Cantor set

Results: 61



#Item
1Nicholas A Scoville* (), Ursinus College, Math and CS, 601 E. Main Street, Collegeville, PAThe Cantor set before Cantor. Preliminary report. The Cantor set is the quintessential

Nicholas A Scoville* (), Ursinus College, Math and CS, 601 E. Main Street, Collegeville, PAThe Cantor set before Cantor. Preliminary report. The Cantor set is the quintessential

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Source URL: jointmathematicsmeetings.org

- Date: 2015-09-02 00:41:04
    2Sufficient Conditions For A Group Of Homeomorphisms Of The Cantor Set To Be 2-Generated C. Bleak J. Hyde

    Sufficient Conditions For A Group Of Homeomorphisms Of The Cantor Set To Be 2-Generated C. Bleak J. Hyde

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    Source URL: www.maths.dur.ac.uk

    - Date: 2015-08-17 05:28:12
      3Research Statement: Casey Donoven The Cantor space is the set of all infinite sequences over a finite alaphabet X, which is a both a topological and metric space. My research to date has focused on studying structures re

      Research Statement: Casey Donoven The Cantor space is the set of all infinite sequences over a finite alaphabet X, which is a both a topological and metric space. My research to date has focused on studying structures re

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      Source URL: www-groups.mcs.st-and.ac.uk

      Language: English - Date: 2015-12-01 05:36:42
      4About a big mapping class group Juliette Bavard Universit´e Paris 6, France Abstract: The mapping class group of the complement of a Cantor set in the plane arises naturally in dynamics. More precisely, the study of thi

      About a big mapping class group Juliette Bavard Universit´e Paris 6, France Abstract: The mapping class group of the complement of a Cantor set in the plane arises naturally in dynamics. More precisely, the study of thi

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      Source URL: foliations2016.math.uni.lodz.pl

      - Date: 2016-06-13 03:06:07
        5CANTOR AND THE BURALI-FORTI PARADOX Introduction In studying the early history of mathematical logic and set theory one typically reads that Georg Cantor discovered the so-called Burali-Forti (BF) paradox sometime in 18

        CANTOR AND THE BURALI-FORTI PARADOX Introduction In studying the early history of mathematical logic and set theory one typically reads that Georg Cantor discovered the so-called Burali-Forti (BF) paradox sometime in 18

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        Source URL: philebus.tamu.edu

        Language: English - Date: 2010-04-18 16:08:58
          6Radboud Universiteit Nijmegen Faculteit der natuurwetenschappen, Wiskunde en Informatica Algorithms on Continued Fractions

          Radboud Universiteit Nijmegen Faculteit der natuurwetenschappen, Wiskunde en Informatica Algorithms on Continued Fractions

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          Source URL: www.math.ru.nl

          Language: English - Date: 2012-06-20 11:20:06
          7Influence of small-scale structure on radiative transfer and photosynthesis in vegetation canopies

          Influence of small-scale structure on radiative transfer and photosynthesis in vegetation canopies

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          Source URL: sites.bu.edu

          Language: English - Date: 2013-12-27 16:16:02
          81106-AAYang Wang* (), Department of Mathematics, Hong Kong UNiv. of Science and Technology, Kowloon, Hong Kong. Self-Similar Subsets of the Cantor Set. We study the following question proposed by Ma

          1106-AAYang Wang* (), Department of Mathematics, Hong Kong UNiv. of Science and Technology, Kowloon, Hong Kong. Self-Similar Subsets of the Cantor Set. We study the following question proposed by Ma

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          Source URL: jointmathematicsmeetings.org

          - Date: 2014-09-16 01:56:06
            9“Refuting” Cantor Jaime Gaspar∗ 28 January 2014 The German mathematician Georg Cantor used his famous diagonal argument to prove his celebrated theorem showing that there is no bijection between the set of all natu

            “Refuting” Cantor Jaime Gaspar∗ 28 January 2014 The German mathematician Georg Cantor used his famous diagonal argument to prove his celebrated theorem showing that there is no bijection between the set of all natu

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            Source URL: jg.sdf.org

            Language: English - Date: 2014-01-28 06:52:57
            10Constructing Cardinals from Below W. W. Tait∗ The totality Ω of transfinite numbers was first introduced in [Cantor, 1883] by means of the principle If the initial segment Σ of Ω is a set, then it has a least stri

            Constructing Cardinals from Below W. W. Tait∗ The totality Ω of transfinite numbers was first introduced in [Cantor, 1883] by means of the principle If the initial segment Σ of Ω is a set, then it has a least stri

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            Source URL: home.uchicago.edu

            Language: English - Date: 2003-01-04 14:06:16