Milne

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11Motives over Fp J.S. Milne July 22, 2006 Abstract In April, 2006, Kontsevich asked me whether the category of motives over Fp (p

Motives over Fp J.S. Milne July 22, 2006 Abstract In April, 2006, Kontsevich asked me whether the category of motives over Fp (p

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Source URL: www.jmilne.org

Language: English - Date: 2007-07-01 16:05:24
    12What is a Motive? James S. Milne March 9, 2009; v1.02 Abstract Grothendieck introduced the notion of a “motif” in a letter to Serre inLater

    What is a Motive? James S. Milne March 9, 2009; v1.02 Abstract Grothendieck introduced the notion of a “motif” in a letter to Serre inLater

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    Language: English - Date: 2009-04-26 05:22:05
      13ABELIAN VARIETIES WITH COMPLEX MULTIPLICATION (FOR PEDESTRIANS) J.S. MILNE Abstract. (June 7, This is the text of an article that I wrote and disseminated in September 1981, except that I’ve updated the referenc

      ABELIAN VARIETIES WITH COMPLEX MULTIPLICATION (FOR PEDESTRIANS) J.S. MILNE Abstract. (June 7, This is the text of an article that I wrote and disseminated in September 1981, except that I’ve updated the referenc

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      Language: English - Date: 2007-07-01 15:45:17
        14A more recent version of these notes is available at www.jmilne.org/math/ ALGEBRAIC NUMBER THEORY J.S. MILNE Abstract. These are the notes for a course taught at the University of Michigan in F92 as Math 676. They are a

        A more recent version of these notes is available at www.jmilne.org/math/ ALGEBRAIC NUMBER THEORY J.S. MILNE Abstract. These are the notes for a course taught at the University of Michigan in F92 as Math 676. They are a

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        Language: English - Date: 2012-05-26 13:30:29
          151999aP LEFSCHETZ CLASSES ON ABELIAN VARIETIES J.S. MILNE Contents

          1999aP LEFSCHETZ CLASSES ON ABELIAN VARIETIES J.S. MILNE Contents

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          Language: English - Date: 2007-07-01 16:03:27
            16Algebraic Geometry J.S. Milne Version 6.02 March 19, 2017

            Algebraic Geometry J.S. Milne Version 6.02 March 19, 2017

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            Language: English - Date: 2017-03-19 14:00:50
              17Review of: Shimura, Collected Papers J.S. Milne∗ December 22, 2003; March 26, 2004 MR classification: 01A75; 11-03, When Weil arrived in Tokyo in 1955, planning to speak about his ideas on the extension to abeli

              Review of: Shimura, Collected Papers J.S. Milne∗ December 22, 2003; March 26, 2004 MR classification: 01A75; 11-03, When Weil arrived in Tokyo in 1955, planning to speak about his ideas on the extension to abeli

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              Language: English - Date: 2007-07-01 16:04:32
                18The Tate conjecture over finite fields (AIM talk) J.S. Milne Abstract These are my notes for a talk at the The Tate Conjecture workshop at the American Institute of Mathematics in Palo Alto, CA, July 23–July 27, 2007,

                The Tate conjecture over finite fields (AIM talk) J.S. Milne Abstract These are my notes for a talk at the The Tate Conjecture workshop at the American Institute of Mathematics in Palo Alto, CA, July 23–July 27, 2007,

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                Language: English - Date: 2008-05-07 20:24:29
                  19Motivic complexes over finite fields and the ring of correspondences at the generic point James S. Milne Niranjan Ramachandran

                  Motivic complexes over finite fields and the ring of correspondences at the generic point James S. Milne Niranjan Ramachandran

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                  Language: English - Date: 2011-05-18 07:52:13
                    20Kazhdan’s Theorem on Arithmetic Varieties J.S. Milne Abstract. Define an arithmetic variety to be the quotient of a bounded symmetric domain by an arithmetic group. An arithmetic variety is algebraic, and the theorem

                    Kazhdan’s Theorem on Arithmetic Varieties J.S. Milne Abstract. Define an arithmetic variety to be the quotient of a bounded symmetric domain by an arithmetic group. An arithmetic variety is algebraic, and the theorem

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                    Source URL: www.jmilne.org

                    Language: English - Date: 2007-07-01 15:50:42