Fourier analysis and convexity

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Fourier analysis and convexity
Luca Brandolini... [et al.], editors
Publisher: Boston : BirkhÃ¤user, c2004.
ISBN: 0817632638 DDC: 515.2433 LCC: QA403.5 Edition: (acid-free paper)

Book Data

Library: University of Western Ontario
Last Loaded: 10/07/2008
MARC Timestamp: 02/11/2005
Control Number Org.: DLC
Control Number: 36242068

MARC Record

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000  02930nam  2200445 a 4500
001  36242068
003  DLC
005  20050211214807.0
008  040419s2004    maua     b    000 0 eng  
010      $a2004046298
020      $a0817632638 (acid-free paper)
039      $eRD$zA
039      $aMARS
040      $aDLC$cDLC$dOrLoB$beng$dCaOLU$dOrLoB-B
042      $apcc
050  00  $aQA403.5$b.F672 2004
082  00  $a515/.2433$222
099      $aQA403.5.F672 2004
099      $aQA403.5.F672 2004
245  00  $aFourier analysis and convexity /$cLuca Brandolini
         ... [et al.], editors.
260      $aBoston :$bBirkhèauser,$cc2004.
300      $aviii, 268 p. :$bill. ;$c25 cm.
440   0  $aApplied and numerical harmonic analysis.
504      $aIncludes bibliographical references.
520  1   $a"The book presents both a broad overview of
         Fourier analysis and convexity as well as an intricate look
         at applications in some specific settings; it will be useful
         to graduate students and researchers in harmonic analysis,
         convex geometry, functional analysis, number theory,
         computer science, and combinatorial analysis. A wide
         audience will benefit from the careful demonstration of how
         Fourier analysis is used to distill the essence of many
         mathematical problems in a natural and elegant way."--BOOK
         JACKET.
650   0  $aFourier analysis.
650   0  $aConvex geometry.
650   0  $aDiscrete geometry.
700  1   $aBrandolini, Luca,$d1963-
970  21  $tLattice point problems : crossroads of number
         theory, probability theory and Fourier analysis$cJozsef
         Beck$fBeck, Jozsef$p1
970  21  $tTotally geodesic radon transform of L[superscript
         p]-functions on real hyperbolic space$cCarlos A.
         Berenstein$fBerenstein, Carlos A.$cBoris Rubin$fRubin,
         Boris.$p37
970  21  $tFourier techniques in the theory of
         irregularities of point distribution$cW. W. L. Chen$fChen,
         W. W. L.$p59
970  21  $tSpectral structure of sets of integers$cBen
         Green$fGreen, Ben$p83
970  21  $t100 years of Fourier series and spherical
         harmonics in convexity$cH. Groemer$fGroemer, H.$p97
970  21  $tFourier analytic methods in the study of
         projections and sections of convex bodies$cA.
         Koldobsky$fKoldobsky, A.$cD. Ryabogin$fRyabogin, D.$cArtem
         Zvavitch$fZvavitch, Artem$p119
970  21  $tThe study of translational tiling with Fourier
         analysis$cMihail N. Kolountzakis$fKolountzakis, Mihail
         N.$p131
970  21  $tDiscrete maximal functions and ergodic theorems
         related to polynomials$cAkos Magyar$fMagyar, Akos$p189
970  21  $tWhat is it possible to say about an asymptotic of
         the Fourier transform of the characteristic function of a
         two-dimensional convex body with nonsmooth boundary?$cA. N.
         Podkorytov$fPodkorytov, A. N.$p209
970  21  $tSome recent progress on the restriction
         conjecture$cTerence Tao$fTao, Terence$p217
970  21  $tAverage decay of the Fourier transform$cGiancarlo
         Travaglini$fTravaglini, Giancarlo$p245

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