The compactificability classes of certain spaces (Q2644155)

Summary: We apply the theory of the mutual compactificability to some spaces, mostly derived from the real line. For example, any noncompact locally connected metrizable generalized continuum, the Tichonov cube without its zero point \(\mathbb D^{\aleph _{0}}\setminus \{0\}\), as well as the Cantor discontinuum without its zero point \(\mathbb D^{\aleph _{0}}\setminus \{0\}\) are of the same class of mutual compactificability as \(\mathbb R\).