21![How Euler Did It by Ed Sandifer Formal Sums and Products July 2006 Two weeks ago at our MAA Section meeting, George Andrews gave a nice talk about the delicate and beautiful relations among infinite sums, infinite produc How Euler Did It by Ed Sandifer Formal Sums and Products July 2006 Two weeks ago at our MAA Section meeting, George Andrews gave a nice talk about the delicate and beautiful relations among infinite sums, infinite produc](https://www.pdfsearch.io/img/fef03bb5a8b5e7d73960158569863a50.jpg) | Add to Reading ListSource URL: eulerarchive.maa.orgLanguage: English - Date: 2013-11-04 12:20:24
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22![EAS Update March 2016 Number 8 EAS HEADQUARTERS’ VISIT BY DEPUTY PRIME MINISTER EAS Update March 2016 Number 8 EAS HEADQUARTERS’ VISIT BY DEPUTY PRIME MINISTER](https://www.pdfsearch.io/img/a546a0078c940bc8f9b5fd6e5deecf74.jpg) | Add to Reading ListSource URL: www.eas-et.orgLanguage: English - Date: 2016-06-24 07:52:11
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23![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, 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,](https://www.pdfsearch.io/img/2c50b779db91905a75f94cad7cf3f8a3.jpg) | Add to Reading ListSource URL: www2.math.kyushu-u.ac.jpLanguage: English |
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24![MATHEMATICS OF COMPUTATION SArticle electronically published on February 15, 2002 CLASS NUMBERS OF REAL CYCLOTOMIC FIELDS OF PRIME CONDUCTOR MATHEMATICS OF COMPUTATION SArticle electronically published on February 15, 2002 CLASS NUMBERS OF REAL CYCLOTOMIC FIELDS OF PRIME CONDUCTOR](https://www.pdfsearch.io/img/9fdff1ffdcada625407e1585abf93b6e.jpg) | Add to Reading ListSource URL: www.mat.uniroma2.itLanguage: English - Date: 2002-11-22 18:43:22
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25![Algorithms and Data Structures Winter TermExercises for UnitLet U = {0, 1, . . . , K − 1}, let p ≥ K be a prime number, and let 0 < t < K. For 0 ≤ a, b < p define Algorithms and Data Structures Winter TermExercises for UnitLet U = {0, 1, . . . , K − 1}, let p ≥ K be a prime number, and let 0 < t < K. For 0 ≤ a, b < p define](https://www.pdfsearch.io/img/943caf47c5be816521797a110fe61b0a.jpg) | Add to Reading ListSource URL: www-tcs.cs.uni-sb.deLanguage: English - Date: 2016-03-06 16:06:05
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26![Mathematics Grade 6 Student Edition G6 Playlist: Finding Greatest Common Factors and Least Mathematics Grade 6 Student Edition G6 Playlist: Finding Greatest Common Factors and Least](https://www.pdfsearch.io/img/fe8c1a88787cb10cfe52ef16c5c4deae.jpg) | Add to Reading ListSource URL: www.wisewire.comLanguage: English - Date: 2016-06-25 15:44:59
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27![SMOOTH NUMBERS AND THE QUADRATIC SIEVE Carl Pomerance When faced with a large number n to factor, what do you do first? You might say “Look at the last digit,” with the idea of cheaply pulling out possible factors of SMOOTH NUMBERS AND THE QUADRATIC SIEVE Carl Pomerance When faced with a large number n to factor, what do you do first? You might say “Look at the last digit,” with the idea of cheaply pulling out possible factors of](https://www.pdfsearch.io/img/7dc121e9c81405f2324aec29df809b4a.jpg) | Add to Reading ListSource URL: www.mat.uniroma2.itLanguage: English - Date: 2007-11-23 17:17:47
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28![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 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](https://www.pdfsearch.io/img/628d816c776229a919d42904a49b9661.jpg) | Add to Reading ListSource URL: www2.math.kyushu-u.ac.jpLanguage: English - Date: 2016-06-23 04:17:05
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29![Integer factorization, part 1: the Q sieve Integer factorization, part 2: detecting smoothness D. J. Bernstein Integer factorization, part 1: the Q sieve Integer factorization, part 2: detecting smoothness D. J. Bernstein](https://www.pdfsearch.io/img/a50d6493e6af5c9f48724e4c6e1de1cb.jpg) | Add to Reading ListSource URL: www.mat.uniroma2.itLanguage: English - Date: 2006-11-12 13:56:00
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30![CONSTRUCTION OF MAXIMAL UNRAMIFIED p-EXTENSIONS WITH PRESCRIBED GALOIS GROUPS MANABU OZAKI (KINKI UNIVERSITY) 1. Introduction For any number field F (not necessary of finite degree) and prime CONSTRUCTION OF MAXIMAL UNRAMIFIED p-EXTENSIONS WITH PRESCRIBED GALOIS GROUPS MANABU OZAKI (KINKI UNIVERSITY) 1. Introduction For any number field F (not necessary of finite degree) and prime](https://www.pdfsearch.io/img/bd4812d92adb4f116ca30716b9f42a1f.jpg) | Add to Reading ListSource URL: staff.miyakyo-u.ac.jpLanguage: English - Date: 2008-10-20 09:16:54
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