reserve i for Nat,
  j for Element of NAT,
  X,Y,x,y,z for set;
reserve C for initialized ConstructorSignature,
  s for SortSymbol of C,
  o for OperSymbol of C,
  c for constructor OperSymbol of C;
reserve a,b for expression of C, an_Adj C;
reserve t, t1,t2 for expression of C, a_Type C;
reserve p for FinSequence of QuasiTerms C;
reserve e for expression of C;
reserve a,a9 for expression of C, an_Adj C;
reserve q for pure expression of C, a_Type C,
  A for finite Subset of QuasiAdjs C;
reserve T for quasi-type of C;

theorem
  Top VarPoset = {}
proof
  set V = the set of all varcl A where A is finite Subset of Vars;
A1: {} Vars in V by Th8;
A2: VarPoset opp is lower-bounded by YELLOW_7:31;
  (Bottom InclPoset V)~ = {} by A1,YELLOW_1:13;
  hence thesis by A2,YELLOW_7:33;
end;
