:: Reconstructions of Special Sequences
:: by Yatsuka Nakamura and Roman Matuszewski
::
:: Received December 10, 1996
:: Copyright (c) 1996 Association of Mizar Users


begin

theorem :: JORDAN3:1
canceled;

theorem :: JORDAN3:2
canceled;

theorem :: JORDAN3:3
canceled;

theorem :: JORDAN3:4
canceled;

theorem :: JORDAN3:5
canceled;

theorem :: JORDAN3:6
canceled;

theorem :: JORDAN3:7
canceled;

theorem :: JORDAN3:8
canceled;

theorem :: JORDAN3:9
canceled;

theorem :: JORDAN3:10
canceled;

theorem :: JORDAN3:11
canceled;

theorem :: JORDAN3:12
canceled;

theorem :: JORDAN3:13
canceled;

theorem :: JORDAN3:14
canceled;

theorem :: JORDAN3:15
canceled;

theorem :: JORDAN3:16
canceled;

theorem :: JORDAN3:17
canceled;

theorem :: JORDAN3:18
canceled;

theorem :: JORDAN3:19
canceled;

theorem :: JORDAN3:20
canceled;

theorem :: JORDAN3:21
canceled;

theorem :: JORDAN3:22
canceled;

theorem :: JORDAN3:23
canceled;

theorem :: JORDAN3:24
canceled;

theorem :: JORDAN3:25
canceled;

theorem :: JORDAN3:26
canceled;

theorem :: JORDAN3:27
canceled;

theorem :: JORDAN3:28
canceled;

theorem :: JORDAN3:29
canceled;

theorem :: JORDAN3:30
canceled;

theorem :: JORDAN3:31
canceled;

theorem :: JORDAN3:32
canceled;

theorem :: JORDAN3:33
canceled;

theorem :: JORDAN3:34
for n being Element of NAT
for f being FinSequence of (TOP-REAL n) st 2 <= len f holds
( f . 1 in L~ f & f /. 1 in L~ f & f . (len f) in L~ f & f /. (len f) in L~ f )
proof end;

theorem Th35: :: JORDAN3:35
for p1, p2, q1, q2 being Point of (TOP-REAL 2) st ( p1 `1 = p2 `1 or p1 `2 = p2 `2 ) & q1 in LSeg (p1,p2) & q2 in LSeg (p1,p2) & not q1 `1 = q2 `1 holds
q1 `2 = q2 `2
proof end;

theorem Th36: :: JORDAN3:36
for p1, p2, q1, q2 being Point of (TOP-REAL 2) st ( p1 `1 = p2 `1 or p1 `2 = p2 `2 ) & LSeg (q1,q2) c= LSeg (p1,p2) & not q1 `1 = q2 `1 holds
q1 `2 = q2 `2
proof end;

theorem Th37: :: JORDAN3:37
for f being FinSequence of (TOP-REAL 2)
for n being Element of NAT st 2 <= n & f is being_S-Seq holds
f | n is being_S-Seq
proof end;

theorem Th38: :: JORDAN3:38
for f being FinSequence of (TOP-REAL 2)
for n being Element of NAT st n <= len f & 2 <= (len f) -' n & f is being_S-Seq holds
f /^ n is being_S-Seq
proof end;

theorem :: JORDAN3:39
for f being FinSequence of (TOP-REAL 2)
for k1, k2 being Element of NAT st f is being_S-Seq & 1 <= k1 & k1 <= len f & 1 <= k2 & k2 <= len f & k1 <> k2 holds
mid (f,k1,k2) is being_S-Seq
proof end;

begin

definition
let f be FinSequence of (TOP-REAL 2);
let p be Point of (TOP-REAL 2);
canceled;
assume A1: p in L~ f ;
func Index (p,f) -> Element of NAT means :Def2: :: JORDAN3:def 2
ex S being non empty Subset of NAT st
( it = min S & S = { i where i is Element of NAT : p in LSeg (f,i) } );
existence
ex b1 being Element of NAT ex S being non empty Subset of NAT st
( b1 = min S & S = { i where i is Element of NAT : p in LSeg (f,i) } )
proof end;
uniqueness
for b1, b2 being Element of NAT st ex S being non empty Subset of NAT st
( b1 = min S & S = { i where i is Element of NAT : p in LSeg (f,i) } ) & ex S being non empty Subset of NAT st
( b2 = min S & S = { i where i is Element of NAT : p in LSeg (f,i) } ) holds
b1 = b2
;
end;

:: deftheorem JORDAN3:def 1 :
canceled;

:: deftheorem Def2 defines Index JORDAN3:def 2 :
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st p in L~ f holds
for b3 being Element of NAT holds
( b3 = Index (p,f) iff ex S being non empty Subset of NAT st
( b3 = min S & S = { i where i is Element of NAT : p in LSeg (f,i) } ) );

theorem Th40: :: JORDAN3:40
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2)
for i being Element of NAT st p in LSeg (f,i) holds
Index (p,f) <= i
proof end;

theorem Th41: :: JORDAN3:41
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st p in L~ f holds
( 1 <= Index (p,f) & Index (p,f) < len f )
proof end;

theorem Th42: :: JORDAN3:42
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st p in L~ f holds
p in LSeg (f,(Index (p,f)))
proof end;

theorem Th43: :: JORDAN3:43
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st p in LSeg (f,1) holds
Index (p,f) = 1
proof end;

theorem Th44: :: JORDAN3:44
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st len f >= 2 holds
Index ((f /. 1),f) = 1
proof end;

theorem Th45: :: JORDAN3:45
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2)
for i1 being Nat st f is being_S-Seq & 1 < i1 & i1 <= len f & p = f . i1 holds
(Index (p,f)) + 1 = i1
proof end;

theorem Th46: :: JORDAN3:46
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2)
for i1 being Element of NAT st f is s.n.c. & p in LSeg (f,i1) & not i1 = Index (p,f) holds
i1 = (Index (p,f)) + 1
proof end;

theorem Th47: :: JORDAN3:47
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2)
for i1 being Element of NAT st f is unfolded & f is s.n.c. & i1 + 1 <= len f & p in LSeg (f,i1) & p <> f . i1 holds
i1 = Index (p,f)
proof end;

definition
let g be FinSequence of (TOP-REAL 2);
let p1, p2 be Point of (TOP-REAL 2);
pred g is_S-Seq_joining p1,p2 means :Def3: :: JORDAN3:def 3
( g is being_S-Seq & g . 1 = p1 & g . (len g) = p2 );
end;

:: deftheorem Def3 defines is_S-Seq_joining JORDAN3:def 3 :
for g being FinSequence of (TOP-REAL 2)
for p1, p2 being Point of (TOP-REAL 2) holds
( g is_S-Seq_joining p1,p2 iff ( g is being_S-Seq & g . 1 = p1 & g . (len g) = p2 ) );

theorem Th48: :: JORDAN3:48
for g being FinSequence of (TOP-REAL 2)
for p1, p2 being Point of (TOP-REAL 2) st g is_S-Seq_joining p1,p2 holds
Rev g is_S-Seq_joining p2,p1
proof end;

theorem Th49: :: JORDAN3:49
for f, g being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2)
for j being Nat st p in L~ f & g = <*p*> ^ (mid (f,((Index (p,f)) + 1),(len f))) & 1 <= j & j + 1 <= len g holds
LSeg (g,j) c= LSeg (f,(((Index (p,f)) + j) -' 1))
proof end;

theorem :: JORDAN3:50
for f, g being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st f is being_S-Seq & p in L~ f & p <> f . ((Index (p,f)) + 1) & g = <*p*> ^ (mid (f,((Index (p,f)) + 1),(len f))) holds
g is_S-Seq_joining p,f /. (len f)
proof end;

theorem Th51: :: JORDAN3:51
for f, g being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2)
for j being Nat st p in L~ f & 1 <= j & j + 1 <= len g & g = (mid (f,1,(Index (p,f)))) ^ <*p*> holds
LSeg (g,j) c= LSeg (f,j)
proof end;

theorem Th52: :: JORDAN3:52
for f, g being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st f is being_S-Seq & p in L~ f & p <> f . 1 & g = (mid (f,1,(Index (p,f)))) ^ <*p*> holds
g is_S-Seq_joining f /. 1,p
proof end;

begin

definition
let f be FinSequence of (TOP-REAL 2);
let p be Point of (TOP-REAL 2);
func L_Cut (f,p) -> FinSequence of (TOP-REAL 2) equals :Def4: :: JORDAN3:def 4
<*p*> ^ (mid (f,((Index (p,f)) + 1),(len f))) if p <> f . ((Index (p,f)) + 1)
otherwise mid (f,((Index (p,f)) + 1),(len f));
correctness
coherence
( ( p <> f . ((Index (p,f)) + 1) implies <*p*> ^ (mid (f,((Index (p,f)) + 1),(len f))) is FinSequence of (TOP-REAL 2) ) & ( not p <> f . ((Index (p,f)) + 1) implies mid (f,((Index (p,f)) + 1),(len f)) is FinSequence of (TOP-REAL 2) ) )
;
consistency
for b1 being FinSequence of (TOP-REAL 2) holds verum
;
;
func R_Cut (f,p) -> FinSequence of (TOP-REAL 2) equals :Def5: :: JORDAN3:def 5
(mid (f,1,(Index (p,f)))) ^ <*p*> if p <> f . 1
otherwise <*p*>;
correctness
coherence
( ( p <> f . 1 implies (mid (f,1,(Index (p,f)))) ^ <*p*> is FinSequence of (TOP-REAL 2) ) & ( not p <> f . 1 implies <*p*> is FinSequence of (TOP-REAL 2) ) )
;
consistency
for b1 being FinSequence of (TOP-REAL 2) holds verum
;
;
end;

:: deftheorem Def4 defines L_Cut JORDAN3:def 4 :
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) holds
( ( p <> f . ((Index (p,f)) + 1) implies L_Cut (f,p) = <*p*> ^ (mid (f,((Index (p,f)) + 1),(len f))) ) & ( not p <> f . ((Index (p,f)) + 1) implies L_Cut (f,p) = mid (f,((Index (p,f)) + 1),(len f)) ) );

:: deftheorem Def5 defines R_Cut JORDAN3:def 5 :
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) holds
( ( p <> f . 1 implies R_Cut (f,p) = (mid (f,1,(Index (p,f)))) ^ <*p*> ) & ( not p <> f . 1 implies R_Cut (f,p) = <*p*> ) );

theorem Th53: :: JORDAN3:53
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st f is being_S-Seq & p in L~ f & p = f . ((Index (p,f)) + 1) & p <> f . (len f) holds
((Index (p,(Rev f))) + (Index (p,f))) + 1 = len f
proof end;

theorem Th54: :: JORDAN3:54
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st f is unfolded & f is s.n.c. & p in L~ f & p <> f . ((Index (p,f)) + 1) holds
(Index (p,(Rev f))) + (Index (p,f)) = len f
proof end;

theorem :: JORDAN3:55
canceled;

theorem :: JORDAN3:56
canceled;

theorem Th57: :: JORDAN3:57
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st f is being_S-Seq & p in L~ f holds
L_Cut ((Rev f),p) = Rev (R_Cut (f,p))
proof end;

theorem Th58: :: JORDAN3:58
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st p in L~ f holds
( (L_Cut (f,p)) . 1 = p & ( for i being Element of NAT st 1 < i & i <= len (L_Cut (f,p)) holds
( ( p = f . ((Index (p,f)) + 1) implies (L_Cut (f,p)) . i = f . ((Index (p,f)) + i) ) & ( p <> f . ((Index (p,f)) + 1) implies (L_Cut (f,p)) . i = f . (((Index (p,f)) + i) - 1) ) ) ) )
proof end;

theorem Th59: :: JORDAN3:59
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st p in L~ f holds
( (R_Cut (f,p)) . (len (R_Cut (f,p))) = p & ( for i being Element of NAT st 1 <= i & i <= Index (p,f) holds
(R_Cut (f,p)) . i = f . i ) )
proof end;

theorem :: JORDAN3:60
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st p in L~ f holds
( ( p <> f . 1 implies len (R_Cut (f,p)) = (Index (p,f)) + 1 ) & ( p = f . 1 implies len (R_Cut (f,p)) = Index (p,f) ) )
proof end;

theorem Th61: :: JORDAN3:61
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st p in L~ f holds
( ( p = f . ((Index (p,f)) + 1) implies len (L_Cut (f,p)) = (len f) - (Index (p,f)) ) & ( p <> f . ((Index (p,f)) + 1) implies len (L_Cut (f,p)) = ((len f) - (Index (p,f))) + 1 ) )
proof end;

definition
let p1, p2, q1, q2 be Point of (TOP-REAL 2);
pred LE q1,q2,p1,p2 means :Def6: :: JORDAN3:def 6
( q1 in LSeg (p1,p2) & q2 in LSeg (p1,p2) & ( for r1, r2 being Real st 0 <= r1 & r1 <= 1 & q1 = ((1 - r1) * p1) + (r1 * p2) & 0 <= r2 & r2 <= 1 & q2 = ((1 - r2) * p1) + (r2 * p2) holds
r1 <= r2 ) );
end;

:: deftheorem Def6 defines LE JORDAN3:def 6 :
for p1, p2, q1, q2 being Point of (TOP-REAL 2) holds
( LE q1,q2,p1,p2 iff ( q1 in LSeg (p1,p2) & q2 in LSeg (p1,p2) & ( for r1, r2 being Real st 0 <= r1 & r1 <= 1 & q1 = ((1 - r1) * p1) + (r1 * p2) & 0 <= r2 & r2 <= 1 & q2 = ((1 - r2) * p1) + (r2 * p2) holds
r1 <= r2 ) ) );

definition
let p1, p2, q1, q2 be Point of (TOP-REAL 2);
pred LT q1,q2,p1,p2 means :Def7: :: JORDAN3:def 7
( LE q1,q2,p1,p2 & q1 <> q2 );
end;

:: deftheorem Def7 defines LT JORDAN3:def 7 :
for p1, p2, q1, q2 being Point of (TOP-REAL 2) holds
( LT q1,q2,p1,p2 iff ( LE q1,q2,p1,p2 & q1 <> q2 ) );

theorem :: JORDAN3:62
for p1, p2, q1, q2 being Point of (TOP-REAL 2) st LE q1,q2,p1,p2 & LE q2,q1,p1,p2 holds
q1 = q2
proof end;

theorem Th63: :: JORDAN3:63
for p1, p2, q1, q2 being Point of (TOP-REAL 2) st q1 in LSeg (p1,p2) & q2 in LSeg (p1,p2) & p1 <> p2 holds
( ( LE q1,q2,p1,p2 or LT q2,q1,p1,p2 ) & ( not LE q1,q2,p1,p2 or not LT q2,q1,p1,p2 ) )
proof end;

theorem Th64: :: JORDAN3:64
for f being FinSequence of (TOP-REAL 2)
for p, q being Point of (TOP-REAL 2) st p in L~ f & q in L~ f & Index (p,f) < Index (q,f) holds
q in L~ (L_Cut (f,p))
proof end;

theorem Th65: :: JORDAN3:65
for p, q, p1, p2 being Point of (TOP-REAL 2) st LE p,q,p1,p2 holds
( q in LSeg (p,p2) & p in LSeg (p1,q) )
proof end;

theorem Th66: :: JORDAN3:66
for f being FinSequence of (TOP-REAL 2)
for p, q being Point of (TOP-REAL 2) st p in L~ f & q in L~ f & p <> q & Index (p,f) = Index (q,f) & LE p,q,f /. (Index (p,f)),f /. ((Index (p,f)) + 1) holds
q in L~ (L_Cut (f,p))
proof end;

begin

definition
let f be FinSequence of (TOP-REAL 2);
let p, q be Point of (TOP-REAL 2);
func B_Cut (f,p,q) -> FinSequence of (TOP-REAL 2) equals :Def8: :: JORDAN3:def 8
R_Cut ((L_Cut (f,p)),q) if ( ( 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) ) )
otherwise Rev (R_Cut ((L_Cut (f,q)),p));
correctness
coherence
( ( ( ( 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) ) ) implies R_Cut ((L_Cut (f,p)),q) is FinSequence of (TOP-REAL 2) ) & ( ( 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 Rev (R_Cut ((L_Cut (f,q)),p)) is FinSequence of (TOP-REAL 2) ) )
;
consistency
for b1 being FinSequence of (TOP-REAL 2) holds verum
;
;
end;

:: deftheorem Def8 defines B_Cut JORDAN3:def 8 :
for f being FinSequence of (TOP-REAL 2)
for p, q being Point of (TOP-REAL 2) holds
( ( ( ( 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) ) ) implies B_Cut (f,p,q) = R_Cut ((L_Cut (f,p)),q) ) & ( ( 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 B_Cut (f,p,q) = Rev (R_Cut ((L_Cut (f,q)),p)) ) );

theorem Th67: :: JORDAN3:67
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st f is being_S-Seq & p in L~ f & p <> f . 1 holds
R_Cut (f,p) is_S-Seq_joining f /. 1,p
proof end;

theorem Th68: :: JORDAN3:68
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st f is being_S-Seq & p in L~ f & p <> f . (len f) holds
L_Cut (f,p) is_S-Seq_joining p,f /. (len f)
proof end;

theorem Th69: :: JORDAN3:69
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st f is being_S-Seq & p in L~ f & p <> f . (len f) holds
L_Cut (f,p) is being_S-Seq
proof end;

theorem Th70: :: JORDAN3:70
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st f is being_S-Seq & p in L~ f & p <> f . 1 holds
R_Cut (f,p) is being_S-Seq
proof end;

Lm1: for f being FinSequence of (TOP-REAL 2)
for p, q being Point of (TOP-REAL 2) st f is being_S-Seq & p in L~ f & q in L~ f & p <> q & ( 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) ) ) holds
B_Cut (f,p,q) is_S-Seq_joining p,q
proof end;

theorem Th71: :: JORDAN3:71
for f being FinSequence of (TOP-REAL 2)
for p, q being Point of (TOP-REAL 2) st f is being_S-Seq & p in L~ f & q in L~ f & p <> q holds
B_Cut (f,p,q) is_S-Seq_joining p,q
proof end;

theorem :: JORDAN3:72
for f being FinSequence of (TOP-REAL 2)
for p, q being Point of (TOP-REAL 2) st f is being_S-Seq & p in L~ f & q in L~ f & p <> q holds
B_Cut (f,p,q) is being_S-Seq
proof end;

theorem Th73: :: JORDAN3:73
for f, g being FinSequence of (TOP-REAL 2) st f . (len f) = g . 1 & f is being_S-Seq & g is being_S-Seq & (L~ f) /\ (L~ g) = {(g . 1)} holds
f ^ (mid (g,2,(len g))) is being_S-Seq
proof end;

theorem Th74: :: JORDAN3:74
for f, g being FinSequence of (TOP-REAL 2) st f . (len f) = g . 1 & f is being_S-Seq & g is being_S-Seq & (L~ f) /\ (L~ g) = {(g . 1)} holds
f ^ (mid (g,2,(len g))) is_S-Seq_joining f /. 1,g /. (len g)
proof end;

theorem :: JORDAN3:75
for f being FinSequence of (TOP-REAL 2)
for n being Element of NAT holds L~ (f /^ n) c= L~ f
proof end;

theorem Th76: :: JORDAN3:76
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st p in L~ f holds
L~ (R_Cut (f,p)) c= L~ f
proof end;

Lm2: for i being Element of NAT
for D being non empty set holds (<*> D) | i = <*> D
proof end;

Lm3: for D being non empty set
for f1 being FinSequence of D
for k being Element of NAT st 1 <= k & k <= len f1 holds
( mid (f1,k,k) = <*(f1 /. k)*> & len (mid (f1,k,k)) = 1 )
proof end;

Lm4: for D being non empty set
for f1 being FinSequence of D holds mid (f1,0,0) = f1 | 1
proof end;

Lm5: for D being non empty set
for f1 being FinSequence of D
for k being Element of NAT st len f1 < k holds
mid (f1,k,k) = <*> D
proof end;

Lm6: for D being non empty set
for f1 being FinSequence of D
for i1, i2 being Element of NAT holds mid (f1,i1,i2) = Rev (mid (f1,i2,i1))
proof end;

Lm7: for h being FinSequence of (TOP-REAL 2)
for i1, i2 being Element of NAT st 1 <= i1 & i1 <= len h & 1 <= i2 & i2 <= len h holds
L~ (mid (h,i1,i2)) c= L~ h
proof end;

Lm8: for i, j being Element of NAT
for D being non empty set
for f being FinSequence of D st i in dom f & j in dom f holds
len (mid (f,i,j)) >= 1
proof end;

Lm9: for i, j being Element of NAT
for D being non empty set
for f being FinSequence of D st i in dom f & j in dom f holds
not mid (f,i,j) is empty
proof end;

Lm10: for i, j being Element of NAT
for D being non empty set
for f being FinSequence of D st i in dom f & j in dom f holds
(mid (f,i,j)) /. 1 = f /. i
proof end;

theorem Th77: :: JORDAN3:77
for f being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st p in L~ f holds
L~ (L_Cut (f,p)) c= L~ f
proof end;

theorem Th78: :: JORDAN3:78
for f, g being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st f . (len f) = g . 1 & p in L~ f & f is being_S-Seq & g is being_S-Seq & (L~ f) /\ (L~ g) = {(g . 1)} & p <> f . (len f) holds
(L_Cut (f,p)) ^ (mid (g,2,(len g))) is_S-Seq_joining p,g /. (len g)
proof end;

theorem :: JORDAN3:79
for f, g being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st f . (len f) = g . 1 & p in L~ f & f is being_S-Seq & g is being_S-Seq & (L~ f) /\ (L~ g) = {(g . 1)} & p <> f . (len f) holds
(L_Cut (f,p)) ^ (mid (g,2,(len g))) is being_S-Seq
proof end;

theorem Th80: :: JORDAN3:80
for f, g being FinSequence of (TOP-REAL 2) st f . (len f) = g . 1 & f is being_S-Seq & g is being_S-Seq & (L~ f) /\ (L~ g) = {(g . 1)} holds
(mid (f,1,((len f) -' 1))) ^ g is being_S-Seq
proof end;

theorem Th81: :: JORDAN3:81
for f, g being FinSequence of (TOP-REAL 2) st f . (len f) = g . 1 & f is being_S-Seq & g is being_S-Seq & (L~ f) /\ (L~ g) = {(g . 1)} holds
(mid (f,1,((len f) -' 1))) ^ g is_S-Seq_joining f /. 1,g /. (len g)
proof end;

theorem Th82: :: JORDAN3:82
for f, g being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st f . (len f) = g . 1 & p in L~ g & f is being_S-Seq & g is being_S-Seq & (L~ f) /\ (L~ g) = {(g . 1)} & p <> g . 1 holds
(mid (f,1,((len f) -' 1))) ^ (R_Cut (g,p)) is_S-Seq_joining f /. 1,p
proof end;

theorem :: JORDAN3:83
for f, g being FinSequence of (TOP-REAL 2)
for p being Point of (TOP-REAL 2) st f . (len f) = g . 1 & p in L~ g & f is being_S-Seq & g is being_S-Seq & (L~ f) /\ (L~ g) = {(g . 1)} & p <> g . 1 holds
(mid (f,1,((len f) -' 1))) ^ (R_Cut (g,p)) is being_S-Seq
proof end;