theorem Th37:
  BDD L~g = RightComp g
proof
A1: (BDD L~g) misses (UBD L~g) by JORDAN2C:24;
A2: (L~g)` = (BDD L~g) \/ (UBD L~g) & LeftComp g misses RightComp g by Th14,
JORDAN2C:27;
  UBD L~g = LeftComp g & (L~g)` = LeftComp g \/ RightComp g by Th36,GOBRD12:10;
  hence thesis by A2,A1,XBOOLE_1:71;
end;
