Matrices

Results: 2768



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61A formula for a doubly refined enumeration of alternating sign matrices Matan Karklinsky Dan Romik∗

A formula for a doubly refined enumeration of alternating sign matrices Matan Karklinsky Dan Romik∗

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Source URL: www.math.ucdavis.edu

- Date: 2014-02-10 20:43:58
    62TRComparison of SPMV performance on matrices with different matrix format using CUSP, cuSPARSE and ViennaCL Ang Li, Hammad Mazhar, Radu Serban, Dan Negrut

    TRComparison of SPMV performance on matrices with different matrix format using CUSP, cuSPARSE and ViennaCL Ang Li, Hammad Mazhar, Radu Serban, Dan Negrut

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    Source URL: sbel.wisc.edu

    - Date: 2015-02-10 13:38:52
      63MATRICES AND DETERMINANTS 5 minute review. Remind students how to multiply matrices (including that in AB, A must be m × n, B must be n × p, and the result is m × p). Remind students how to compute determinants (both

      MATRICES AND DETERMINANTS 5 minute review. Remind students how to multiply matrices (including that in AB, A must be m × n, B must be n × p, and the result is m × p). Remind students how to compute determinants (both

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      Source URL: engmaths.group.shef.ac.uk

      - Date: 2017-03-09 08:48:02
        64S´ eminaire Lotharingien de Combinatoire), Article B73b BIJECTIVE COMBINATORIAL PROOF OF THE COMMUTATION OF TRANSFER MATRICES IN THE DENSE O(1) LOOP MODEL RON PELED AND DAN ROMIK

        S´ eminaire Lotharingien de Combinatoire), Article B73b BIJECTIVE COMBINATORIAL PROOF OF THE COMMUTATION OF TRANSFER MATRICES IN THE DENSE O(1) LOOP MODEL RON PELED AND DAN ROMIK

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        Source URL: www.math.ucdavis.edu

        - Date: 2015-08-14 11:58:37
          65New enumeration formulas for alternating sign matrices and square ice partition functions Arvind Ayyer∗ Dan Romik†

          New enumeration formulas for alternating sign matrices and square ice partition functions Arvind Ayyer∗ Dan Romik†

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          Source URL: www.math.ucdavis.edu

          - Date: 2014-02-10 20:44:00
            66MATRICES: MORE DETERMINANTS, AND INVERSES 5 minute review. Remind students how to compute determinants for any n × n matrix using any row/column. Discuss how one can use row and column operations to help simplify compu

            MATRICES: MORE DETERMINANTS, AND INVERSES 5 minute review. Remind students how to compute determinants for any n × n matrix using any row/column. Discuss how one can use row and column operations to help simplify compu

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            Source URL: engmaths.group.shef.ac.uk

            - Date: 2017-08-24 06:17:44
              67Recovering Structured Probability Matrices Qingqing Huang⇤ Sham M. Kakade† Weihao Kong‡

              Recovering Structured Probability Matrices Qingqing Huang⇤ Sham M. Kakade† Weihao Kong‡

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              Source URL: qingqinghuang.github.io

              - Date: 2016-10-28 18:04:10
                68Inverse Kinematics Problems with Exact Hessian Matrices Kenny Erleben Sheldon Andrews University of Copenhagen

                Inverse Kinematics Problems with Exact Hessian Matrices Kenny Erleben Sheldon Andrews University of Copenhagen

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                Source URL: profs.etsmtl.ca

                - Date: 2017-09-19 09:47:00
                  69MATRICES: SYSTEMS OF EQUATIONS Announcement. Please remind students that there is a full-class lecture in either Week 7 (MAS140,151) or 8 (MAS152,156) on exam technique. 5 minute review. Remind students about the differ

                  MATRICES: SYSTEMS OF EQUATIONS Announcement. Please remind students that there is a full-class lecture in either Week 7 (MAS140,151) or 8 (MAS152,156) on exam technique. 5 minute review. Remind students about the differ

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                  Source URL: engmaths.group.shef.ac.uk

                  - Date: 2018-03-20 10:09:03
                    70Joint Sparsity with Different Measurement Matrices Reinhard Heckel and Helmut B¨olcskei Dept. of IT & EE, ETH Zurich, Switzerland {heckel,boelcskei}@nari.ee.ethz.ch Abstract— We consider a generalization of the multi

                    Joint Sparsity with Different Measurement Matrices Reinhard Heckel and Helmut B¨olcskei Dept. of IT & EE, ETH Zurich, Switzerland {heckel,boelcskei}@nari.ee.ethz.ch Abstract— We consider a generalization of the multi

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                    Source URL: www.reinhardheckel.com

                    - Date: 2018-02-27 13:37:34