26;
reconsider D = addLoopStr(# (H1(F) \ {(0. F)}),((omf F) ! H1(F),(0. F)),e #) as strict AbGroup by Def11;
reconsider a = a, b = b as Element of D ;
(omf F) || (H1(F) \ {(0. F)}) is Function of [:(H1(F) \ {(0. F)}),(H1(F) \ {(0. F)}):],H1(F) \ {(0. F)} by REALSET1:11;
then A1: dom ((omf F) || (H1(F) \ {(0. F)})) = [:(H1(F) \ {(0. F)}),(H1(F) \ {(0. F)}):] by FUNCT_2:def 1;
A2: for x, y being Element of H1(F) \ {(0. F)} holds (omf F) . x,y = the addF of D . x,y
proof
let x, y be Element of H1(F) \ {(0. F)}; :: thesis: (omf F) . x,y = the addF of D . x,y
[x,y] in [:(H1(F) \ {(0. F)}),(H1(F) \ {(0. F)}):] ;
hence (omf F) . x,y = the addF of D . x,y by A1, FUNCT_1:70; :: thesis: verum
end;
reconsider x = a, y = b as Element of F ;
x * y = a + b by A2
.= b + a
.= y * x by A2 ;
hence a * b = b * a ; :: thesis: verum