let z be non constant standard clockwise_oriented special_circular_sequence; :: thesis: ( z /. 1 = E-max (L~ z) & N-max (L~ z) <> E-max (L~ z) implies (N-min (L~ z)) .. z < (N-max (L~ z)) .. z )
set g = Rotate z,(S-max (L~ z));
A1: L~ z = L~ (Rotate z,(S-max (L~ z))) by REVROT_1:33;
assume A2: z /. 1 = E-max (L~ z) ; :: thesis: ( not N-max (L~ z) <> E-max (L~ z) or (N-min (L~ z)) .. z < (N-max (L~ z)) .. z )
for i being Element of NAT st 1 < i & i < len z holds
z /. i <> z /. 1 by GOBOARD7:38;
then A3: Rotate (Rotate z,(S-max (L~ z))),(E-max (L~ z)) = z by A2, REVROT_1:16;
A4: ( N-max (L~ (Rotate z,(S-max (L~ z)))) in rng (Rotate z,(S-max (L~ z))) & N-min (L~ (Rotate z,(S-max (L~ z)))) in rng (Rotate z,(S-max (L~ z))) ) by SPRECT_2:43, SPRECT_2:44;
S-max (L~ z) in rng z by SPRECT_2:46;
then A5: (Rotate z,(S-max (L~ z))) /. 1 = S-max (L~ (Rotate z,(S-max (L~ z)))) by A1, FINSEQ_6:98;
then A6: ( E-max (L~ (Rotate z,(S-max (L~ z)))) in rng (Rotate z,(S-max (L~ z))) & (N-min (L~ (Rotate z,(S-max (L~ z))))) .. (Rotate z,(S-max (L~ z))) < (N-max (L~ (Rotate z,(S-max (L~ z))))) .. (Rotate z,(S-max (L~ z))) ) by Th35, SPRECT_2:50;
assume N-max (L~ z) <> E-max (L~ z) ; :: thesis: (N-min (L~ z)) .. z < (N-max (L~ z)) .. z
then (N-max (L~ (Rotate z,(S-max (L~ z))))) .. (Rotate z,(S-max (L~ z))) < (E-max (L~ (Rotate z,(S-max (L~ z))))) .. (Rotate z,(S-max (L~ z))) by A1, A5, Th36;
hence (N-min (L~ z)) .. z < (N-max (L~ z)) .. z by A1, A3, A4, A6, Th12; :: thesis: verum