Linear group

Results: 750



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1Representation Theory* Its Rise and Its Role in Number Theory Introduction By representation theory we understand the representation of a group by linear transformations of a vector space. Initially, the group is finite,

Representation Theory* Its Rise and Its Role in Number Theory Introduction By representation theory we understand the representation of a group by linear transformations of a vector space. Initially, the group is finite,

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Source URL: sunsite.ubc.ca

Language: English - Date: 2001-05-12 20:19:36
    2Reasoning under Uncertainty with Log-Linear Description Logics Mathias Niepert KR & KM Research Group, Universit¨ at Mannheim

    Reasoning under Uncertainty with Log-Linear Description Logics Mathias Niepert KR & KM Research Group, Universit¨ at Mannheim

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    Source URL: ceur-ws.org

    Language: English - Date: 2011-09-06 04:48:38
      3Group Action Induced Distances for Averaging and Clustering Linear Dynamical Systems with Applications to the Analysis of Dynamic Scenes Bijan Afsari1 1 Rizwan Chaudhry1

      Group Action Induced Distances for Averaging and Clustering Linear Dynamical Systems with Applications to the Analysis of Dynamic Scenes Bijan Afsari1 1 Rizwan Chaudhry1

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      Source URL: www.vision.jhu.edu

      Language: English - Date: 2012-04-30 19:09:00
        4US Linear Collider Activities: A status report on the study commissioned by the US Linear Collider Steering Group USLCSG Marc Ross Stanford Linear Accelerator Center

        US Linear Collider Activities: A status report on the study commissioned by the US Linear Collider Steering Group USLCSG Marc Ross Stanford Linear Accelerator Center

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        Source URL: tesla.desy.de

        Language: English - Date: 2003-09-29 04:09:28
          5On Klyachko’s model for the representations of finite general linear groups Robert B. Howlett and Charles Zworestine University of Sydney, NSW 2006, Australia Abstract Let G = GL(n, q), the group of n × n invertible m

          On Klyachko’s model for the representations of finite general linear groups Robert B. Howlett and Charles Zworestine University of Sydney, NSW 2006, Australia Abstract Let G = GL(n, q), the group of n × n invertible m

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          Source URL: www.maths.usyd.edu.au

          Language: English - Date: 2005-02-10 02:22:03
            6Hiroyuki Matsunaga, The 5th ACFA Workshop on Physics and Detector at Linear Collider, July 10–12, 2002 JLC Calorimeter Hiroyuki Matsunaga (University of Tsukuba) For the JLC-CAL Group (KEK, Kobe, Konan, Niigata, Shins

            Hiroyuki Matsunaga, The 5th ACFA Workshop on Physics and Detector at Linear Collider, July 10–12, 2002 JLC Calorimeter Hiroyuki Matsunaga (University of Tsukuba) For the JLC-CAL Group (KEK, Kobe, Konan, Niigata, Shins

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            Source URL: www-jlc.kek.jp

            Language: English - Date: 2002-07-18 02:05:08
              7The Mystery of the Non-Linear Increase in Cache SER April 15, 2009 Shubu Mukherjee Principal Engineer Director, SPEARS Group

              The Mystery of the Non-Linear Increase in Cache SER April 15, 2009 Shubu Mukherjee Principal Engineer Director, SPEARS Group

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              Source URL: ewh.ieee.org

              - Date: 2009-08-29 18:19:06
                8LOW–DIMENSIONAL LINEAR REPRESENTATIONS OF MAPPING CLASS GROUPS. MUSTAFA KORKMAZ Let S denote a compact connected orientable surface of genus g and let Mod(S) denote the mapping class group of it, the group of isotopy c

                LOW–DIMENSIONAL LINEAR REPRESENTATIONS OF MAPPING CLASS GROUPS. MUSTAFA KORKMAZ Let S denote a compact connected orientable surface of genus g and let Mod(S) denote the mapping class group of it, the group of isotopy c

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                Source URL: faculty.ms.u-tokyo.ac.jp

                - Date: 2013-04-12 00:04:59
                  9Deformation-Aware Log-Linear Models Tobias Gass, Thomas Deselaers1 and Hermann Ney 1 Human Language Technology and Pattern Recognition Group,

                  Deformation-Aware Log-Linear Models Tobias Gass, Thomas Deselaers1 and Hermann Ney 1 Human Language Technology and Pattern Recognition Group,

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                  Source URL: thomas.deselaers.de

                  - Date: 2014-10-11 09:29:37
                    10623 Doc. Math. J. DMV The Automorphism Group of Linear Se tions of the Grassmannians G(1, N )

                    623 Doc. Math. J. DMV The Automorphism Group of Linear Se tions of the Grassmannians G(1, N )

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                    Source URL: documenta.sagemath.org

                    - Date: 2014-07-15 07:20:52