LEADER 05043nam  2200661Ia 450 
001 9910143508503321
005 20170815110110.0
010   $a1-280-54195-4
010   $a9786610541959
010   $a0-471-65399-3
010   $a0-471-72223-5
035   $a(CKB)111087027145344
035   $a(EBL)469233
035   $a(OCoLC)53371691
035   $a(SSID)ssj0000157675
035   $a(PQKBManifestationID)11148855
035   $a(PQKBTitleCode)TC0000157675
035   $a(PQKBWorkID)10139895
035   $a(PQKB)10270467
035   $a(MiAaPQ)EBC469233
035   $a(PPN)198592760
035   $a(EXLCZ)99111087027145344
100   $a19991104d2000      uy             0
101 0 $aeng
135   $aur|n|---|||||
181   $ctxt
182   $cc
183   $acr
200 10$aFourier analysis of time series$b[electronic resource] $ean introduction /$fPeter Bloomfield
205   $a2nd ed.
210   $aNew York $cWiley$dc2000
215   $a1 online resource (285 p.)
225 1 $aWiley series in probability and statistics. Applied probability and statistics section
300   $a"A Wiley-Interscience publication."
311   $a0-471-88948-2 
320   $aIncludes bibliographical references (p. 247-254) and indexes.
327   $aContents; 1 Introduction; 1.1 Fourier Analysis; 1.2 Historical Development of Fourier Methods; 1.3 Why Use Trigonometric Functions?; 2 Fitting Sinusoids; 2.1 Curve-Fitting Approach; 2.2 Least Squares Fitting of Sinusoids; 2.3 Multiple Periodicities; 2.4 Orthogonality of Sinusoids; 2.5 Effect of Discrete Time: Aliasing; 2.6 Some Statistical Results; Appendix; 3 The Search for Periodicity; 3.1 Fitting the Frequency; 3.2 Fitting Multiple Frequencies; 3.3 Some More Statistical Results; Appendix; 4 Harmonic Analysis; 4.1 Fourier Frequencies; 4.2 Discrete Fourier Transform
327   $a4.3 Decomposing the Sum of Squares4.4 Special Functions; 4.5 Smooth Functions; 5 The Fast Fourier Transform; 5.1 Computational Cost of Fourier Transforms; 5.2 Two-Factor Case; 5.3 Application to Harmonic Analysis of Data; 6 Examples of Harmonic Analysis; 6.1 Variable Star Data; 6.2 Leakage Reduction by Data Windows; 6.3 Tapering the Variable Star Data; 6.4 Wolf's Sunspot Numbers; 6.5 Nonsinusoidal Oscillations; 6.6 Amplitude and Phase Fluctuations; 6.7 Transformations; 6.8 Periodogram of a Noise Series; 6.9 Fisher's Test for Periodicity; Appendix; 7 Complex Demodulation; 7.1 Introduction
327   $a7.2 Smoothing: Linear Filtering7.3 Designing a Filter; 7.4 Least Squares Filter Design; 7.5 Demodulating the Sunspot Series; 7.6 Complex Time Series; 7.7 Sunspots: The Complex Series; Appendix; 8 The Spectrum; 8.1 Periodogram Analysis of Wheat Prices; 8.2 Analysis of Segments of a Series; 8.3 Smoothing the Periodogram; 8.4 Autocovariances and Spectrum Estimates; 8.5 Alternative Representations; 8.6 Choice of a Spectral Window; 8.7 Examples of Smoothing the Periodogram; 8.8 Reroughing the Spectrum; Appendix; 9 Some Stationary Time Series Theory; 9.1 Stationary Time Series
327   $a9.2 Continuous Spectra9.3 Time Averaging and Ensemble Averaging; 9.4 Periodogram and Continuous Spectra; 9.5 Approximate Mean and Variance; 9.6 Properties of Spectral Windows; 9.7 Aliasing and the Spectrum; 10 Analysis of Multiple Series; 10.1 Cross Periodogram; 10.2 Estimating the Cross Spectrum; 10.3 Theoretical Cross Spectrum; 10.4 Distribution of the Cross Periodogram; 10.5 Distribution of Estimated Cross Spectra; 10.6 Alignment; Appendix; 11 Further Topics; 11.1 Time Domain Analysis; 11.2 Spatial Series; 11.3 Multiple Series; 11.4 Higher Order Spectra
327   $a11.5 Nonquadratic Spectrum Estimates11.6 Incomplete and Irregular Data; References; Author Index; A; B; C; D; E; F; G; H; I; J; K; L; M; N; O; P; Q; R; S; T; U; V; W; Subject Index; A; B; C; D; E; F; G; H; I; J; L; M; N; O; P; Q; R; S; T; V; W
330   $aA new, revised edition of a yet unrivaled work on frequency domain analysis Long recognized for his unique focus on frequency domain methods for the analysis of time series data as well as for his applied, easy-to-understand approach, Peter Bloomfield brings his well-known 1976 work thoroughly up to date. With a minimum of mathematics and an engaging, highly rewarding style, Bloomfield provides in-depth discussions of harmonic regression, harmonic analysis, complex demodulation, and spectrum analysis. All methods are clearly illustrated using examples of specific data sets, while ampl
410  0$aWiley series in probability and statistics.$pApplied probability and statistics.
606   $aTime-series analysis
606   $aFourier analysis
615  0$aTime-series analysis.
615  0$aFourier analysis.
676   $a515.2433
676   $a519.5/5
676   $a519.55
700   $aBloomfield$b Peter$f1946-$0254675
801  0$bMiAaPQ
801  1$bMiAaPQ
801  2$bMiAaPQ
906   $aBOOK
912   $a9910143508503321
996   $aFourier analysis of time series$968132
997   $aUNINA

LEADER 01125nam a2200301 i 4500
001 991003498019707536
005 20020509123236.0
008 990310s1970    fr            ||| | fre  
035   $ab1117125x-39ule_inst
035   $aPARLA183126$9ExL
040   $aDip.to Scienze dell'Antichitŕ$bita
041 0 $afrelat
082 0 $a870.01
100 1 $aSidonius, Caius Sollius Apollinaris$0480796
245 10$aLettres :$blivres 6.-9. /$cSidoine Apollinaire ; texte établi et traduit par André Loyen
260   $aParis :$bLes Belles Lettres,$c1970
300   $a260 p. (8-182 doppie) ;$c20 cm.
490 0 $aCollection des Universités de France. Série latine
500   $aTesto latino a fronte.
650  4$aSidonio Apollinare - Epistolario
700 1 $aLoyen, André
740 0 $aEpistulae [Sidonio]
907   $a.b1117125x$b23-02-17$c28-06-02
912   $a991003498019707536
945   $aLE007 I Coll. 4 Sidonius 02,2$g1$i2015000033390$lle007$o-$pE0.00$q-$rn$so  $t0$u0$v0$w0$x0$y.i11316718$z28-06-02
996   $aLettres$9872263
997   $aUNISALENTO
998   $ale007$b01-01-99$cm$da  $e-$ffre$gfr $h0$i1