theorem
  a is_superior_of the InternalRel of A iff for b st a <> b holds b < a
proof
A1: the carrier of A = field(the InternalRel of A) by ORDERS_1:15;
  thus a is_superior_of the InternalRel of A implies for b st a <> b holds b <
  a
  proof
    assume
A2: a is_superior_of the InternalRel of A;
    let b;
    assume
A3: a <> b;
    then [b,a] in the InternalRel of A by A1,A2;
    then b <= a;
    hence thesis by A3;
  end;
  assume
A4: for b st a <> b holds b < a;
  thus a in field(the InternalRel of A) by A1;
  let y;
  assume y in field(the InternalRel of A);
  then reconsider b = y as Element of A by ORDERS_1:15;
  assume y <> a;
  then b < a by A4;
  then b <= a;
  hence thesis;
end;
