For a compact monotonically normal space X we prove: (1) X has a dense set of points with a well-ordered neighborhood base (and so X is co-absolute with a compact orderable space); (2) each point ofâ€¦ (More)

It will be convenient to call a space X a ParoviZenko space if (cy) X is a zero-dimensional compact space without isolated points, (p) every two disjoint open F,-sets have disjoint closures, and (y)â€¦ (More)

We present here work which is, in part, expository with proofs, exercises (2.4, 2.6, 4.3, and 7.6), and, in part, contains new results (3.1, 5.4, amd 7.7) so we ought to begin with some background:â€¦ (More)