Algebraic function field

Results: 204



#Item
91DEDEKIND ZETA MOTIVES FOR TOTALLY REAL NUMBER FIELDS FRANCIS C.S. BROWN Abstract. Let k be a totally real number field. For every odd n ≥ 3, we construct an element in the category MT(k) of mixed Tate motives over k

DEDEKIND ZETA MOTIVES FOR TOTALLY REAL NUMBER FIELDS FRANCIS C.S. BROWN Abstract. Let k be a totally real number field. For every odd n ≥ 3, we construct an element in the category MT(k) of mixed Tate motives over k

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Source URL: www.ihes.fr

Language: English - Date: 2013-04-19 05:08:24
92Can. J. Math., Vol. XXXVIII, No. 1, 1986, pp[removed]ON A FAMILY OF DISTRIBUTIONS OBTAINED FROM ORBITS

Can. J. Math., Vol. XXXVIII, No. 1, 1986, pp[removed]ON A FAMILY OF DISTRIBUTIONS OBTAINED FROM ORBITS

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Source URL: www2.maths.ox.ac.uk

Language: English - Date: 2013-12-01 07:09:09
93A Novel Model for Orientation Field of Fingerprints Jinwei Gu Jie Zhou Department of Automation, Tsinghua University, Beijing[removed], P.R.China

A Novel Model for Orientation Field of Fingerprints Jinwei Gu Jie Zhou Department of Automation, Tsinghua University, Beijing[removed], P.R.China

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Source URL: www.cis.rit.edu

Language: English - Date: 2010-09-10 15:22:06
94Sage Reference Manual: Algebraic Function Fields Release 6.3 The Sage Development Team

Sage Reference Manual: Algebraic Function Fields Release 6.3 The Sage Development Team

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Source URL: www.sagemath.org

Language: English - Date: 2014-11-16 14:58:22
95ON THE CYCLOTOMIC MAIN CONJECTURE FOR THE PRIME 2 MATTHIAS FLACH Let l be prime number, m0 an integer prime to l and Λ = lim Zl [Gal(Q(ζm0 ln )/Q)] ∼

ON THE CYCLOTOMIC MAIN CONJECTURE FOR THE PRIME 2 MATTHIAS FLACH Let l be prime number, m0 an integer prime to l and Λ = lim Zl [Gal(Q(ζm0 ln )/Q)] ∼

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Source URL: www.math.caltech.edu

Language: English - Date: 2008-07-17 17:03:31
96NATURAL BOUNDARIES AND THE CORRECT NOTION OF INTEGRAL MOMENTS OF L–FUNCTIONS Adrian Diaconu, Paul Garrett and Dorian Goldfeld Abstract. It is shown that a large class of multiple Dirichlet series which arise naturally

NATURAL BOUNDARIES AND THE CORRECT NOTION OF INTEGRAL MOMENTS OF L–FUNCTIONS Adrian Diaconu, Paul Garrett and Dorian Goldfeld Abstract. It is shown that a large class of multiple Dirichlet series which arise naturally

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Source URL: www.math.columbia.edu

Language: English - Date: 2009-09-18 11:32:11
97. Video for Fesenko This video is being prepared at the suggestion of Ivan Fesenko as an informal nontechnical discussion of various mathematical topics that occupy me now and that have occupied me over my many years as

. Video for Fesenko This video is being prepared at the suggestion of Ivan Fesenko as an informal nontechnical discussion of various mathematical topics that occupy me now and that have occupied me over my many years as

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Source URL: publications.ias.edu

Language: English - Date: 2014-07-03 10:50:06
98The Fourth Annual Upstate New York Number Theory Conference SUNY at Buffalo - April 26-27th 2014 Invited Talks Speaker: Laurent Berger (l’ENS de Lyon, France)

The Fourth Annual Upstate New York Number Theory Conference SUNY at Buffalo - April 26-27th 2014 Invited Talks Speaker: Laurent Berger (l’ENS de Lyon, France)

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Source URL: www.math.buffalo.edu

Language: English - Date: 2014-04-23 18:51:36
99A celebration of the mathematical work of Glenn Stevens Barry Mazur June 12, 2014

A celebration of the mathematical work of Glenn Stevens Barry Mazur June 12, 2014

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Source URL: abel.math.harvard.edu

Language: English - Date: 2014-06-13 14:39:05
100(Title Page Submitted by a Candidate from a GSAS Department) On Λ-adic Saito-Kurokawa Lifting and its Application Zhi Li Submitted in partial fulfillment of the

(Title Page Submitted by a Candidate from a GSAS Department) On Λ-adic Saito-Kurokawa Lifting and its Application Zhi Li Submitted in partial fulfillment of the

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Source URL: www.math.columbia.edu

Language: English - Date: 2009-06-29 10:48:33