let f be FinSequence of (TOP-REAL 2); ( f is unfolded & f is weakly-one-to-one implies for p, q being Point of (TOP-REAL 2) st p in L~ f & q in L~ f holds
B_Cut (f,p,q) is unfolded )
assume A1:
( f is unfolded & f is weakly-one-to-one )
; for p, q being Point of (TOP-REAL 2) st p in L~ f & q in L~ f holds
B_Cut (f,p,q) is unfolded
let p, q be Point of (TOP-REAL 2); ( p in L~ f & q in L~ f implies B_Cut (f,p,q) is unfolded )
assume that
A2:
p in L~ f
and
A3:
q in L~ f
; B_Cut (f,p,q) is unfolded
A4:
Index (p,f) < len f
by A2, JORDAN3:8;
A5:
1 <= Index (p,f)
by A2, JORDAN3:8;
then
Index (p,f) in Seg (len f)
by A4, FINSEQ_1:1;
then A6:
Index (p,f) in dom f
by FINSEQ_1:def 3;
per cases
( p <> q or p = q )
;
suppose A7:
p <> q
;
B_Cut (f,p,q) is unfolded now B_Cut (f,p,q) is unfolded per cases
( ( p in L~ f & q in L~ f & Index (p,f) < Index (q,f) ) or ( Index (p,f) = Index (q,f) & LE p,q,f /. (Index (p,f)),f /. ((Index (p,f)) + 1) ) or ( not ( p in L~ f & q in L~ f & Index (p,f) < Index (q,f) ) & not ( Index (p,f) = Index (q,f) & LE p,q,f /. (Index (p,f)),f /. ((Index (p,f)) + 1) ) ) )
;
suppose A8:
(
p in L~ f &
q in L~ f &
Index (
p,
f)
< Index (
q,
f) )
;
B_Cut (f,p,q) is unfolded then A9:
q in L~ (L_Cut (f,p))
by JORDAN3:29;
L_Cut (
f,
p) is
unfolded
by A1, A2, Th32;
then
R_Cut (
(L_Cut (f,p)),
q) is
unfolded
by A9, Th33;
hence
B_Cut (
f,
p,
q) is
unfolded
by A8, JORDAN3:def 7;
verum end; suppose A10:
(
Index (
p,
f)
= Index (
q,
f) &
LE p,
q,
f /. (Index (p,f)),
f /. ((Index (p,f)) + 1) )
;
B_Cut (f,p,q) is unfolded A11:
L_Cut (
f,
p) is
unfolded
by A1, A2, Th32;
q in L~ (L_Cut (f,p))
by A2, A3, A7, A10, JORDAN3:31;
then
R_Cut (
(L_Cut (f,p)),
q) is
unfolded
by A11, Th33;
hence
B_Cut (
f,
p,
q) is
unfolded
by A10, JORDAN3:def 7;
verum end; suppose A12:
( not (
p in L~ f &
q in L~ f &
Index (
p,
f)
< Index (
q,
f) ) & not (
Index (
p,
f)
= Index (
q,
f) &
LE p,
q,
f /. (Index (p,f)),
f /. ((Index (p,f)) + 1) ) )
;
B_Cut (f,p,q) is unfolded A13:
now p in L~ (L_Cut (f,q))per cases
( Index (q,f) < Index (p,f) or Index (q,f) = Index (p,f) )
by A2, A3, A12, XXREAL_0:1;
suppose A14:
Index (
q,
f)
= Index (
p,
f)
;
p in L~ (L_Cut (f,q))A15:
(Index (p,f)) + 1
>= 1
by NAT_1:11;
(Index (p,f)) + 1
<= len f
by A4, NAT_1:13;
then
(Index (p,f)) + 1
in Seg (len f)
by A15, FINSEQ_1:1;
then A16:
(Index (p,f)) + 1
in dom f
by FINSEQ_1:def 3;
set Ls =
LSeg (
(f /. (Index (p,f))),
(f /. ((Index (p,f)) + 1)));
A17:
q in LSeg (
(f /. (Index (p,f))),
(f /. ((Index (p,f)) + 1)))
by A3, A14, JORDAN5B:29;
A18:
p in LSeg (
(f /. (Index (p,f))),
(f /. ((Index (p,f)) + 1)))
by A2, JORDAN5B:29;
f . (Index (p,f)) <> f . ((Index (p,f)) + 1)
by A1, A5, A4;
then
f . (Index (p,f)) <> f /. ((Index (p,f)) + 1)
by A16, PARTFUN1:def 6;
then A19:
f /. (Index (p,f)) <> f /. ((Index (p,f)) + 1)
by A6, PARTFUN1:def 6;
then A20:
LSeg (
(f /. (Index (p,f))),
(f /. ((Index (p,f)) + 1)))
is_an_arc_of f /. (Index (p,f)),
f /. ((Index (p,f)) + 1)
by TOPREAL1:9;
not
LE p,
q,
LSeg (
(f /. (Index (p,f))),
(f /. ((Index (p,f)) + 1))),
f /. (Index (p,f)),
f /. ((Index (p,f)) + 1)
by A12, A14, A19, JORDAN5C:17;
then
LE q,
p,
LSeg (
(f /. (Index (p,f))),
(f /. ((Index (p,f)) + 1))),
f /. (Index (p,f)),
f /. ((Index (p,f)) + 1)
by A7, A20, A18, A17, JORDAN5C:14;
hence
p in L~ (L_Cut (f,q))
by A2, A3, A7, A14, A19, JORDAN3:31, JORDAN5C:17;
verum end; A21:
B_Cut (
f,
p,
q)
= Rev (R_Cut ((L_Cut (f,q)),p))
by A12, JORDAN3:def 7;
L_Cut (
f,
q) is
unfolded
by A1, A3, Th32;
then
R_Cut (
(L_Cut (f,q)),
p) is
unfolded
by A13, Th33;
hence
B_Cut (
f,
p,
q) is
unfolded
by A21, SPPOL_2:28;
verum hence
B_Cut (
f,
p,
q) is
unfolded
;
verum