Locally compact space

Results: 49



#Item
1Local Compactness and Bases in various formulations of Topology Paul Taylor 6 July 2014 Abstract A basis for a locally compact space is a family of pairs of subspaces, one open and the

Local Compactness and Bases in various formulations of Topology Paul Taylor 6 July 2014 Abstract A basis for a locally compact space is a family of pairs of subspaces, one open and the

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Source URL: www.paultaylor.eu

- Date: 2014-07-06 11:42:00
    2Lp -convolutions, multipliers and (Lp , Lq )-estimates for compact quantum groups Simeng Wang Universit´ e de Franche-Comt´ e, Besan¸con

    Lp -convolutions, multipliers and (Lp , Lq )-estimates for compact quantum groups Simeng Wang Universit´ e de Franche-Comt´ e, Besan¸con

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    Source URL: www.wiko-greifswald.de

    Language: English - Date: 2016-07-19 06:42:05
    3Computably Based Locally Compact Spaces Paul Taylor March 7, 2006 Abstract ASD (Abstract Stone Duality) is a re-axiomatisation of general topology in which the topology on a space is treated, not as an infinitary lattice

    Computably Based Locally Compact Spaces Paul Taylor March 7, 2006 Abstract ASD (Abstract Stone Duality) is a re-axiomatisation of general topology in which the topology on a space is treated, not as an infinitary lattice

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    Source URL: www.monad.me.uk

    Language: English - Date: 2009-02-12 13:09:41
      4Computably Based Locally Compact Spaces Paul Taylor March 7, 2006 Abstract ASD (Abstract Stone Duality) is a re-axiomatisation of general topology in which the topology on a space is treated, not as an infinitary lattice

      Computably Based Locally Compact Spaces Paul Taylor March 7, 2006 Abstract ASD (Abstract Stone Duality) is a re-axiomatisation of general topology in which the topology on a space is treated, not as an infinitary lattice

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      Source URL: www.paultaylor.eu

      Language: English - Date: 2009-02-12 13:09:41
        5Geometric and Higher Order Logic in terms of Abstract Stone Duality Paul Taylor Abstract The contravariant powerset and its generalisations ΣX to the lattices of open subsets of a locally compact topological space and o

        Geometric and Higher Order Logic in terms of Abstract Stone Duality Paul Taylor Abstract The contravariant powerset and its generalisations ΣX to the lattices of open subsets of a locally compact topological space and o

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        Source URL: www.monad.me.uk

        Language: English - Date: 2011-04-11 06:46:45
          6Equideductive Logic and CCCs with Subspaces Paul Taylor Advances in Constructive Topology and Logical Foundations

          Equideductive Logic and CCCs with Subspaces Paul Taylor Advances in Constructive Topology and Logical Foundations

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          Source URL: www.paultaylor.eu

          Language: English - Date: 2009-02-12 12:35:30
          7DISPERSING COCYCLES AND MIXING FLOWS UNDER FUNCTIONS KLAUS SCHMIDT Abstract. Let T be a measure-preserving and mixing action of a countable abelian group G on a probability space (X, S, µ) and A a locally compact second

          DISPERSING COCYCLES AND MIXING FLOWS UNDER FUNCTIONS KLAUS SCHMIDT Abstract. Let T be a measure-preserving and mixing action of a countable abelian group G on a probability space (X, S, µ) and A a locally compact second

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          Source URL: www.mat.univie.ac.at

          Language: English - Date: 2006-12-29 01:05:48
            8Computably Based Locally Compact Spaces Paul Taylor June 29, 2004 Abstract Abstract Stone Duality is a re-axiomatisation of general topology in which the topology on a space is treated as an exponential object of the sam

            Computably Based Locally Compact Spaces Paul Taylor June 29, 2004 Abstract Abstract Stone Duality is a re-axiomatisation of general topology in which the topology on a space is treated as an exponential object of the sam

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            Source URL: www.paultaylor.eu

            Language: English - Date: 2009-02-12 13:10:52
              9LATTICES IN PRODUCTS (AFTER U. BADER AND Y. SHALOM) Abstract. These notes discuss U. Bader and Y. Shalom’s “Normal subgroup Theorem” for lattices in products of locally compact groups. No originality is claimed.

              LATTICES IN PRODUCTS (AFTER U. BADER AND Y. SHALOM) Abstract. These notes discuss U. Bader and Y. Shalom’s “Normal subgroup Theorem” for lattices in products of locally compact groups. No originality is claimed.

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              Source URL: www.math.ucsd.edu

              Language: English - Date: 2014-12-12 22:35:11
              10Interval Analysis Without Intervals Paul Taylor Department of Computer Science University of Manchester UK EPSRC GR/S58522

              Interval Analysis Without Intervals Paul Taylor Department of Computer Science University of Manchester UK EPSRC GR/S58522

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              Source URL: www.paultaylor.eu

              Language: English - Date: 2009-02-12 12:34:48