let n be Nat; :: thesis: for C being Simple_closed_curve
for i, j, k being Nat st 1 < j & j <= k & k < len (Gauge (C,n)) & 1 <= i & i <= width (Gauge (C,n)) & (LSeg (((Gauge (C,n)) * (j,i)),((Gauge (C,n)) * (k,i)))) /\ (L~ (Upper_Seq (C,n))) = {((Gauge (C,n)) * (k,i))} & (LSeg (((Gauge (C,n)) * (j,i)),((Gauge (C,n)) * (k,i)))) /\ (L~ (Lower_Seq (C,n))) = {((Gauge (C,n)) * (j,i))} holds
LSeg (((Gauge (C,n)) * (j,i)),((Gauge (C,n)) * (k,i))) meets Lower_Arc C
let C be Simple_closed_curve; :: thesis: for i, j, k being Nat st 1 < j & j <= k & k < len (Gauge (C,n)) & 1 <= i & i <= width (Gauge (C,n)) & (LSeg (((Gauge (C,n)) * (j,i)),((Gauge (C,n)) * (k,i)))) /\ (L~ (Upper_Seq (C,n))) = {((Gauge (C,n)) * (k,i))} & (LSeg (((Gauge (C,n)) * (j,i)),((Gauge (C,n)) * (k,i)))) /\ (L~ (Lower_Seq (C,n))) = {((Gauge (C,n)) * (j,i))} holds
LSeg (((Gauge (C,n)) * (j,i)),((Gauge (C,n)) * (k,i))) meets Lower_Arc C
let i, j, k be Nat; :: thesis: ( 1 < j & j <= k & k < len (Gauge (C,n)) & 1 <= i & i <= width (Gauge (C,n)) & (LSeg (((Gauge (C,n)) * (j,i)),((Gauge (C,n)) * (k,i)))) /\ (L~ (Upper_Seq (C,n))) = {((Gauge (C,n)) * (k,i))} & (LSeg (((Gauge (C,n)) * (j,i)),((Gauge (C,n)) * (k,i)))) /\ (L~ (Lower_Seq (C,n))) = {((Gauge (C,n)) * (j,i))} implies LSeg (((Gauge (C,n)) * (j,i)),((Gauge (C,n)) * (k,i))) meets Lower_Arc C )
set Ga = Gauge (C,n);
set US = Upper_Seq (C,n);
set LS = Lower_Seq (C,n);
set LA = Lower_Arc C;
set Wmin = W-min (L~ (Cage (C,n)));
set Emax = E-max (L~ (Cage (C,n)));
set Wbo = W-bound (L~ (Cage (C,n)));
set Ebo = E-bound (L~ (Cage (C,n)));
set Gij = (Gauge (C,n)) * (j,i);
set Gik = (Gauge (C,n)) * (k,i);
assume that
A1: 1 < j and
A2: j <= k and
A3: k < len (Gauge (C,n)) and
A4: 1 <= i and
A5: i <= width (Gauge (C,n)) and
A6: (LSeg (((Gauge (C,n)) * (j,i)),((Gauge (C,n)) * (k,i)))) /\ (L~ (Upper_Seq (C,n))) = {((Gauge (C,n)) * (k,i))} and
A7: (LSeg (((Gauge (C,n)) * (j,i)),((Gauge (C,n)) * (k,i)))) /\ (L~ (Lower_Seq (C,n))) = {((Gauge (C,n)) * (j,i))} and
A8: LSeg (((Gauge (C,n)) * (j,i)),((Gauge (C,n)) * (k,i))) misses Lower_Arc C ; :: thesis: contradiction
(Gauge (C,n)) * (j,i) in {((Gauge (C,n)) * (j,i))} by TARSKI:def 1;
then A9: (Gauge (C,n)) * (j,i) in L~ (Lower_Seq (C,n)) by A7, XBOOLE_0:def 4;
(Gauge (C,n)) * (k,i) in {((Gauge (C,n)) * (k,i))} by TARSKI:def 1;
then A10: (Gauge (C,n)) * (k,i) in L~ (Upper_Seq (C,n)) by A6, XBOOLE_0:def 4;
A11: len (Gauge (C,n)) = width (Gauge (C,n)) by JORDAN8:def 1;
A12: j <> k by A1, A3, A4, A5, A9, A10, Th27;
A13: j <= width (Gauge (C,n)) by A2, A3, A11, XXREAL_0:2;
A14: 1 <= k by A1, A2, XXREAL_0:2;
A15: k <= width (Gauge (C,n)) by A3, JORDAN8:def 1;
A16: [j,i] in Indices (Gauge (C,n)) by A1, A4, A5, A11, A13, MATRIX_0:30;
A17: [k,i] in Indices (Gauge (C,n)) by A3, A4, A5, A14, MATRIX_0:30;
set go = R_Cut ((Upper_Seq (C,n)),((Gauge (C,n)) * (k,i)));
set co = L_Cut ((Lower_Seq (C,n)),((Gauge (C,n)) * (j,i)));
A18: len (Upper_Seq (C,n)) >= 3 by JORDAN1E:15;
then len (Upper_Seq (C,n)) >= 1 by XXREAL_0:2;
then 1 in dom (Upper_Seq (C,n)) by FINSEQ_3:25;
then A19: (Upper_Seq (C,n)) . 1 = (Upper_Seq (C,n)) /. 1 by PARTFUN1:def 6
.= W-min (L~ (Cage (C,n))) by JORDAN1F:5 ;
A20: (W-min (L~ (Cage (C,n)))) `1 = W-bound (L~ (Cage (C,n))) by EUCLID:52
.= ((Gauge (C,n)) * (1,k)) `1 by A3, A14, JORDAN1A:73 ;
len (Gauge (C,n)) >= 4 by JORDAN8:10;
then A21: len (Gauge (C,n)) >= 1 by XXREAL_0:2;
then A22: [1,k] in Indices (Gauge (C,n)) by A14, A15, MATRIX_0:30;
then A23: (Gauge (C,n)) * (k,i) <> (Upper_Seq (C,n)) . 1 by A1, A2, A17, A19, A20, JORDAN1G:7;
then reconsider go = R_Cut ((Upper_Seq (C,n)),((Gauge (C,n)) * (k,i))) as being_S-Seq FinSequence of (TOP-REAL 2) by A10, JORDAN3:35;
A24: [1,j] in Indices (Gauge (C,n)) by A1, A13, A21, MATRIX_0:30;
A25: len (Lower_Seq (C,n)) >= 1 + 2 by JORDAN1E:15;
then A26: len (Lower_Seq (C,n)) >= 1 by XXREAL_0:2;
then A27: 1 in dom (Lower_Seq (C,n)) by FINSEQ_3:25;
len (Lower_Seq (C,n)) in dom (Lower_Seq (C,n)) by A26, FINSEQ_3:25;
then A28: (Lower_Seq (C,n)) . (len (Lower_Seq (C,n))) = (Lower_Seq (C,n)) /. (len (Lower_Seq (C,n))) by PARTFUN1:def 6
.= W-min (L~ (Cage (C,n))) by JORDAN1F:8 ;
A29: (W-min (L~ (Cage (C,n)))) `1 = W-bound (L~ (Cage (C,n))) by EUCLID:52
.= ((Gauge (C,n)) * (1,k)) `1 by A3, A14, JORDAN1A:73 ;
A30: [j,i] in Indices (Gauge (C,n)) by A1, A4, A5, A11, A13, MATRIX_0:30;
then A31: (Gauge (C,n)) * (j,i) <> (Lower_Seq (C,n)) . (len (Lower_Seq (C,n))) by A1, A22, A28, A29, JORDAN1G:7;
then reconsider co = L_Cut ((Lower_Seq (C,n)),((Gauge (C,n)) * (j,i))) as being_S-Seq FinSequence of (TOP-REAL 2) by A9, JORDAN3:34;
A32: [(len (Gauge (C,n))),k] in Indices (Gauge (C,n)) by A14, A15, A21, MATRIX_0:30;
A33: (Lower_Seq (C,n)) . 1 = (Lower_Seq (C,n)) /. 1 by A27, PARTFUN1:def 6
.= E-max (L~ (Cage (C,n))) by JORDAN1F:6 ;
(E-max (L~ (Cage (C,n)))) `1 = E-bound (L~ (Cage (C,n))) by EUCLID:52
.= ((Gauge (C,n)) * ((len (Gauge (C,n))),k)) `1 by A3, A14, JORDAN1A:71 ;
then A34: (Gauge (C,n)) * (j,i) <> (Lower_Seq (C,n)) . 1 by A2, A3, A30, A32, A33, JORDAN1G:7;
A35: len go >= 1 + 1 by TOPREAL1:def 8;
A36: (Gauge (C,n)) * (k,i) in rng (Upper_Seq (C,n)) by A4, A5, A10, A11, A14, A15, JORDAN1G:4, JORDAN1J:40;
then A37: go is_sequence_on Gauge (C,n) by JORDAN1G:4, JORDAN1J:38;
A38: len co >= 1 + 1 by TOPREAL1:def 8;
A39: (Gauge (C,n)) * (j,i) in rng (Lower_Seq (C,n)) by A1, A4, A5, A9, A11, A13, JORDAN1G:5, JORDAN1J:40;
then A40: co is_sequence_on Gauge (C,n) by JORDAN1G:5, JORDAN1J:39;
reconsider go = go as constant being_S-Seq s.c.c. FinSequence of (TOP-REAL 2) by A35, A37, JGRAPH_1:12, JORDAN8:5;
reconsider co = co as constant being_S-Seq s.c.c. FinSequence of (TOP-REAL 2) by A38, A40, JGRAPH_1:12, JORDAN8:5;
A41: len go > 1 by A35, NAT_1:13;
then A42: len go in dom go by FINSEQ_3:25;
then A43: go /. (len go) = go . (len go) by PARTFUN1:def 6
.= (Gauge (C,n)) * (k,i) by A10, JORDAN3:24 ;
len co >= 1 by A38, XXREAL_0:2;
then 1 in dom co by FINSEQ_3:25;
then A44: co /. 1 = co . 1 by PARTFUN1:def 6
.= (Gauge (C,n)) * (j,i) by A9, JORDAN3:23 ;
reconsider m = (len go) - 1 as Nat by A42, FINSEQ_3:26;
A45: m + 1 = len go ;
then A46: (len go) -' 1 = m by NAT_D:34;
A47: LSeg (go,m) c= L~ go by TOPREAL3:19;
A48: L~ go c= L~ (Upper_Seq (C,n)) by A10, JORDAN3:41;
then LSeg (go,m) c= L~ (Upper_Seq (C,n)) by A47;
then A49: (LSeg (go,m)) /\ (LSeg (((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i)))) c= {((Gauge (C,n)) * (k,i))} by A6, XBOOLE_1:26;
m >= 1 by A35, XREAL_1:19;
then A50: LSeg (go,m) = LSeg ((go /. m),((Gauge (C,n)) * (k,i))) by A43, A45, TOPREAL1:def 3;
{((Gauge (C,n)) * (k,i))} c= (LSeg (go,m)) /\ (LSeg (((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i)))) then A53: (LSeg (go,m)) /\ (LSeg (((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i)))) = {((Gauge (C,n)) * (k,i))} by A49;
A54: LSeg (co,1) c= L~ co by TOPREAL3:19;
A55: L~ co c= L~ (Lower_Seq (C,n)) by A9, JORDAN3:42;
then LSeg (co,1) c= L~ (Lower_Seq (C,n)) by A54;
then A56: (LSeg (co,1)) /\ (LSeg (((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i)))) c= {((Gauge (C,n)) * (j,i))} by A7, XBOOLE_1:26;
A57: LSeg (co,1) = LSeg (((Gauge (C,n)) * (j,i)),(co /. (1 + 1))) by A38, A44, TOPREAL1:def 3;
{((Gauge (C,n)) * (j,i))} c= (LSeg (co,1)) /\ (LSeg (((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i)))) then A60: (LSeg (((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i)))) /\ (LSeg (co,1)) = {((Gauge (C,n)) * (j,i))} by A56;
A61: go /. 1 = (Upper_Seq (C,n)) /. 1 by A10, SPRECT_3:22
.= W-min (L~ (Cage (C,n))) by JORDAN1F:5 ;
then A62: go /. 1 = (Lower_Seq (C,n)) /. (len (Lower_Seq (C,n))) by JORDAN1F:8
.= co /. (len co) by A9, JORDAN1J:35 ;
A63: rng go c= L~ go by A35, SPPOL_2:18;
A64: rng co c= L~ co by A38, SPPOL_2:18;
A65: {(go /. 1)} c= (L~ go) /\ (L~ co) A68: (Lower_Seq (C,n)) . 1 = (Lower_Seq (C,n)) /. 1 by A27, PARTFUN1:def 6
.= E-max (L~ (Cage (C,n))) by JORDAN1F:6 ;
A69: [(len (Gauge (C,n))),j] in Indices (Gauge (C,n)) by A1, A13, A21, MATRIX_0:30;
(L~ go) /\ (L~ co) c= {(go /. 1)} then A74: (L~ go) /\ (L~ co) = {(go /. 1)} by A65;
set W2 = go /. 2;
A75: 2 in dom go by A35, FINSEQ_3:25;
go = mid ((Upper_Seq (C,n)),1,(((Gauge (C,n)) * (k,i)) .. (Upper_Seq (C,n)))) by A36, JORDAN1G:49
.= (Upper_Seq (C,n)) | (((Gauge (C,n)) * (k,i)) .. (Upper_Seq (C,n))) by A36, FINSEQ_4:21, FINSEQ_6:116 ;
then A77: go /. 2 = (Upper_Seq (C,n)) /. 2 by A75, FINSEQ_4:70;
A78: W-min (L~ (Cage (C,n))) in rng go by A61, FINSEQ_6:42;
set pion = <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*>;
A80: (Gauge (C,n)) * (k,i) <> (Gauge (C,n)) * (j,i) by A12, A16, A17, GOBOARD1:5;
((Gauge (C,n)) * (k,i)) `2 = ((Gauge (C,n)) * (1,i)) `2 by A3, A4, A5, A14, GOBOARD5:1
.= ((Gauge (C,n)) * (j,i)) `2 by A1, A4, A5, A11, A13, GOBOARD5:1 ;
then LSeg (((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))) is horizontal by SPPOL_1:15;
then <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*> is being_S-Seq by A80, JORDAN1B:8;
then consider pion1 being FinSequence of (TOP-REAL 2) such that
A81: pion1 is_sequence_on Gauge (C,n) and
A82: pion1 is being_S-Seq and
A83: L~ <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*> = L~ pion1 and
A84: <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*> /. 1 = pion1 /. 1 and
A85: <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*> /. (len <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*>) = pion1 /. (len pion1) and
A86: len <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*> <= len pion1 by A79, GOBOARD3:2;
reconsider pion1 = pion1 as being_S-Seq FinSequence of (TOP-REAL 2) by A82;
set godo = (go ^' pion1) ^' co;
A87: 1 + 1 <= len (Cage (C,n)) by GOBOARD7:34, XXREAL_0:2;
A88: 1 + 1 <= len (Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))) by GOBOARD7:34, XXREAL_0:2;
len (go ^' pion1) >= len go by TOPREAL8:7;
then A89: len (go ^' pion1) >= 1 + 1 by A35, XXREAL_0:2;
then A90: len (go ^' pion1) > 1 + 0 by NAT_1:13;
A91: len ((go ^' pion1) ^' co) >= len (go ^' pion1) by TOPREAL8:7;
then A92: 1 + 1 <= len ((go ^' pion1) ^' co) by A89, XXREAL_0:2;
A93: Upper_Seq (C,n) is_sequence_on Gauge (C,n) by JORDAN1G:4;
A94: go /. (len go) = pion1 /. 1 by A43, A84, FINSEQ_4:17;
then A95: go ^' pion1 is_sequence_on Gauge (C,n) by A37, A81, TOPREAL8:12;
A96: (go ^' pion1) /. (len (go ^' pion1)) = <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*> /. (len <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*>) by A85, FINSEQ_6:156
.= <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*> /. 2 by FINSEQ_1:44
.= co /. 1 by A44, FINSEQ_4:17 ;
then A97: (go ^' pion1) ^' co is_sequence_on Gauge (C,n) by A40, A95, TOPREAL8:12;
LSeg (pion1,1) c= L~ <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*> by A83, TOPREAL3:19;
then LSeg (pion1,1) c= LSeg (((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))) by SPPOL_2:21;
then A98: (LSeg (go,((len go) -' 1))) /\ (LSeg (pion1,1)) c= {((Gauge (C,n)) * (k,i))} by A46, A53, XBOOLE_1:27;
A99: len pion1 >= 1 + 1 by A86, FINSEQ_1:44;
{((Gauge (C,n)) * (k,i))} c= (LSeg (go,m)) /\ (LSeg (pion1,1)) then (LSeg (go,((len go) -' 1))) /\ (LSeg (pion1,1)) = {(go /. (len go))} by A43, A46, A98;
then A102: go ^' pion1 is unfolded by A94, TOPREAL8:34;
len pion1 >= 2 + 0 by A86, FINSEQ_1:44;
then A103: (len pion1) - 2 >= 0 by XREAL_1:19;
((len (go ^' pion1)) + 1) - 1 = ((len go) + (len pion1)) - 1 by FINSEQ_6:139;
then (len (go ^' pion1)) - 1 = (len go) + ((len pion1) - 2)
.= (len go) + ((len pion1) -' 2) by A103, XREAL_0:def 2 ;
then A104: (len (go ^' pion1)) -' 1 = (len go) + ((len pion1) -' 2) by XREAL_0:def 2;
A105: (len pion1) - 1 >= 1 by A99, XREAL_1:19;
then A106: (len pion1) -' 1 = (len pion1) - 1 by XREAL_0:def 2;
A107: ((len pion1) -' 2) + 1 = ((len pion1) - 2) + 1 by A103, XREAL_0:def 2
.= (len pion1) -' 1 by A105, XREAL_0:def 2 ;
((len pion1) - 1) + 1 <= len pion1 ;
then A108: (len pion1) -' 1 < len pion1 by A106, NAT_1:13;
LSeg (pion1,((len pion1) -' 1)) c= L~ <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*> by A83, TOPREAL3:19;
then LSeg (pion1,((len pion1) -' 1)) c= LSeg (((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))) by SPPOL_2:21;
then A109: (LSeg (pion1,((len pion1) -' 1))) /\ (LSeg (co,1)) c= {((Gauge (C,n)) * (j,i))} by A60, XBOOLE_1:27;
{((Gauge (C,n)) * (j,i))} c= (LSeg (pion1,((len pion1) -' 1))) /\ (LSeg (co,1)) then (LSeg (pion1,((len pion1) -' 1))) /\ (LSeg (co,1)) = {((Gauge (C,n)) * (j,i))} by A109;
then A112: (LSeg ((go ^' pion1),((len go) + ((len pion1) -' 2)))) /\ (LSeg (co,1)) = {((go ^' pion1) /. (len (go ^' pion1)))} by A44, A94, A96, A107, A108, TOPREAL8:31;
A113: not go ^' pion1 is trivial by A89, NAT_D:60;
A114: rng pion1 c= L~ pion1 by A99, SPPOL_2:18;
A115: {(pion1 /. 1)} c= (L~ go) /\ (L~ pion1) (L~ go) /\ (L~ pion1) c= {(pion1 /. 1)} then A120: (L~ go) /\ (L~ pion1) = {(pion1 /. 1)} by A115;
then A121: go ^' pion1 is s.n.c. by A94, JORDAN1J:54;
(rng go) /\ (rng pion1) c= {(pion1 /. 1)} by A63, A114, A120, XBOOLE_1:27;
then A122: go ^' pion1 is one-to-one by JORDAN1J:55;
A123: <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*> /. (len <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*>) = <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*> /. 2 by FINSEQ_1:44
.= co /. 1 by A44, FINSEQ_4:17 ;
A124: {(pion1 /. (len pion1))} c= (L~ co) /\ (L~ pion1) (L~ co) /\ (L~ pion1) c= {(pion1 /. (len pion1))} then A129: (L~ co) /\ (L~ pion1) = {(pion1 /. (len pion1))} by A124;
A130: (L~ (go ^' pion1)) /\ (L~ co) = ((L~ go) \/ (L~ pion1)) /\ (L~ co) by A94, TOPREAL8:35
.= {(go /. 1)} \/ {(co /. 1)} by A74, A85, A123, A129, XBOOLE_1:23
.= {((go ^' pion1) /. 1)} \/ {(co /. 1)} by FINSEQ_6:155
.= {((go ^' pion1) /. 1),(co /. 1)} by ENUMSET1:1 ;
co /. (len co) = (go ^' pion1) /. 1 by A62, FINSEQ_6:155;
then reconsider godo = (go ^' pion1) ^' co as constant standard special_circular_sequence by A92, A96, A97, A102, A104, A112, A113, A121, A122, A130, JORDAN8:4, JORDAN8:5, TOPREAL8:11, TOPREAL8:33, TOPREAL8:34;
A131: Lower_Arc C is_an_arc_of E-max C, W-min C by JORDAN6:def 9;
then A132: Lower_Arc C is connected by JORDAN6:10;
A133: W-min C in Lower_Arc C by A131, TOPREAL1:1;
A134: E-max C in Lower_Arc C by A131, TOPREAL1:1;
set ff = Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))));
W-min (L~ (Cage (C,n))) in rng (Cage (C,n)) by SPRECT_2:43;
then A135: (Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))) /. 1 = W-min (L~ (Cage (C,n))) by FINSEQ_6:92;
A136: L~ (Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))) = L~ (Cage (C,n)) by REVROT_1:33;
then (W-max (L~ (Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))))) .. (Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))) > 1 by A135, SPRECT_5:22;
then (N-min (L~ (Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))))) .. (Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))) > 1 by A135, A136, SPRECT_5:23, XXREAL_0:2;
then (N-max (L~ (Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))))) .. (Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))) > 1 by A135, A136, SPRECT_5:24, XXREAL_0:2;
then A137: (E-max (L~ (Cage (C,n)))) .. (Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))) > 1 by A135, A136, SPRECT_5:25, XXREAL_0:2;
A140: Cage (C,n) is_sequence_on Gauge (C,n) by JORDAN9:def 1;
then A141: Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n))))) is_sequence_on Gauge (C,n) by REVROT_1:34;
A142: (right_cell (godo,1,(Gauge (C,n)))) \ (L~ godo) c= RightComp godo by A92, A97, JORDAN9:27;
A143: L~ godo = (L~ (go ^' pion1)) \/ (L~ co) by A96, TOPREAL8:35
.= ((L~ go) \/ (L~ pion1)) \/ (L~ co) by A94, TOPREAL8:35 ;
A144: L~ (Cage (C,n)) = (L~ (Upper_Seq (C,n))) \/ (L~ (Lower_Seq (C,n))) by JORDAN1E:13;
then A145: L~ (Upper_Seq (C,n)) c= L~ (Cage (C,n)) by XBOOLE_1:7;
A146: L~ (Lower_Seq (C,n)) c= L~ (Cage (C,n)) by A144, XBOOLE_1:7;
A147: L~ go c= L~ (Cage (C,n)) by A48, A145;
A148: L~ co c= L~ (Cage (C,n)) by A55, A146;
A149: W-min C in C by SPRECT_1:13;
A150: L~ <*((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))*> = LSeg (((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i))) by SPPOL_2:21;
right_cell ((Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))),1) = right_cell ((Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))),1,(GoB (Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))))) by A88, JORDAN1H:23
.= right_cell ((Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))),1,(GoB (Cage (C,n)))) by REVROT_1:28
.= right_cell ((Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))),1,(Gauge (C,n))) by JORDAN1H:44
.= right_cell (((Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))) -: (E-max (L~ (Cage (C,n))))),1,(Gauge (C,n))) by A137, A141, JORDAN1J:53
.= right_cell ((Upper_Seq (C,n)),1,(Gauge (C,n))) by JORDAN1E:def 1
.= right_cell ((R_Cut ((Upper_Seq (C,n)),((Gauge (C,n)) * (k,i)))),1,(Gauge (C,n))) by A36, A93, A138, JORDAN1J:52
.= right_cell ((go ^' pion1),1,(Gauge (C,n))) by A41, A95, JORDAN1J:51
.= right_cell (godo,1,(Gauge (C,n))) by A90, A97, JORDAN1J:51 ;
then W-min C in right_cell (godo,1,(Gauge (C,n))) by JORDAN1I:6;
then A153: W-min C in (right_cell (godo,1,(Gauge (C,n)))) \ (L~ godo) by A151, XBOOLE_0:def 5;
A154: godo /. 1 = (go ^' pion1) /. 1 by FINSEQ_6:155
.= W-min (L~ (Cage (C,n))) by A61, FINSEQ_6:155 ;
A155: len (Upper_Seq (C,n)) >= 2 by A18, XXREAL_0:2;
A156: godo /. 2 = (go ^' pion1) /. 2 by A89, FINSEQ_6:159
.= (Upper_Seq (C,n)) /. 2 by A35, A77, FINSEQ_6:159
.= ((Upper_Seq (C,n)) ^' (Lower_Seq (C,n))) /. 2 by A155, FINSEQ_6:159
.= (Rotate ((Cage (C,n)),(W-min (L~ (Cage (C,n)))))) /. 2 by JORDAN1E:11 ;
A157: (L~ go) \/ (L~ co) is compact by COMPTS_1:10;
W-min (L~ (Cage (C,n))) in (L~ go) \/ (L~ co) by A63, A78, XBOOLE_0:def 3;
then A158: W-min ((L~ go) \/ (L~ co)) = W-min (L~ (Cage (C,n))) by A147, A148, A157, JORDAN1J:21, XBOOLE_1:8;
A159: (W-min ((L~ go) \/ (L~ co))) `1 = W-bound ((L~ go) \/ (L~ co)) by EUCLID:52;
A160: (W-min (L~ (Cage (C,n)))) `1 = W-bound (L~ (Cage (C,n))) by EUCLID:52;
A161: ((Gauge (C,n)) * (j,i)) `1 <= ((Gauge (C,n)) * (k,i)) `1 by A1, A2, A3, A4, A5, SPRECT_3:13;
then W-bound (LSeg (((Gauge (C,n)) * (k,i)),((Gauge (C,n)) * (j,i)))) = ((Gauge (C,n)) * (j,i)) `1 by SPRECT_1:54;
then A162: W-bound (L~ pion1) = ((Gauge (C,n)) * (j,i)) `1 by A83, SPPOL_2:21;
((Gauge (C,n)) * (j,i)) `1 >= W-bound (L~ (Cage (C,n))) by A9, A146, PSCOMP_1:24;
then ((Gauge (C,n)) * (j,i)) `1 > W-bound (L~ (Cage (C,n))) by A76, XXREAL_0:1;
then W-min (((L~ go) \/ (L~ co)) \/ (L~ pion1)) = W-min ((L~ go) \/ (L~ co)) by A157, A158, A159, A160, A162, JORDAN1J:33;
then A163: W-min (L~ godo) = W-min (L~ (Cage (C,n))) by A143, A158, XBOOLE_1:4;
A164: rng godo c= L~ godo by A89, A91, SPPOL_2:18, XXREAL_0:2;
2 in dom godo by A92, FINSEQ_3:25;
then A165: godo /. 2 in rng godo by PARTFUN2:2;
godo /. 2 in W-most (L~ (Cage (C,n))) by A156, JORDAN1I:25;
then (godo /. 2) `1 = (W-min (L~ godo)) `1 by A163, PSCOMP_1:31
.= W-bound (L~ godo) by EUCLID:52 ;
then godo /. 2 in W-most (L~ godo) by A164, A165, SPRECT_2:12;
then (Rotate (godo,(W-min (L~ godo)))) /. 2 in W-most (L~ godo) by A154, A163, FINSEQ_6:89;
then reconsider godo = godo as constant standard clockwise_oriented special_circular_sequence by JORDAN1I:25;
len (Upper_Seq (C,n)) in dom (Upper_Seq (C,n)) by FINSEQ_5:6;
then A166: (Upper_Seq (C,n)) . (len (Upper_Seq (C,n))) = (Upper_Seq (C,n)) /. (len (Upper_Seq (C,n))) by PARTFUN1:def 6
.= E-max (L~ (Cage (C,n))) by JORDAN1F:7 ;
A167: east_halfline (E-max C) misses L~ go then east_halfline (E-max C) c= (L~ godo) ` by SUBSET_1:23;
then consider W being Subset of (TOP-REAL 2) such that
A240: W is_a_component_of (L~ godo) ` and
A241: east_halfline (E-max C) c= W by GOBOARD9:3;
not W is bounded by A241, JORDAN2C:121, RLTOPSP1:42;
then W is_outside_component_of L~ godo by A240, JORDAN2C:def 3;
then W c= UBD (L~ godo) by JORDAN2C:23;
then A242: east_halfline (E-max C) c= UBD (L~ godo) by A241;
E-max C in east_halfline (E-max C) by TOPREAL1:38;
then E-max C in UBD (L~ godo) by A242;
then E-max C in LeftComp godo by GOBRD14:36;
then Lower_Arc C meets L~ godo by A132, A133, A134, A142, A153, JORDAN1J:36;
then A243: ( Lower_Arc C meets (L~ go) \/ (L~ pion1) or Lower_Arc C meets L~ co ) by A143, XBOOLE_1:70;
A244: Lower_Arc C c= C by JORDAN6:61;