reserve X for non empty TopSpace,
  A,B for Subset of X;
reserve Y1,Y2 for non empty SubSpace of X;
reserve X1, X2 for non empty SubSpace of X;
reserve X for non empty TopSpace;
reserve X1, X2 for non empty SubSpace of X;
reserve X for non discrete non empty TopSpace;
reserve X for non almost_discrete non empty TopSpace;

theorem Th62:
  for A0 being non empty Subset of X st A0 is nowhere_dense ex X0
  being nowhere_dense strict non empty SubSpace of X st A0 = the carrier of X0
proof
  let A0 be non empty Subset of X;
  consider X0 being strict non empty SubSpace of X such that
A1: A0 = the carrier of X0 by TSEP_1:10;
  assume A0 is nowhere_dense;
  then reconsider Y0 = X0 as nowhere_dense strict non empty SubSpace of X by A1
,Th35;
  take Y0;
  thus thesis by A1;
end;
