Institute of Education

MIYAZAKI KAZUMI

  (宮嵜 和美)

Profile Information

Affiliation
Professor, Institute of Education, Center of Advanced Education, Osaka Sangyo University
Degree
Doctor (Science)(Ehime University)
博士(理学)(愛媛大学)
Master (Education)(Osaka Kyoiku University)
修士(教育学)(大阪教育大学)

J-GLOBAL ID
200901057101001636
researchmap Member ID
6000010825

Papers

 13
  • Dikran Dikranjan, Kazumi Miyazaki, Tsugunori Nogura, Takamitsu Yamauchi
    TOPOLOGY AND ITS APPLICATIONS, 230 490-505, Oct, 2017  Peer-reviewed
    We study properties of the pseudocompact spaces X with a weak selection, and we dedicate a particular attention to the weak selection topologies on X. In case when X is also locally compact, we obtain a convenient decomposition of X into a finite union of clopen sets, which are either almost compact or connected with a remainder of size two in their Stone-Cech compactification. (C) 2017 Elsevier B.V. All rights reserved.
  • S. Garc, a-Ferreira, K. Miyazaki, T. Nogura, A. H. Tomita
    HOUSTON JOURNAL OF MATHEMATICS, vol 39(No.4) 1385-1399, Dec, 2013  Peer-reviewed
    A weak selection on an infinite set X is a function f : [X]2 → X such that f({x,y}) ∈ {x,y} for each {x,y} ∈ [X]2. A weak selection f on X defines a relation x f y if f({x,y}) = x whenever x,y ∈ X are distinct. The topology τf on X generated by the weak selection f is the one which has the family of all intervals (←x)f = {y ∈ X : y f x} and (x →)f = {y ∈ X : x f y} as a subbase. A weak selection on a space is said to be continuous if it is a continuous function with respect to the Vietoris topology on [X]2. The paper deals with topological spaces (X,τ) for which there is a set W of continuous weak selections satisfying τ = Vf∈W τf (we say that the topology of X is generated by continuous weak selections). We prove that for any infinite cardinal α, there exists a weakly orderable space whose topology cannot be generated by less than or equal to α-many continuous weak selections. We prove that any subspace of a space generated by continuous weak selections is also generated by continuous weak selections. Assuming that c is regular, we construct a suborderable space whose topology is generated by c-many continuous weak selections but not by less than c. Also, under the assumption of GCH, for every infinite successor cardinal α+ we construct a space X that is generated by α+-many continuous weak selections but cannot be generated by α-many selections. © 2013 University of Houston.
  • S. García-Ferreira, K. Miyazaki, T. Nogura
    Topology and its Applications, 160(18) 2465-2472, Dec 1, 2013  Peer-reviewed
    A weak selection on an infinite set X is a function σ:[X]2→X such that σ({x, y})∈{x, y} for each {x, y}∈[X]2. A weak selection on a space is said to be continuous if it is a continuous function with respect to the Vietoris topology on [X]2 and the topology on X. We study some topological consequences from the existence of a continuous weak selection on the product X×Y for the following particular cases:(i)Both X and Y are spaces with one non-isolated point.(ii)X is a space with one non-isolated point and Y is an ordinal space. As applications of the results obtained for these cases, we have that if X is the continuous closed image of suborderable space, Y is not discrete and has countable tightness, and X×Y admits a continuous weak selection, then X is hereditary paracompact. Also, if X is a space, Y is not-discrete and Sel2c(X×Y)≠θ, then X is totally disconnected. © 2013 Elsevier B.V.
  • Elise Grabner(Slippery Rock University, Gary Grabner(Slippery Rock University, Kazumi Miyazaki, Jamal Tartir(Youngstown, State University
    the International Journal of Pure and Applied Mathematics, 49(2) 251-278, 2008  Peer-reviewed
    relative propertyにおけるsemi-metricとrelative first countable 研究と結果
  • Elise Grabner(Slippery Rock University, Gary Grabner(Slippery Rock University, Kazumi Miyazaki, Jamal Tartir(Youngstown University
    Questions and Answers in General Topology, 25(1) 53-55, Apr, 2007  Peer-reviewed
    異なる3種類のrelative normal について、部分空間Yがどんな全空間の中においてもそれぞれのrelative normalになるときの特徴づけを示し、さらにrelative s-normalの場合には部分空間Yがcompactであるという同値条件を得た。これによりnormalの観点からのcompact 空間の利用範囲をさらに広げることができた。

Misc.

 1

Books and Other Publications

 2

Presentations

 10

Professional Memberships

 1

研究テーマ

 4
  • 研究テーマ(英語)
    Relative Property
    概要(英語)
    位相空間の性質に対する部分空間の性質の研究
    研究期間(開始)(英語)
    1995/04/01
  • 研究テーマ(英語)
    set-valued semi-continuous selection
    キーワード(英語)
    semi-continuous selection
    概要(英語)
    set-valued semi continuous selectionの存在による位相的性質の特徴付け
    研究期間(開始)(英語)
    1998/04/01
    研究期間(終了)(英語)
    2001/03/31
  • 研究テーマ(英語)
    continuous selection
    キーワード(英語)
    selection, hyperspace
    概要(英語)
    種々の空間のcontinuous selectionの存在の研究とそれを用いた位相的性質の特徴づけ
    研究期間(開始)(英語)
    1998/04/01
  • 研究テーマ(英語)
    weak selection,hyperspace
    研究期間(開始)(英語)
    2002/04/01