Prime number

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11arXiv:1610.00950v1 [math.NT] 4 OctCALCULATING THE TATE LOCAL PAIRING FOR ANY ODD PRIME NUMBER ERIK VISSE Abstract. Fisher and Newton have given an explicit description of

arXiv:1610.00950v1 [math.NT] 4 OctCALCULATING THE TATE LOCAL PAIRING FOR ANY ODD PRIME NUMBER ERIK VISSE Abstract. Fisher and Newton have given an explicit description of

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Source URL: arxiv.org

- Date: 2016-10-04 20:24:49
    12HomeworkDetermine all groups of orderLet p be a prime number. What is the order of SL2 (Z/pZ)? 3. What is the index (SL2 (Z) : Γ0 (p))? 4. Realize Z/3Z, Z/4Z and Z/2Z ⊕ Z/2Z as subgroups of GL2 (Z).

    HomeworkDetermine all groups of orderLet p be a prime number. What is the order of SL2 (Z/pZ)? 3. What is the index (SL2 (Z) : Γ0 (p))? 4. Realize Z/3Z, Z/4Z and Z/2Z ⊕ Z/2Z as subgroups of GL2 (Z).

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    Source URL: www.math.nyu.edu

    - Date: 2016-09-29 23:32:24
      13Around the Möbius function Kaisa Matomäki (University of Turku), Maksym Radziwill (Rutgers University) The Möbius function plays a central role in number theory; both the prime number theorem and the Riemann Hypothesi

      Around the Möbius function Kaisa Matomäki (University of Turku), Maksym Radziwill (Rutgers University) The Möbius function plays a central role in number theory; both the prime number theorem and the Riemann Hypothesi

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      Source URL: www.7ecm.de

      - Date: 2016-06-10 05:01:15
        14ON CANONICAL SUBGROUPS OF HILBERT-BLUMENTHAL ABELIAN VARIETIES SHIN HATTORI Abstract. Let p be a rational prime. Let F be a totally real number field which is unramified over p. In this paper, we develop a theory of cano

        ON CANONICAL SUBGROUPS OF HILBERT-BLUMENTHAL ABELIAN VARIETIES SHIN HATTORI Abstract. Let p be a rational prime. Let F be a totally real number field which is unramified over p. In this paper, we develop a theory of cano

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        Source URL: www2.math.kyushu-u.ac.jp

        - Date: 2016-06-23 04:10:47
          15Indivisibility of class numbers of imaginary quadratic function fields Dongho Byeon Abstract. We show that for an odd prime number l, there are infinitely many imaginary quadratic extensions F over the rational function

          Indivisibility of class numbers of imaginary quadratic function fields Dongho Byeon Abstract. We show that for an odd prime number l, there are infinitely many imaginary quadratic extensions F over the rational function

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          Source URL: staff.miyakyo-u.ac.jp

          - Date: 2008-10-24 01:30:50
            16FINAL REPORT Date of Report: Prime Award Number: Awarding Agency: Primary Institution:

            FINAL REPORT Date of Report: Prime Award Number: Awarding Agency: Primary Institution:

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            Source URL: ocean.floridamarine.org

            - Date: 2011-03-21 12:48:53
              17HP Prime Graphing Calculator Quick Start Guide Edition 1 HP Part Number: NW280-1001

              HP Prime Graphing Calculator Quick Start Guide Edition 1 HP Part Number: NW280-1001

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              Source URL: hp-prime.de

              - Date: 2013-12-17 09:47:48
                18HP Prime Graphing Calculator Quick Start Guide Edition 1 HP Part Number: NW280-1001

                HP Prime Graphing Calculator Quick Start Guide Edition 1 HP Part Number: NW280-1001

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                Source URL: www.hp-prime.de

                - Date: 2013-12-17 09:47:48
                  19ON A PROPERNESS OF THE HILBERT EIGENVARIETY AT INTEGRAL WEIGHTS: THE CASE OF QUADRATIC RESIDUE FIELDS SHIN HATTORI Abstract. Let p be a rational prime. Let F be a totally real number field such that F is unramified over

                  ON A PROPERNESS OF THE HILBERT EIGENVARIETY AT INTEGRAL WEIGHTS: THE CASE OF QUADRATIC RESIDUE FIELDS SHIN HATTORI Abstract. Let p be a rational prime. Let F be a totally real number field such that F is unramified over

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                  Source URL: www2.math.kyushu-u.ac.jp

                  Language: English - Date: 2016-06-23 04:10:37
                  20CANONICAL SUBGROUPS VIA BREUIL-KISIN MODULES FOR p = 2 SHIN HATTORI Abstract. Let p be a rational prime and K/Qp be an extension of complete discrete valuation fields. Let G be a truncated Barsotti-Tate group of level n,

                  CANONICAL SUBGROUPS VIA BREUIL-KISIN MODULES FOR p = 2 SHIN HATTORI Abstract. Let p be a rational prime and K/Qp be an extension of complete discrete valuation fields. Let G be a truncated Barsotti-Tate group of level n,

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                  Source URL: www2.math.kyushu-u.ac.jp

                  Language: English - Date: 2012-07-22 04:43:02