Chebyshev function

Results: 74



#Item
31Minimax policies for adversarial and stochastic bandits S´ebastien Bubeck SequeL Project, INRIA Lille 40 avenue Halley, 59650 Villeneuve d’Ascq, France

Minimax policies for adversarial and stochastic bandits S´ebastien Bubeck SequeL Project, INRIA Lille 40 avenue Halley, 59650 Villeneuve d’Ascq, France

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Source URL: www.princeton.edu

Language: English - Date: 2011-06-28 04:17:04
32Projection methods and the curse of dimensionality Burkhard Heera,b and Alfred Maussnerc a

Projection methods and the curse of dimensionality Burkhard Heera,b and Alfred Maussnerc a

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Source URL: www.wiwi.uni-augsburg.de

Language: English - Date: 2009-09-22 08:12:10
33Decomposition of a recursive family of polynomials ´ Andrej Dujella and Ivica Gusic Abstract We describe decomposition of polynomials fn := fn,B,a defined by

Decomposition of a recursive family of polynomials ´ Andrej Dujella and Ivica Gusic Abstract We describe decomposition of polynomials fn := fn,B,a defined by

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Source URL: bib.irb.hr

Language: English - Date: 2006-08-01 16:41:56
34LOWER BOUNDS FOR THE PRINCIPAL GENUS OF DEFINITE BINARY QUADRATIC FORMS arXiv:0811.0358v2 [math.NT] 25 Oct[removed]KIMBERLY HOPKINS AND JEFFREY STOPPLE

LOWER BOUNDS FOR THE PRINCIPAL GENUS OF DEFINITE BINARY QUADRATIC FORMS arXiv:0811.0358v2 [math.NT] 25 Oct[removed]KIMBERLY HOPKINS AND JEFFREY STOPPLE

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Source URL: arxiv.org

Language: English - Date: 2013-02-23 21:39:50
35|||| Fourier Series When the French mathematician Joseph Fourier (1768–1830) was trying to solve a problem in heat conduction, he needed to express a function f as an infinite series of sine and cosine functions: 

|||| Fourier Series When the French mathematician Joseph Fourier (1768–1830) was trying to solve a problem in heat conduction, he needed to express a function f as an infinite series of sine and cosine functions: 

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Source URL: www.stewartcalculus.com

Language: English - Date: 2013-07-22 19:09:42
36CHARACTERIZATION OF CLOSED CONVEX SUBSETS OF Rn Chebyshev Sets A subset S of a metric space X is said to be a Chebyshev set if, for every x 2 X; there is a unique point in S that is closest to x: Put di¤erently, S is Ch

CHARACTERIZATION OF CLOSED CONVEX SUBSETS OF Rn Chebyshev Sets A subset S of a metric space X is said to be a Chebyshev set if, for every x 2 X; there is a unique point in S that is closest to x: Put di¤erently, S is Ch

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Source URL: files.nyu.edu

Language: English - Date: 2007-10-09 18:14:10
37˝ SIEVING AND THE ERDOS–KAC THEOREM Andrew Granville Universit´e de Montr´eal K. Soundararajan

˝ SIEVING AND THE ERDOS–KAC THEOREM Andrew Granville Universit´e de Montr´eal K. Soundararajan

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Source URL: www.dms.umontreal.ca

Language: English - Date: 2006-06-21 10:22:30
38BOOK REVIEWS 403 BULLETIN(New Series)OF THE AMERICANMATHEMATICALSOCIETY

BOOK REVIEWS 403 BULLETIN(New Series)OF THE AMERICANMATHEMATICALSOCIETY

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Source URL: www.ams.org

Language: English - Date: 2010-03-29 15:28:12
39SIAM J. SCI. COMPUT. Vol. 18, No. 2, pp. 403–429, March 1997 c 1997 Society for Industrial and Applied Mathematics

SIAM J. SCI. COMPUT. Vol. 18, No. 2, pp. 403–429, March 1997 c 1997 Society for Industrial and Applied Mathematics

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Source URL: www.math.nyu.edu

Language: English - Date: 2006-01-22 02:28:54
4018 Chapter 1. Preliminaries

18 Chapter 1. Preliminaries

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Source URL: www.nr.com

Language: English - Date: 2007-05-12 17:37:54