let z be constant standard clockwise_oriented special_circular_sequence; :: thesis: ( z /. 1 = N-min (L~ z) & N-max (L~ z) <> E-max (L~ z) implies (N-max (L~ z)) .. z < (E-max (L~ z)) .. z )
set i1 = (N-max (L~ z)) .. z;
set i2 = (E-max (L~ z)) .. z;
set j = (S-max (L~ z)) .. z;
assume that
A1: z /. 1 = N-min (L~ z) and
A2: ( N-max (L~ z) <> E-max (L~ z) & (N-max (L~ z)) .. z >= (E-max (L~ z)) .. z ) ; :: thesis: contradiction
(N-min (L~ z)) .. z = 1 by A1, FINSEQ_6:43;
then A3: 1 < (E-max (L~ z)) .. z by A1, Lm4;
( (N-min (L~ z)) `2 = N-bound (L~ z) & (S-max (L~ z)) `2 = S-bound (L~ z) ) by EUCLID:52;
then A4: N-min (L~ z) <> S-max (L~ z) by TOPREAL5:16;
A5: S-max (L~ z) in rng z by Th42;
then A6: (S-max (L~ z)) .. z in dom z by FINSEQ_4:20;
then A7: z /. ((S-max (L~ z)) .. z) = z . ((S-max (L~ z)) .. z) by PARTFUN1:def 6
.= S-max (L~ z) by A5, FINSEQ_4:19 ;
A8: (S-max (L~ z)) .. z <= len z by A6, FINSEQ_3:25;
z /. (len z) = z /. 1 by FINSEQ_6:def 1;
then A9: (S-max (L~ z)) .. z < len z by A1, A8, A7, A4, XXREAL_0:1;
A10: N-max (L~ z) in rng z by Th40;
then A11: (N-max (L~ z)) .. z in dom z by FINSEQ_4:20;
then A12: 1 <= (N-max (L~ z)) .. z by FINSEQ_3:25;
A13: z /. ((N-max (L~ z)) .. z) = z . ((N-max (L~ z)) .. z) by A11, PARTFUN1:def 6
.= N-max (L~ z) by A10, FINSEQ_4:19 ;
A14: (S-max (L~ z)) .. z > (N-max (L~ z)) .. z by A1, Lm5;
then reconsider h = mid (z,((S-max (L~ z)) .. z),((N-max (L~ z)) .. z)) as S-Sequence_in_R2 by A12, A9, Th37;
h /. 1 = S-max (L~ z) by A11, A6, A7, Th8;
then A15: (h /. 1) `2 = S-bound (L~ z) by EUCLID:52;
h /. (len h) = z /. ((N-max (L~ z)) .. z) by A11, A6, Th9;
then A16: (h /. (len h)) `2 = N-bound (L~ z) by A13, EUCLID:52;
h is_in_the_area_of z by A11, A6, Th21, Th22;
then A17: h is_a_v.c._for z by A15, A16;
A18: 1 <= (S-max (L~ z)) .. z by A6, FINSEQ_3:25;
A19: (N-max (L~ z)) .. z <= len z by A11, FINSEQ_3:25;
A20: E-max (L~ z) in rng z by Th46;
then A21: (E-max (L~ z)) .. z in dom z by FINSEQ_4:20;
then A22: ( 1 <= (E-max (L~ z)) .. z & (E-max (L~ z)) .. z <= len z ) by FINSEQ_3:25;
z /. ((E-max (L~ z)) .. z) = z . ((E-max (L~ z)) .. z) by A21, PARTFUN1:def 6
.= E-max (L~ z) by A20, FINSEQ_4:19 ;
then A23: (N-max (L~ z)) .. z > (E-max (L~ z)) .. z by A2, A13, XXREAL_0:1;
then (E-max (L~ z)) .. z < len z by A19, XXREAL_0:2;
then reconsider M = mid (z,1,((E-max (L~ z)) .. z)) as S-Sequence_in_R2 by A3, Th38;
A24: len M >= 2 by TOPREAL1:def 8;
A25: 1 in dom z by FINSEQ_5:6;
then A26: M /. (len M) = z /. ((E-max (L~ z)) .. z) by A21, Th9
.= E-max (L~ z) by A20, FINSEQ_5:38 ;
A27: ( len h >= 2 & L~ M misses L~ h ) by A14, A9, A3, A23, Th48, TOPREAL1:def 8;
per cases ( NW-corner (L~ z) = N-min (L~ z) or NW-corner (L~ z) <> N-min (L~ z) ) ;
suppose A28: NW-corner (L~ z) = N-min (L~ z) ; :: thesis: contradiction
M /. 1 = z /. 1 by A25, A21, Th8;
then A29: (M /. 1) `1 = W-bound (L~ z) by A1, A28, EUCLID:52;
( M is_in_the_area_of z & (M /. (len M)) `1 = E-bound (L~ z) ) by A25, A21, A26, Th21, Th22, EUCLID:52;
then M is_a_h.c._for z by A29;
hence contradiction by A17, A24, A27, Th29; :: thesis: verum
end;
suppose NW-corner (L~ z) <> N-min (L~ z) ; :: thesis: contradiction
then reconsider g = <*(NW-corner (L~ z))*> ^ M as S-Sequence_in_R2 by A1, A25, A21, Th66;
A30: ( len g >= 2 & L~ g = (L~ M) \/ (LSeg ((NW-corner (L~ z)),(M /. 1))) ) by SPPOL_2:20, TOPREAL1:def 8;
g /. 1 = NW-corner (L~ z) by FINSEQ_5:15;
then A31: (g /. 1) `1 = W-bound (L~ z) by EUCLID:52;
len M = (((E-max (L~ z)) .. z) -' 1) + 1 by A22, FINSEQ_6:186
.= (E-max (L~ z)) .. z by A3, XREAL_1:235 ;
then len M >= 1 + 1 by A3, NAT_1:13;
then A32: M /. 1 in L~ M by JORDAN3:1;
( len M in dom M & len g = (len M) + (len <*(NW-corner (L~ z))*>) ) by FINSEQ_1:22, FINSEQ_5:6;
then g /. (len g) = M /. (len M) by FINSEQ_4:69
.= z /. ((E-max (L~ z)) .. z) by A25, A21, Th9
.= E-max (L~ z) by A20, FINSEQ_5:38 ;
then A33: (g /. (len g)) `1 = E-bound (L~ z) by EUCLID:52;
( M /. 1 = z /. 1 & (LSeg ((M /. 1),(NW-corner (L~ z)))) /\ (L~ h) c= (LSeg ((M /. 1),(NW-corner (L~ z)))) /\ (L~ z) ) by A25, A12, A19, A18, A8, A21, Th8, JORDAN4:35, XBOOLE_1:26;
then A34: (LSeg ((M /. 1),(NW-corner (L~ z)))) /\ (L~ h) c= {(M /. 1)} by A1, PSCOMP_1:43;
( M is_in_the_area_of z & <*(NW-corner (L~ z))*> is_in_the_area_of z ) by A25, A21, Th21, Th22, Th26;
then g is_in_the_area_of z by Th24;
then g is_a_h.c._for z by A31, A33;
hence contradiction by A17, A27, A30, A34, A32, Th29, ZFMISC_1:125; :: thesis: verum
end;
end;