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040   $aDip.to Filologia Class. e Scienze Filosofiche$bita
082 00$a303.48/3$222
100 1 $aGras, Alain$0140827
245 10$aFragilité de la puissance :$bse libérer de l'emprise technologique /$cAlain Gras
260   $a[Paris] :$bFayard,$cc2003
300   $a310 p. :$bill. ;$c22 cm
504   $aBibliografia: p. [295]-305
650  4$aTecnologia$xAspetti sociali
650  4$aInvenzioni$xStoria
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100   $a20140402h20132013  uy             0
101 0 $aeng
135   $aurun|---uuuua
181   $ctxt
182   $cc
183   $acr
200 10$aBochner-Riesz means on Euclidean spaces /$fShanzhen Lu, Beijing Normal University, China, Dunyan Yan, University of Chinese Academy of Sciences, China
210  1$aNew Jersey :$cWorld Scientific,$d[2013]
210  4$d?2013
215   $a1 online resource (viii, 376 pages) $cillustrations
225 0 $aGale eBooks
300   $aDescription based upon print version of record.
311   $a981-4458-76-7 
311   $a1-299-83340-3 
320   $aIncludes bibliographical references and index.
327   $aContents; Preface; 1 An introduction to multiple Fourier series; 1.1 Basic properties of multiple Fourier series; 1.2 Poisson summation formula; 1.3 Convergence and the opposite results; 1.4 Linear summation; 2 Bochner-Riesz means of multiple Fourier integral; 2.1 Localization principle and classic results on fixed-point convergence; 2.2 Lp-convergence; 2.3 Some basic facts on multipliers; 2.4 The disc conjecture and Fefferman theorem; 2.5 The Lp-boundedness of Bochner-Riesz operator T? with ? > 0; 2.6 Oscillatory integral and proof of Carleson-Sjolin theorem; 2.6.1 Oscillatory integrals
327   $a2.6.2 Proof of Carleson-Sjolin theorem2.7 Kakeya maximal function; 2.8 The restriction theorem of the Fourier transform; 2.9 The case of radial functions; 2.10 Almost everywhere convergence; 2.11 Commutator of Bochner-Riesz operator; 3 Bochner-Riesz means of multiple Fourier series; 3.1 The case of being over the critical index; 3.1.1 Bochner formula; 3.1.2 The localization theorem; 3.1.3 The maximal operator S?*; 3.2 The case of the critical index (general discussion); 3.2.1 Localization problems; 3.2.2 An example of being divergent almost everywhere
327   $a3.9 The saturation problem of the uniform approximation3.10 Strong summation; 4 The conjugate Fourier integral and series; 4.1 The conjugate integral and the estimate of the kernel; 4.2 Convergence of Bochner-Riesz means for conjugate Fourier integral; 4.3 The conjugate Fourier series; 4.4 Kernel of Bochner-Riesz means of conjugate Fourier series; 4.5 The maximal operator of the conjugate partial sum; 4.6 The relations between the conjugate series and integral; 4.7 Convergence of Bochner-Riesz means of conjugate Fourier series; 4.8 (C,1) means in the conjugate case
327   $a4.9 The strong summation of the conjugate Fourier series4.10 Approximation of continuous functions; Bibliography; Index
330   $aThis book mainly deals with the Bochner-Riesz means of multiple Fourier integral and series on Euclidean spaces. It aims to give a systematical introduction to the fundamental theories of the Bochner-Riesz means and important achievements attained in the last 50 years. For the Bochner-Riesz means of multiple Fourier integral, it includes the Fefferman theorem which negates the Disc multiplier conjecture, the famous Carleson-Sjo?lin theorem, and Carbery-Rubio de Francia-Vega's work on almost everywhere convergence of the Bochner-Riesz means below the critical index. For the Bochner-Riesz means o
606   $aFourier series
606   $aEuclidean algorithm
606   $aFourier series$xMathematical models
606   $aEuclidean algorithm$xMathematical models
615  0$aFourier series.
615  0$aEuclidean algorithm.
615  0$aFourier series$xMathematical models.
615  0$aEuclidean algorithm$xMathematical models.
676   $a515.2433
700   $aLu$b Shanzhen$f1939-$0629792
702   $aYan$b Dunyan
801  0$bMiFhGG
801  1$bMiFhGG
906   $aBOOK
912   $a9910815200403321
996   $aBochner-Riesz means on Euclidean spaces$94086004
997   $aUNINA