Partition function

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21CONGRUENCES FOR FROBENIUS PARTITIONS Ken Ono Abstract. The partition function p(n) has several celebrated congruence properties which reflect the action of the Hecke operators on certain holomorphic modular forms.

CONGRUENCES FOR FROBENIUS PARTITIONS Ken Ono Abstract. The partition function p(n) has several celebrated congruence properties which reflect the action of the Hecke operators on certain holomorphic modular forms.

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Source URL: www.mathcs.emory.edu

Language: English - Date: 2010-08-24 14:06:47
    22COMPUTING THE PARTITION FUNCTION FOR GRAPH HOMOMORPHISMS WITH MULTIPLICITIES ´n Alexander Barvinok and Pablo Sobero July 2015

    COMPUTING THE PARTITION FUNCTION FOR GRAPH HOMOMORPHISMS WITH MULTIPLICITIES ´n Alexander Barvinok and Pablo Sobero July 2015

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    Source URL: www.math.lsa.umich.edu

    Language: English - Date: 2015-08-02 17:12:20
    23PARITY OF THE PARTITION FUNCTION IN ARITHMETIC PROGRESSIONS, II Matthew Boylan and Ken Ono Appearing in the Bulletin of the London Mathematical Society. Abstract. Let p(n) denote the ordinary partition function. Subbarao

    PARITY OF THE PARTITION FUNCTION IN ARITHMETIC PROGRESSIONS, II Matthew Boylan and Ken Ono Appearing in the Bulletin of the London Mathematical Society. Abstract. Let p(n) denote the ordinary partition function. Subbarao

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    Source URL: www.mathcs.emory.edu

    Language: English - Date: 2010-08-24 14:06:43
      24CONGRUENCE PROPERTIES FOR THE PARTITION FUNCTION Scott Ahlgren Ken Ono

      CONGRUENCE PROPERTIES FOR THE PARTITION FUNCTION Scott Ahlgren Ken Ono

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      Source URL: www.mathcs.emory.edu

      Language: English - Date: 2010-08-24 14:06:43
        25COMPUTING THE PARTITION FUNCTION FOR PERFECT MATCHINGS IN A HYPERGRAPH Alexander Barvinok and Alex Samorodnitsky September 2011 Abstract. Given non-negative weights wS on the k-subsets S of a km-element

        COMPUTING THE PARTITION FUNCTION FOR PERFECT MATCHINGS IN A HYPERGRAPH Alexander Barvinok and Alex Samorodnitsky September 2011 Abstract. Given non-negative weights wS on the k-subsets S of a km-element

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        Source URL: www.math.lsa.umich.edu

        Language: English - Date: 2011-09-04 21:59:49
        26PARITY OF THE PARTITION FUNCTION Ken Ono Abstract. Let p(n) denote the number of partitions of a non-negative integer n. A well-known conjecture asserts that every arithmetic progression contains infinitely many integer

        PARITY OF THE PARTITION FUNCTION Ken Ono Abstract. Let p(n) denote the number of partitions of a non-negative integer n. A well-known conjecture asserts that every arithmetic progression contains infinitely many integer

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        Source URL: www.mathcs.emory.edu

        Language: English - Date: 2010-08-24 14:06:41
          27DISTRIBUTION OF THE PARTITION FUNCTION MODULO m Ken Ono Annals of Mathematics, 151, 2000, pagesIntroduction and Statement of Results

          DISTRIBUTION OF THE PARTITION FUNCTION MODULO m Ken Ono Annals of Mathematics, 151, 2000, pagesIntroduction and Statement of Results

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          Source URL: www.mathcs.emory.edu

          Language: English - Date: 2010-08-24 14:06:45
            28EXTENSION OF RAMANUJAN’S CONGRUENCES FOR THE PARTITION FUNCTION MODULO POWERS OF 5 Jeremy Lovejoy and Ken Ono Appearing in Crelle’s Journal

            EXTENSION OF RAMANUJAN’S CONGRUENCES FOR THE PARTITION FUNCTION MODULO POWERS OF 5 Jeremy Lovejoy and Ken Ono Appearing in Crelle’s Journal

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            Source URL: www.mathcs.emory.edu

            Language: English - Date: 2010-08-24 14:06:45
              29Partition function loop series for a general graphical model: free energy corrections and message-passing equations Jing-Qing Xiao2,1 and Haijun Zhou1 1

              Partition function loop series for a general graphical model: free energy corrections and message-passing equations Jing-Qing Xiao2,1 and Haijun Zhou1 1

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              Source URL: power.itp.ac.cn

              Language: English - Date: 2011-11-19 02:59:00