Congruence subgroup

Results: 62



#Item
21Subgroup separability and virtual retractions of groups D. D. Long∗, & A. W. Reid† August 25, 2004 1

Subgroup separability and virtual retractions of groups D. D. Long∗, & A. W. Reid† August 25, 2004 1

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Source URL: www.math.ucsb.edu

Language: English - Date: 2004-08-25 16:25:33
22Canonical models of Shimura curves J.S. Milne April 4, 2003, v0.0 Abstract As an introduction to Shimura varieties, and, in particular, to Deligne’s Bourbaki and Corvallis talks (Deligne 1971, 1979), I explain the main

Canonical models of Shimura curves J.S. Milne April 4, 2003, v0.0 Abstract As an introduction to Shimura varieties, and, in particular, to Deligne’s Bourbaki and Corvallis talks (Deligne 1971, 1979), I explain the main

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Source URL: www.jmilne.org

Language: English - Date: 2007-07-01 16:04:06
23A brief overview of modular and automorphic forms Kimball Martin December 28, 2014 These notes were originally written in Fall 2010 to provide a very quick overview of some basic topics in modular forms, automorphic form

A brief overview of modular and automorphic forms Kimball Martin December 28, 2014 These notes were originally written in Fall 2010 to provide a very quick overview of some basic topics in modular forms, automorphic form

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Source URL: www2.math.ou.edu

Language: English - Date: 2014-12-28 01:50:03
24ARITHMETIC QUOTIENTS OF THE COMPLEX BALL AND A CONJECTURE OF LANG MLADEN DIMITROV AND DINAKAR RAMAKRISHNAN Introduction n be the n-dimensional complex hyperbolic space, repreFor any integer n > 1, let HC

ARITHMETIC QUOTIENTS OF THE COMPLEX BALL AND A CONJECTURE OF LANG MLADEN DIMITROV AND DINAKAR RAMAKRISHNAN Introduction n be the n-dimensional complex hyperbolic space, repreFor any integer n > 1, let HC

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Source URL: www.math.caltech.edu

Language: English - Date: 2014-10-03 19:34:03
25MULTIPLE MODULAR VALUES FOR SL2 (Z) FRANCIS BROWN 1. Introduction The purpose of this paper is to define and study a common generalisation of multiple zeta values, which are iterated integrals on the projective line minu

MULTIPLE MODULAR VALUES FOR SL2 (Z) FRANCIS BROWN 1. Introduction The purpose of this paper is to define and study a common generalisation of multiple zeta values, which are iterated integrals on the projective line minu

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Source URL: www.ihes.fr

Language: English - Date: 2014-07-19 10:30:38
26Sage Reference Manual: Modular Symbols Release 6.3 The Sage Development Team

Sage Reference Manual: Modular Symbols Release 6.3 The Sage Development Team

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Source URL: www.sagemath.org

Language: English - Date: 2014-11-16 14:58:23
27Sage Reference Manual: Arithmetic Subgroups of SL2(Z) Release 6.3 The Sage Development Team

Sage Reference Manual: Arithmetic Subgroups of SL2(Z) 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
28Sage Reference Manual: Modular Forms Release 6.3 The Sage Development Team

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

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Source URL: www.sagemath.org

Language: English - Date: 2014-11-16 14:58:22
29COMPACT ARITHMETIC QUOTIENTS OF THE COMPLEX 2-BALL AND A CONJECTURE OF LANG arXiv:1401.1628v2 [math.NT] 31 Mar[removed]MLADEN DIMITROV AND DINAKAR RAMAKRISHNAN

COMPACT ARITHMETIC QUOTIENTS OF THE COMPLEX 2-BALL AND A CONJECTURE OF LANG arXiv:1401.1628v2 [math.NT] 31 Mar[removed]MLADEN DIMITROV AND DINAKAR RAMAKRISHNAN

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Source URL: www.math.caltech.edu

Language: English - Date: 2014-04-01 11:50:52
30MODULAR FORMS AND CALABI-YAU VARIETIES KAPIL PARANJAPE1 AND DINAKAR RAMAKRISHNAN2 Introduction Let f (z) =

MODULAR FORMS AND CALABI-YAU VARIETIES KAPIL PARANJAPE1 AND DINAKAR RAMAKRISHNAN2 Introduction Let f (z) =

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Source URL: www.math.caltech.edu

Language: English - Date: 2014-04-02 03:40:44