reserve T,T1,T2,S for non empty TopSpace;
reserve p,q for Point of TOP-REAL 2;

theorem
  {p7 where p7 is Point of TOP-REAL 2: -p7`1<=p7`2 } is closed Subset of
  TOP-REAL 2 & {p7 where p7 is Point of TOP-REAL 2: p7`2<=-p7`1 } is closed
  Subset of TOP-REAL 2 by Lm11,Lm14;
