000 02201nam a2200361 i 4500
008 020412s2002 nyu b 001 0 eng
010 _a2002067363
020 _a0521890535
_q(paperback)
020 _a9780521890533
_q(paperback)
035 _a(OCoLC)49627734
_z(OCoLC)51623485
040 _aDLC
_beng
_cDLC
_dBAKER
_dBTCTA
_dLVB
_dYDXCP
_dOCLCG
_dOCLCA
_dUKM
_dUBY
_dOCLCQ
_dBDX
_dOCLCF
_dOCLCO
_dNJI
_dBAUN
049 _aBAUN_MERKEZ
050 0 4 _aQA404
_b.Z9 2002
100 1 _aZygmund, Antoni,
_d1900-1992
245 1 0 _aTrigonometric series /
_cA. Zygmund
250 _a3rd ed. /
_bvolumes I & II combined, with a foreword by Robert Fefferman
264 1 _a[Cambridge, UK ;
_aNew York :
_bCambridge University Press,
_c[2002]
264 4 _c©2002
300 _axiii, 383, vii, 364 pages ;
_c23 cm
336 _atext
_btxt
_2rdacontent
337 _aunmediated
_bn
_2rdamedia
338 _avolume
_bnc
_2rdacarrier
490 1 _aCambridge mathematical library
500 _aCover title
504 _aIncludes bibliographical references (pages 336-351 (2nd set)) and index
505 0 0 _gSection 1: --
_gI.
_tTrigonometric series and Fourier series; Auxiliary results --
_gII.
_tFourier coefficients; Elementary theorems on the convergence of S[f] and ̃S[f] --
_gIII.
_tSummability of Fourier series --
_gIV.
_tClasses of functions and Fourier series --
_gV.
_tSpecial trigonometric series --
_gVI.
_tThe absolute convergence of trigonometric series --
_gVII.
_tComplex methods in Fourier series --
_gVIII.
_tDivergence of Fourier series --
_gIX.
_tRiemann's theory of trigonometric series --
_gSection 2: --
_gX.
_tTrigonometric interpolation --
_gXI.
_tDifferentiation of series; Generalized derivatives --
_gXII.
_tInterpolation of linear operations; More about Fourier coefficients --
_gXIII.
_tConvergence and summability almost everywhere --
_gXIV.
_tMore about complex methods --
_gXV.
_tApplications of the Littlewood-Paley function to Fourier series --
_gXVI.
_tFourier integrals --
_gXVII.
_tA topic in multiple Fourier series
650 0 _aFourier series
710 2 _972911
_aCambridge University Press.
830 0 _9110177
_aCambridge mathematical library.
900 _a23663
900 _bsatın
942 _2lcc
_cKT
999 _c19211
_d19211