let X be non empty BCIStr_0 ; :: thesis:
thus ( X is p-Semisimple BCI-algebra implies for x, y, z being Element of X holds
( (x \ y) \ (x \ z) = z \ y & x \ (0. X) = x ) ) by Th2, Th56; :: thesis:
assume A1: for x, y, z being Element of X holds
( (x \ y) \ (x \ z) = z \ y & x \ (0. X) = x ) ; :: thesis:

A2: now

let x, y, z be Element of X; :: thesis:
((x \ y) \ (x \ z)) \ (z \ y) = (z \ y) \ (z \ y) by A1
.= ((z \ y) \ (0. X)) \ (z \ y) by A1
.= ((z \ y) \ (0. X)) \ ((z \ y) \ (0. X)) by A1
.= (0. X) ` by A1 ;
hence ((x \ y) \ (x \ z)) \ (z \ y) = 0. X by A1; :: thesis:
(x \ (x \ y)) \ y = ((x \ (0. X)) \ (x \ y)) \ y by A1
.= (y \ (0. X)) \ y by A1
.= (y \ (0. X)) \ (y \ (0. X)) by A1
.= (0. X) ` by A1 ;
hence (x \ (x \ y)) \ y = 0. X by A1; :: thesis:
thus for x, y being Element of X holds x \ (x \ y) = y :: thesis:

proof

let x, y be Element of X; :: thesis:
x \ (x \ y) = (x \ (0. X)) \ (x \ y) by A1;
then x \ (x \ y) = y \ (0. X) by A1;
hence x \ (x \ y) = y by A1; :: thesis:

end;

end;

now

let x, y be Element of X; :: thesis:
assume that
A3: x \ y = 0. X and
y \ x = 0. X ; :: thesis:
x = x \ (0. X) by A1
.= (x \ (0. X)) \ (x \ y) by A1, A3
.= y \ (0. X) by A1 ;
hence x = y by A1; :: thesis:

end;

then A4: X is being_BCI-4 by Def7;

now

let x be Element of X; :: thesis:
x \ x = (x \ (0. X)) \ x by A1
.= (x \ (0. X)) \ (x \ (0. X)) by A1
.= (0. X) ` by A1 ;
hence x \ x = 0. X by A1; :: thesis:

end;

then X is being_I by Def5;
hence X is p-Semisimple BCI-algebra by A4, A2, Def26, Th1; :: thesis: