let F be Field; for S being OrtSp of F
for b, a, x, y being Element of S
for l being Element of F st not a _|_ holds
PProJ (a,b,x,(l * y)) = l * (PProJ (a,b,x,y))
let S be OrtSp of F; for b, a, x, y being Element of S
for l being Element of F st not a _|_ holds
PProJ (a,b,x,(l * y)) = l * (PProJ (a,b,x,y))
let b, a, x, y be Element of S; for l being Element of F st not a _|_ holds
PProJ (a,b,x,(l * y)) = l * (PProJ (a,b,x,y))
let l be Element of F; ( not a _|_ implies PProJ (a,b,x,(l * y)) = l * (PProJ (a,b,x,y)) )
set 0F = 0. F;
assume A1:
not a _|_
; PProJ (a,b,x,(l * y)) = l * (PProJ (a,b,x,y))
A2:
now assume
not
y _|_
;
PProJ (a,b,x,(l * y)) = l * (PProJ (a,b,x,y))then A3:
x <> 0. S
by Th11;
a <> 0. S
by A1, Th11, Th12;
then
ex
p being
Element of
S st
( not
a _|_ & not
x _|_ & not
a _|_ & not
x _|_ )
by A3, Def2;
then consider p being
Element of
S such that A4:
not
a _|_
and A5:
not
x _|_
;
PProJ (
a,
b,
x,
(l * y))
= ((ProJ (a,b,p)) * (ProJ (p,a,x))) * (ProJ (x,p,(l * y)))
by A1, A4, A5, Def7;
then A6:
PProJ (
a,
b,
x,
(l * y))
= (l * (ProJ (x,p,y))) * ((ProJ (a,b,p)) * (ProJ (p,a,x)))
by A5, Th25;
PProJ (
a,
b,
x,
y)
= ((ProJ (a,b,p)) * (ProJ (p,a,x))) * (ProJ (x,p,y))
by A1, A4, A5, Def7;
hence
PProJ (
a,
b,
x,
(l * y))
= l * (PProJ (a,b,x,y))
by A6, GROUP_1:def 3;
verum end;
now assume A7:
y _|_
;
PProJ (a,b,x,(l * y)) = l * (PProJ (a,b,x,y))then
x _|_
by Th12;
then
x _|_
by Def2;
then A8:
PProJ (
a,
b,
x,
(l * y))
= 0. F
by A1, Th44;
x _|_
by A7, Th12;
then
l * (PProJ (a,b,x,y)) = l * (0. F)
by A1, Th44;
hence
PProJ (
a,
b,
x,
(l * y))
= l * (PProJ (a,b,x,y))
by A8, VECTSP_1:7;
verum end;
hence
PProJ (a,b,x,(l * y)) = l * (PProJ (a,b,x,y))
by A2; verum