On \(d\)-homogeneous spaces and squares (Q2844630)

The author introduces a new notion of \( d \)-homogeneous space, dealing with Hausdorff topological spaces. Then every separable metrizable space \( X \) without isolated points is \( d \)-homogeneous. If a regular \( d \)-homogeneous space \( X \) is first countable at some point, then it turns out that \( X \) is first countable at every point. Reminding the definition of extremally disconnected space the author shows that if a \( d \)-homogeneous space \( X \) has a dense extremally disconnected subspace, then \( X \) is extremally disconnected. Under the assumption that \( X \times X \) is extremally disconnected at \( (a,a) \) the following basic statement is proved: Then the point \( a \) is isolated in \( X \).