• 제목/요약/키워드: nonelementary group

검색결과 4건 처리시간 0.016초

Characterizations of conical limit points for Kleinian groups

  • Hong, Sung-Bok;Jeong, Myung-Hwa
    • 대한수학회논문집
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    • 제11권1호
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    • pp.253-258
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    • 1996
  • For a nonelementary discrete group $\Gamma$ of hyperbolic isometries acting on $B^m(m\geq2)$, we give a topological characterization of conical limit points using admissible pairs.

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MYRBERG-AGARD DENSITY POINTS AND SCHOTTKY GROUPS

  • Do, Il-Yong;Hong, Sung-Bok
    • 대한수학회지
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    • 제34권1호
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    • pp.77-86
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    • 1997
  • Let $\Gamma$ be a discrete subgroup of hyperbolic isometries acting on the Poincare disc $B^m, m \geq 2$. The discrete group $\Gamma$ acts properly discontinously in $B^m$, and acts on $\partial B^m$ as a group of conformal homemorphisms, but need not act properly discontinously on $\partial B^m$.

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PATTERSON-SULLIVAN MEASURE AND GROUPS OF DIVERGENCE TYPE

  • Hong, Sungbok
    • 대한수학회보
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    • 제30권2호
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    • pp.223-228
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    • 1993
  • In this paper, we use the Patterson-Sullivan measure and results of [H] to show that for a nonelementary discrete group of divergence type, the conical limit set .LAMBDA.$_{c}$ has positive Patterson-Sullivan measure. The definition of the Patterson-Sullivan measure for groups of divergence type is reviewed in section 2. The Patterson-Sullivan measure can also be defined for groups of convergence type and the details for that case can be found in [N]. Necessary definitions and results from [H] are given in section 3, and in section 4, we prove our main result.t.

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GEOMETRIC CHARACTERIZATIONS OF CONCENTRATION POINTS FOR M$\"{O}$BIUS GROUPS

  • Sung Bok Hong;Jung Sook Sakong
    • 대한수학회논문집
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    • 제9권4호
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    • pp.945-950
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    • 1994
  • Although the study of the limit points of discrete groups of M$\ddot{o}$bius transformations has been a fertile area for many decades, there are some very natural topological properties of the limit points which appear not to have been previously examined. Let $\Gamma$ be a nonelementary discrete group of hyperbolic isometries acting on the Poincare disc $B^m, m \geq 2$, and let $p \in \partial B^m$ be a limit point of $\Gamma$. By a neighborhood of p, we will always mean an open neighborhood of p in $\partial B^m$.

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