let x be Surreal; :: thesis:
assume A1: ( not L_ x is empty & L_ x is finite & x is uSurreal ) ; :: thesis:
then consider Min, Max being Surreal such that
A2: ( Min in L_ x & Max in L_ x ) and
A3: for y being Surreal st y in L_ x holds
( Min <= y & y <= Max ) by Th12;
reconsider c = card (L_ x) as Nat by A1;
assume A4: card (L_ x) <> 1 ; :: thesis:
set B = born_eq x;
x = Unique_No x by Def11, A1;
then A5: x in (unique_No_op (born_eq x)) . (born_eq x) by Def10;
A6: born_eq x in succ (born_eq x) by ORDINAL1:6;
A7: born_eq x = born x by A5, Th38;
then not x in union (rng ((unique_No_op (born_eq x)) | (born_eq x))) by A5, Th38;
then consider Y being non empty surreal-membered set such that
A8: ( Y = (born_eq_set x) /\ (made_of (union (rng ((unique_No_op (born_eq x)) | (born_eq x))))) & x = the Y -smallest Surreal ) by A5, A6, Def9;
A9: for y being Surreal st y in L_ x holds
y <= Max by A3;
then reconsider Mx = [{Max},(R_ x)] as Surreal by A2, Th23;
A10: ( Mx == x & born Mx c= born x ) by A9, A2, Th23;
x in Y by A8, Def7;
then x in made_of (union (rng ((unique_No_op (born_eq x)) | (born_eq x)))) by A8, XBOOLE_0:def 4;
then A11: (L_ x) \/ (R_ x) c= union (rng ((unique_No_op (born_eq x)) | (born_eq x))) by Def8;
(L_ Mx) \/ (R_ Mx) c= (L_ x) \/ (R_ x) by XBOOLE_1:9, A2, ZFMISC_1:31;
then (L_ Mx) \/ (R_ Mx) c= union (rng ((unique_No_op (born_eq x)) | (born_eq x))) by A11, XBOOLE_1:1;
then A12: Mx in made_of (union (rng ((unique_No_op (born_eq x)) | (born_eq x)))) by Def8;
( Mx in Day (born Mx) & Day (born Mx) c= Day (born x) ) by A9, A2, Th23, SURREAL0:def 18, SURREAL0:35;
then Mx in born_eq_set x by A7, A10, Def6;
then Mx in Y by A8, A12, XBOOLE_0:def 4;
then A13: (card (L_ x)) (+) (card (R_ x)) c= (card (L_ Mx)) (+) (card (R_ Mx)) by A10, A8, Def7;
A14: card (L_ Mx) = 1 by CARD_1:30;
1 in Segm c by A4, A1, NAT_1:25, NAT_1:44;
then (card (L_ Mx)) (+) (card (R_ Mx)) in (card (L_ x)) (+) (card (R_ x)) by A14, ORDINAL7:94;
hence contradiction by A13, ORDINAL1:12; :: thesis: