Transcendental numbers

Results: 66



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1Algebra 2. Teorema di Lindemann-Weierstrass. Roma, gennaio 2010 In this note we present Baker’s proof of the Lindemann-Weierstrass Theorem. Let Q denote the algebraic closure of Q inside C.

Algebra 2. Teorema di Lindemann-Weierstrass. Roma, gennaio 2010 In this note we present Baker’s proof of the Lindemann-Weierstrass Theorem. Let Q denote the algebraic closure of Q inside C.

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Source URL: www.mat.uniroma2.it

Language: English - Date: 2010-01-22 06:36:10
2Errata for ”Adaptive Covering Codes in the q-ary Hypercube” January 14, 2013 Location Statement of Lemma 4, third sentence

Errata for ”Adaptive Covering Codes in the q-ary Hypercube” January 14, 2013 Location Statement of Lemma 4, third sentence

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Source URL: math.iit.edu

Language: English - Date: 2013-01-23 01:20:28
3BIT 41(3), pp. 540–562, 2001 RIGOROUS AND PORTABLE STANDARD FUNCTIONS SIEGFRIED M. RUMP Inst. of Computer Science III, Technical University Hamburg-Harburg, Schwarzenbergstr. 95, 21071 Hamburg, Germany. rump@tu-harbur

BIT 41(3), pp. 540–562, 2001 RIGOROUS AND PORTABLE STANDARD FUNCTIONS SIEGFRIED M. RUMP Inst. of Computer Science III, Technical University Hamburg-Harburg, Schwarzenbergstr. 95, 21071 Hamburg, Germany. rump@tu-harbur

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Source URL: www.ti3.tu-harburg.de

Language: English - Date: 2005-11-23 09:28:16
4ALGEBRAIC STRUCTURE AND DEGREE REDUCTION Let S ⊂ Fn . We define deg(S) to be the minimal degree of a non-zero polynomial that vanishes on S. We have seen that for a finite set S, deg(S) ≤ n|S|1/n . In fact, we can sa

ALGEBRAIC STRUCTURE AND DEGREE REDUCTION Let S ⊂ Fn . We define deg(S) to be the minimal degree of a non-zero polynomial that vanishes on S. We have seen that for a finite set S, deg(S) ≤ n|S|1/n . In fact, we can sa

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Source URL: math.mit.edu

Language: English - Date: 2012-10-10 15:15:19
5A MODIFIED BERNOULLI NUMBER D. Zagier The classical Bernoulli numbers Bn , defined by the generating function ∞

A MODIFIED BERNOULLI NUMBER D. Zagier The classical Bernoulli numbers Bn , defined by the generating function ∞

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Source URL: people.mpim-bonn.mpg.de

Language: English - Date: 2011-06-28 09:33:56
6On Cobham’s theorem for Gaussian integers Wieb Bosma∗, Robbert Fokkink, and Thijmen Krebs † June 2014

On Cobham’s theorem for Gaussian integers Wieb Bosma∗, Robbert Fokkink, and Thijmen Krebs † June 2014

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Source URL: www.math.ru.nl

Language: English - Date: 2014-10-29 10:35:56
7COMPLEX NUMBERS WITH BOUNDED PARTIAL QUOTIENTS WIEB BOSMA AND DAVID GRUENEWALD Abstract. Conjecturally, the only real algebraic numbers with bounded partial quotients in their regular continued fraction expansion are rat

COMPLEX NUMBERS WITH BOUNDED PARTIAL QUOTIENTS WIEB BOSMA AND DAVID GRUENEWALD Abstract. Conjecturally, the only real algebraic numbers with bounded partial quotients in their regular continued fraction expansion are rat

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Source URL: www.math.ru.nl

Language: English - Date: 2011-09-16 10:50:18
8

PDF Document

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Source URL: www.math.washington.edu

Language: English - Date: 2014-09-03 14:42:32
9The List Update Problem: Improved Bounds for the Counter Scheme Micha Hofri† Dept. of Computer Science Rice University Houston TX 77005

The List Update Problem: Improved Bounds for the Counter Scheme Micha Hofri† Dept. of Computer Science Rice University Houston TX 77005

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Source URL: www.cs.technion.ac.il

Language: English - Date: 2005-12-15 16:28:39
10Arithmetica Logarithmica 3-1 Chapter Three Synopsis: Chapter Three.

Arithmetica Logarithmica 3-1 Chapter Three Synopsis: Chapter Three.

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Source URL: www.17centurymaths.com

Language: English - Date: 2006-09-04 00:33:53