@article{oai:ynu.repo.nii.ac.jp:00006849,
 author = {Terada, Toshiji},
 issue = {2},
 journal = {Yokohama Mathematical Journal = 横濱市立大學紀要. D部門, 数学},
 month = {},
 note = {application/pdf, A zero-dimensional topological space is called h-homogeneous if all nonempty clopen subspaces are homeomorphic. The Cantor discontinuum, the space of rational numbers and the space of irrational numbers are h-homo-geneous. We show the following: (1) If a non-pseudocompact zero-dimensional space ＄Y＄ has a dense set of isolated points, then the Product space ＄Y^{￥iota}＄ is h-homogeneous for any infinite cardinal ＄￥kappa＄ . (2) If ＄X＄ is a strongly zero-dimensional h-homogeneous space of countable type, then ＄￥beta X-X＄ is h-homogeneous.},
 pages = {87--93},
 title = {SPACES WHOSE ALL NONEMPTY CLOPEN SUBSPACES ARE HOMEOMORPHIC},
 volume = {40},
 year = {1993}
}