Quadratic field

Results: 216



#Item
101Use of SIMD-Based Data Parallelism to Speed up Sieving in Integer-Factoring Algorithms ? Binanda Sengupta and Abhijit Das Department of Computer Science and Engineering Indian Institute of Technology Kharagpur, West Beng

Use of SIMD-Based Data Parallelism to Speed up Sieving in Integer-Factoring Algorithms ? Binanda Sengupta and Abhijit Das Department of Computer Science and Engineering Indian Institute of Technology Kharagpur, West Beng

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Source URL: eprint.iacr.org

Language: English - Date: 2015-01-20 08:14:47
102WEIL’S CONJECTURE FOR FUNCTION FIELDS DENNIS GAITSGORY AND JACOB LURIE Abstract. Let X be an algebraic curve defined over a finite field Fq and let G be a smooth affine group scheme over X with connected fibers whose g

WEIL’S CONJECTURE FOR FUNCTION FIELDS DENNIS GAITSGORY AND JACOB LURIE Abstract. Let X be an algebraic curve defined over a finite field Fq and let G be a smooth affine group scheme over X with connected fibers whose g

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Source URL: www.math.harvard.edu

Language: English - Date: 2014-12-20 16:43:48
103Microsoft Word - Comparison_CCR_MPE_with_CCSS.docx

Microsoft Word - Comparison_CCR_MPE_with_CCSS.docx

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Source URL: doe.virginia.gov

Language: English - Date: 2012-02-23 15:08:51
104Week 5 (due Feb. 13) Reading: Srednicki, sections 39, 23, [removed]30pts) Problem[removed]Problem[removed]Consider a theory of N Weyl fermions χi , i = 1, . . . , N. The most general quadratic Hermitian Lorenz-invarian

Week 5 (due Feb. 13) Reading: Srednicki, sections 39, 23, [removed]30pts) Problem[removed]Problem[removed]Consider a theory of N Weyl fermions χi , i = 1, . . . , N. The most general quadratic Hermitian Lorenz-invarian

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Source URL: www.theory.caltech.edu

Language: English - Date: 2008-02-07 12:26:57
105Microsoft Word - Field Trip.doc

Microsoft Word - Field Trip.doc

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Source URL: mathforum.org

Language: English - Date: 2014-02-28 13:47:59
106DEDEKIND 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
107Mersenne Factorization Factory Thorsten Kleinjung1 , Joppe W. Bos2 , and Arjen K. Lenstra1 1 EPFL IC LACAL, Station 14, CH-1015 Lausanne, Switzerland 2

Mersenne Factorization Factory Thorsten Kleinjung1 , Joppe W. Bos2 , and Arjen K. Lenstra1 1 EPFL IC LACAL, Station 14, CH-1015 Lausanne, Switzerland 2

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Source URL: eprint.iacr.org

Language: English - Date: 2014-11-24 10:02:08
108Sage Reference Manual: Quadratic Forms Release 6.3 The Sage Development Team

Sage Reference Manual: Quadratic Forms Release 6.3 The Sage Development Team

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Source URL: www.sagemath.org

Language: English - Date: 2014-11-16 14:58:20
109Sage Reference Manual: Algebraic Number Fields Release 6.3 The Sage Development Team

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

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Source URL: www.sagemath.org

Language: English - Date: 2014-11-16 14:58:20
110Construction of Regular Polygons Jacques Willekens <j-willekens@scarlet.be> May 24, 2008 Abstract

Construction of Regular Polygons Jacques Willekens May 24, 2008 Abstract

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Source URL: home.scarlet.be

Language: English - Date: 2009-12-29 05:08:22