Bulletin of the Korean Mathematical Society (대한수학회보)

Korean Mathematical Society (대한수학회)
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HEMICOMPACTNESS AND HEMICONNECTEDNESS OF HYPERSPACES

  • Baik, B.S. (DEPARTMENT OF MATHEMATICS EDUCATION, CHONJOO WOO SUK UNIVERSITY) ;
  • Hur, K. (DEPARTMENT OF MATHEMATICS, WON KWANG UNIVERSITY) ;
  • Lee, S.W. (DEPARTMENT OF MATHEMATICS, WON KWANG UNIVERSITY) ;
  • Rhee, C.J. (DEPARTMENT OF MATHEMATICS, WAYNE STATE UNIVERSITY)
  • Published : 2000.02.01
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Abstract

We prove the following: (1) For a Hausdorff space X, the hyperspace K(X) of compact subsets of X is hemicompact if and only if X is hemicompact. (2) For a regular space X, the hyperspace $C_K(X)$ of subcontinua of X is hemicompact (hemiconnected) if and only if X is hemicompact (hemiconnected). (3) For a locally compact Hausdorff space X, each open set in X is hemicompact if and only if each basic open set in the hyperspace K(X) is hemicompact. (4) For a connected, locally connected, locally compact Hausdorff space X, K(X) is hemiconnected if and only if X is hemiconnected.

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References

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