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Radio Science,Volume 33, Number3, Pages463-474, May-June 1998 Contribution to the problem of near-zone Doppler effect Yehuda Ben-Shimol inverse and Dan Censor Department of Electrical and Computer Engineering,Ben-Gurion University of the Negev Beer-Sheva, Israel Abstract. The existenceof an inverseDoppler effect in free spaceis again scrutinized, followingsome papers predicting the existenceof such phenomenain the near zone of a moving oscillatingthree-dimensionaldipole. In the presentpaper the wave scatteredfrom a perfectly conductingthin cylinder moving in the presenceof a plane electromagnetic wave is analyzed. The responseof such a cylinder may be consideredas due to either a two-dimensionalmonopoleor a two-dimensionaldipole in accordancewith the polarization of the incident wave. An intensivenumerical spectral estimation basedon the fundamental definitionsof the terms "frequency,""spectrum," and "uncertainty" is performed on the scatteredwave at various ranges. An inverseDoppler effect was not found for the twodimensionalcase. The same analysiswas applied to the caseof a moving three-dimensional radiating dipole, reconfirmingpreviousresults which showedthe presenceof an inverse Doppler effect in the near zone of the three-dimensionaldipole. 1. Introduction sionson inverseDopplereffectin freespace[Engheta When an observerin free spaceis in motion rela- et al., 1980;Engheta,1990],whichanalyzethe elective to a monochromaticsource,the frequencymea- tromagneticfield of an oscillatingthree-dimensional of a moving sured by him/her will be higher than the source- (3-D) dipolein freespacein thepresence observer. However, these two cases are different, refrequency(blue shift) when approachingthe source castingtheir different spectral contents. In the case and lower (red shift) when receding. This effect is media(e.g.,unmagnetized coldplasma), known as the Doppler effect [Doppler,1842] and of dispersive has servedas a major subject for researchersdealing the discussionmay be restricted to a plane wave of with variousapplicationsof this phenomenon(see certain frequency, and the Doppler effect is thereGill [1965]for a goodintroductionto the Doppler fore evident. On the other hand, the componentsof effect). The term "inverseDoppler effect" is asso- the fieldswhich are radiated from the oscillating3-D ciated with the possibility that an approachingob- dipole, as measuredby a moving observer,may be serverwill recognizea red shift, and a recedingone, representedin the form of time-varying amplitude a blue shift. Even if at a first glance such a phe- A(t) multiplied by an exponent of a time-varying nomenonmay sound unrealistic, some publications phase4•(t), i.e., mention the possibility of an inverseDoppler effect in movingdispersivemedia (for example,unmagne- s(t) - A(t)ei'•(t) (1) tized coldplasma) [Frank,1943;Papas,1965;Ryd- In general,s(t) cannot be representedby a singlebeck,1960]wherethe inverseeffectmay occurunder frequencycomponent, and one must considerthe efspecial circumstances.There are also other discus- fect of the motion on both A(t) and •b(t). Therefore the simple(and intuitive) definitionfor the Doppler Copyright1998by the AmericanGeophysical Union. Paper number 98RS00033. 0048-6604 / 98/ 98RS-00033$11.00 463 effect as usually given for plane wavesis no longer appropriate, and new definitions must be specified. The spectral analysis of signals which are representedby (1) may be called "time-frequencyanalysis" and already constitutes a fundamental research 464 BEN-SHIMOL AND CENSOR: NEAR subjectfor many decades(see Cohen[1995]for a summaryand referenceson this subject). The basic objectiveof suchtime-frequencyanalysisis to devise a function that will describethe energy densityof a given signal in time and frequency. Analysis of the propertiesof such densitiesis basedon analytic signals,whichare in the form of (1), and their imaginary part is constructed from the Hilbert transform ZONE INVERSE DOPPLER EFFECT ciesis, and the mean frequency(i.e., instantaneous frequency)no longerservesas a goodmeasurefor the signal'sfrequency. Common motion to all situations is a "collision" of "head-on" between observer the observer and the dipole, i.e., overlappingof position, thus generating infinite field values. Furthermore, the analysisgiven by Enghetaet al. [1980]and Engheta[1990]did not considerthe properties of the amplitude which vary complex representationof signalsand waves which rapidly in the near zone of the dipole. The effects is common in electromagnetictheory is constructed of suchamplitude changeson the spectrum(or endifferently(i.e., quadraturerepresentation) but may ergy density)do not appearin the instantaneousfreserve as a good approximation to the analytic repre- quency, which is computed from the phase alone. In order to enhancethe analysis,the effect of amsentationfor band-limitedsignalsor, moregenerally, for signalswhen most of the spectrum residesin the plitude changesmust be consideredtoo; thus parameters such as the instantaneous frequency must be positive side of the frequency axis. The purpose of the present work is to study the examinedcarefully with regard to the signal'sbandphenomenonof the near-zone Doppler effect in free width 2a, as done in the present work. In addition to the "instantaneous methods" it was space on the basis of time-frequency analysis. The decided in the present work to examine the Doppler caseof a radiating infinitesimal 3-D dipole has been investigated previouslyby Enghetaet al. [1980]and effectin the far and near zoneof the radiating dipole Engheta[1990],who represented the analyzedwave on the basis of short-time Fourier spectral analysis. in the form of (1) and definedthe Doppler shift as The spectrogrammethod (which is basedon shortthe differencebetween the instantaneousfrequency time Fourieranalysis)usesboth amplitudeand phase as measuredby the moving observerand the intrinsic in the calculation, thus preventingpotentially errofrequencyof 3-D dipole oscillations. Accordingto neous interpretations which are based on the phase this definition, an inverse Doppler shift was found only. The phenomenonof inverse Doppler effect in the in the near zone of the 3-D dipole for some casesof observer motion. near zone of the 3-D elementary dipole is somewhat unrealistic,becausethe effectsof the systemexciting Usually, the instantaneousfrequency the dipole and the associatedcircuitry are ignored. aO(t) This motivates the investigation of the near-zone at (2) Doppler effect of scatteringby two-dimensional(2is usedas a generalizationof the term "frequency" D) monopoleand dipole where the excitation is exin cases where the amplitude is constant or varies ternal, for example, an incident plane wave. Accordslowly,i.e., caseswhich match the common intuition. ingly,the oscillating3-D dipolediscussed by Engheta Analysisof morecomplicatedcasesmust rely on en- et al. [1980]wasreplacedby a perfectlyconducting, ergydistributions,and for mostof them the envelope thin cylinder moving in free spacein the presenceof is concentrated in the vicinity of the instantaneous an exciting plane wave. The responseof the cylin• ......... •"• instantaneousfrequencyis not a local der may be taken to be due to a 2-D monopoleor parameteras one may deducefrom (2); it is actually a 2-D dipole(in additionto a 2-D monopoleterm) the averageof all frequenciesin a given time. Since for electric or magnetic polarization of the incident the spreadof the frequenciesis determinedby the planewave,respectively.Van Bladel [1985]give a behavior of the signal's amplitude, a measurement good summary of the spectral properties of the reof this spread may be defined as flectedwavein the far zone. Michielsenet al. [1981] of the realpart [Papoulis, 1977;Vakman,1968].The and de Zutter [1982,1987]providegeneralanalyti(3) cal calculationof the Fourier spectraof the scattered and 2a is sometimes called the instantaneous band- wave(for 3-D casesalso). A fixed observerpositionedat the origin of the width of the signal. The larger the instantaneous laboratory frame of referencemeasuresthe scattered bandwidthgets,the widerthe spreadof the frequen- wave which contains information on the motion of the BEN-SHIMOL AND CENSOR: NEAR ZONE INVERSE DOPPLER EFFECT 465 scatterer. The observer'spositionwas slightlydis- terer. An inverse Doppler effect has not been deplaced,to preventa collisionwith the movingcylin- tected in the near zoneof the movingcylinder. der, and thusthe amplitudesof the electromagnetic fieldsremain finite. However,the smallerthe offseta gets(seeFigure6), the higherthe valueof the fields are in the near zone. 2. The Three-Dimensional Dipole In this sectionwe will describesuccinctlythe anal- While performinga spectralanalysis,the principle ysisreportedby Enghetaet al. [1980]and Engheta of uncertaintyshouldbe bornein mind;that is, when [1990]. Only the parts whichare most essentialto of this paper are included. Figure 1 dealingwith real situations,signalsof infinite time the discussion describes the analyzed configuration,in which an indurationare not available,and the spectralanaly- finitesimal,oscillatingelectricdipole is positionedat "uncertainty"in the contextof signalanalysis,which the origin of the laboratory frame of referenceand shouldnot confused with the principleof uncertainty lying along the z axis. An observeris movingwith of quantummechanics. The FouriertransformS(w) constant velocity in free spaceand measuresthe electromagneticfields which are radiated by the dipole of the deterministic time signals(t) is givenby sis turns to spectral estimation. We use the term for few cases of motion direction. Let us denote the laboratory frame of referenceby F and the frame S(w)- s(t)e-i•tdt (4) of referencecomovingwith the observerby F•. The and the powerspectrumPs(w) is definedby -IS()l 2 (5) and involvesvaluesof s(t) of all times. If s(t) representsthe measuredsignal, its exact spectral content electromagneticfieldsof the oscillatingelectricdipole in F are givenby equations(1) and (2) of Enghetaet a/.[1980].(Note that there are some typographical errorsin Engheta[1990].) In the first case,whichEnghetaet al. [1980]and Engheta[1990]analyzed,the observermoveson the equatorialplane of the dipole, along the y axis from y - -c• to y - c• with constant velocity v - v•. It is givenby (5) without usbeingableto associateeach is evidentthat the observerapproachesthe dipolefor spectralcomponentwith its rangein space(i.e., we t• < 0 and recedesfrom the dipolefor t• > 0. Using have here a completeuncertainty of range), so the the transformationsof specialrelativity, we get spectral contentsof the near and far zonesfrom both approachingand recedingscattererswould be inseparable. In order to increaserange accuracy,the mea- sured signal is sliced to overlappingsegments,and a spectral analysis is performed separately on each segment,usingthe short-time Fourier transform sr½o)dto z to+T The finite duration of the segmentedsignal,T, broadens the spectrum, and this broadeningis increased as the duration of the segmentdiminishes. The implication of such broadening is an increase in the uncertaintyof the spectralcomponents[Papoulis, 1977; Vakman,1968]. It is interestingto note that the uncertainty principle applies also to the mea- surementof the instantaneous frequency [Papoulis, 1977; Vakman,1968]. In the presentcase,there is no unique way of defining the optimal time segment width, and hencea variety of width valueswas tested during the simulation in order to detect an inverse Doppler effect in the near zone of the moving scat- Figure 1. An infinitesimaloscillatingelectricdipole positionedat the origin of the laboratoryframe of reference. 466 BEN-SHIMOL AND CENSOR: NEAR ZONE INVERSE DOPPLER EFFECT •m'•' (,B=0.01) I Red Shift Ap.•roaching E and •gfromDigole --•--[iw(ik- ,-•)+ v (,ik ;p (•t,)•. 1+ 4wvt' , exp[i (kv - w) t'] t' > 0 H•,- _r__ [-iw (ik +v-•) -v i(%_• +t'(vtl,)•. _k2)] exp[-i(kv+w)t'] <0 4wvt' -1 -4 -2 0 2 4 kvt' (S) where p is the electric dipole moment, eo is the per- Figure3. Normalized Doppler shiftr•m,,,forH•, in mittivity of free space,k - w/c, and c is the speed the equatorialplane of the dipole. Positiveand negative valuescorrespondto red and blue Doppler shifts, of light in free space. (Recomputed after Engheta[1990]). In order to representthe electromagneticfields in respectively. F' in the form of (1) (whichis actually a quadrature representation),one may write w' = w[1-/•V] exp(i•'e'0') exp(-iwt') (9) (10) where I d•' exp(i•'m,•, ) exp(-iwt') •]- kvdr' (11) , •'•,0,,•,•,0, areusedfortheelectric Themotion affects theamplitudes E'•,, H,, and andthenotations the phases•he, ' o,, •hm,•,whichmay be measured by the observerin F'. Neglectingthe effectof the motion on the amplitudes(and the spectrum)Enghetaet al. [1980]usedthe time derivativeof the phases and%h'm, •, fortheelectric andmagnetic fieldsofthe and magneticfields,respectively. Similarnotationis usedlaterfor r/. From(10) it is understood that r/ represents the normalized difference in the instanta- neous frequencies between F and F' frames and is given by 3-D dipole, respectively. The instantaneousfrequencyin F' frame for low velocities(i.e., 7 --- 1) is givenby t 7]e' O'-- 2 2 t 2 [(kvt')• (l+•)--l]2qt-[kvt' (1+•)]• t' <0 (12) %'0' (? =0.0•) IRedShifil 0.5 I [(kvt')2(i-/•)t'> 0 [(kvt ) (1-/•)-1] +[k•t (1-/•)] [(kvt')2(i+$)-l] --(1+•) for the electric field and -Approaching Dip / •m'qb' -- t'>O I [(kvt,)2(l_l•)+ [(kvt')2(1--•)+•]2+[kvt'(1--•)]2 _ [(kvt')2(1+l•)-l•]2-l•(1+l •) t' <0 [(kvt')2(1+ l•) _l•]2+[kvt' (1+ l•)]2 (13) Plotsof r•e,0,andr•,,,, are givenin Figures2 and3, respectively,showingan inverseDoppler effectin the -0.5 -1 near zoneof the dipole,accordingto the definitions givenin (11) and (10). ' J[ /Recidine from •ioole The above difficulties, which arise from the defi-4 -2 0 2 4 Figure 2. NormalizedDopplershifttie,s, for E•, in the equatorialplane of the dipole. Positiveand negative valuescorrespondto red and blue Doppler shifts, respectively. (Recomputed after Engheta[1990]). nition of the instantaneous frequency,may lead us to erroneous physicalinterpretations of the analyzed phenomenon (i.e., the Dopplershift in the present case).If a phenomenon suchasillustrated by theexample,whichis describedin the appendix,doesexist BEN-SHIMOL AND CENSOR: NEAR ZONE in the present case, the determination of the inverse Doppler effect may be incorrect. In spite of the mentioneddifficulties,in many cases the instantaneousfrequency is consideredas an in- INVERSE DOPPLER EFFECT 467 lOO lO stantaneousparameter, i.e., the frequencyof the signal at a given time t is determined locally with no concernto the signal's properties in the past or the future. However, the definition of the instantaneous frequencyis associatedwith analytic signals,which, in turn, are calculatedby usingthe signalvaluesfor all times. Actually, the instantaneousfrequencyis o.1 O.Ol -3 -2 -1 o 1 2 3 the averagefrequencyat a giventime [Cohen,1995], and the spreadof signal'senergyaroundthis average Figure 4. Instantaneousquality factor Q for the (3-D) dipole. frequency(i.e., instantaneous bandwidth)will deter- electricfield of the three-dimensional The inverseeffect residesbetweeneach pair of bold mine whether the use of the averageis appropriate points and is acceptedonly for large Q values. in the case at hand. In other words, one must con- sider the effect of the motion on the amplitude. The ratio between the instantaneousfrequency and the instantaneousbandwidth may be called an "instantaneousquality factor" (similar to the definitionof the quality factor in filter theory) Q, i.e., for the magneticfield. LargeQ factors(i.e., Q > > 1) indicate narrow bandwidth, and the use of instantaneousfrequencyas the dominant frequencyin F' frame is valid. In contrast, small Q values (i.e., 1) indicatethat the bandwidthis wide and the instantaneousfrequency cannot represent the meaUsing(7) and (8), the normalizedinstantaneous band- sured signal as a dominant frequency. Figures 4 and width (2a) is given by 5 showthe behavior of Q versuskvt' for different values of the observer'svelocity. It seemsthat for the electric field, the use of the instantaneousfrequency is valid for most of the range, showing that an inkv dt • verseeffect doesexist. As for the magnetic field, the inverse effect which was reported by Engheta et al. Q- 2a' (kvt') (•t') (14) Q < < [1980]and Engheta[1990],happensverynearto the [(kvt')2(l+B)-l]2+[(kvt')(l+B)] 2 fort • <0 [(k•t,)•(1-•)-l?+[(•t,)(1-•)] dipole'slocation where Q valuesare relatively small, or, in other words, the inverse effect is acceptable only for very small/• values(i.e.,/• (0.01). In many cases(i.e., for signalsof relativelylargeQ factors) the instantaneousfrequencycoincideswith • fort' >0 fortheelectric field and (15)the of the maximum of the distribution ver- sus time, and therefore if one determines the frequencyof the signal as the frequencywhere the max- 1 imal powerspectrum(or distribution)occurs,the re- dt' _ • ((•+•)(•')•-•)•+•[(•-•)(•')•+•]_ (•t,) (•t)[((•+•)(•t ) -•) +[(•t )(•+•)]'] for t' • 0 (kvt') location [(1-B)(kvt,)2-B]2+[(kvt,)(1-B)] 2 for t' • 0 (16) sultswill likely be identical. Another fact which must be remembered is that in reality the observer may only measurereal signalswhich do not come in the form A(t)cos•b(t). Therefore, in order to calculate the dominant frequency,one must calculate an analytic complexsignal (by usingthe Hilbert transform of the real part as the imaginary part of the complex signal)from which the phasemay be determinedor, alternatively, use spectral techniques. 468 BEN-SHIMOL AND CENSOR: NEAR INVERSE DOPPLER 2o',. LO-3 of the instantaneouscylinder'spositionin Fo). i n-S the transformationsof specialrelativity. In Figure 6 the y axes of ro and r• coincideat t• = to = 0; and The calculation -3 -2 -1 0 1 2 3 a is the minimal Figure 5. Instantaneousquality factor Q for the magnetic field of the 3-D dipole. The inverseeffect residesbetweenthe bold point and the vertical axis and is acceptedonly for large Q values. 3. EFFECT of reference. The incident plane wave may be electrically polarized or magnetically polarized parallel to the cylinder's axis. A fixed observer,positioned at the origin of the laboratory frame of referenceFo, measuresthe wave scattered by the cylinder. This scattered wave is analyzed in order to determine the Dopplereffectasa functionof time (i.e., asa function LO-• _ ZONE The Two-Dimensional Case: The Moving Cylinder of the scattered wave is based on distance between the observer and the cylinder axis. The incident wave Uinco is plane and may be written in Fo as Uinco- foeikø'rø-iwøtø (17) where fo definesthe polarization of the incident wave and has a magnitude of one, ko definesthe direction of propagation,and wois the angularfrequency. The resulting scatteredwave measuredby an ob- The inverse Doppler effect which takes place in the near zone of the 3-D radiating dipole raisesthe server in Fo when expressedin terms of Fo is a comquestionwhether sucha phenomenonalso occursfor plicated expressioninvolving Fo time and spacecoother type of radiators or scatterersin free space. ordinatesro, to, in mixed form. The representation The following description and analysis covers the two-dimensional case. is simpler in form when the scattered wave in Fo is expressedin terms of time and spacecoordinatesr•, Figure 6 describesthe configurationof the follow- t•, of r• [Censor,1967,1969,1972] ing theoretical experiment: A circular cylinder with constitutive parameters Pi, ei, moves with constant = velocityv in the presenceof a plane electromagnetic wavein freespace(e0,P0). Here we denotethe frame of referencecomovingwith the cylinder by F• in or- where the scattering coefficientsin Fo are der to avoid confusionbetween "primed" physical quantities(that is, measuredin the comovingframe + + of reference)and the derivativesof other physical quantities which appear later in the laboratory frame and an(a•) may be approximatedby Yo Ho P--Xo Figure 6. A movingcylinderin the presenceof an incidentplanewave. (18) BEN-SHIMOL AND CENSOR: NEAR ZONE INVERSE DOPPLER EFFECT 469 Scattered si•.alforE polarization -' ' 13:0.01' 0.5 0 -0.5 -0 ; -1 , kvt Figure 7. The wave scatteredfrom a thin cylinder as measuredby an observerin the laboratory frame of reference.The imaginary part is representedby a dashedline. i7• ao m - 21n(2/6k•d) 5 = 1.781... the frequency may be separated from the effect on the amplitude, since the transformed waves remain plane. For nonplanar waves, the given definition of an(a•) • -e-i'm'in•r(k•d/2)2n (n!) 2 n- 1,2,3,...Doppler effect is still useful if the given nonplanar (20) for electrical polarization and ao • -i•r (k•d/2)2 an(a•) • e-ina•i•r (k•d/2)2n (n!) 2 n- 1,2,3,... (21) for magneticpolarization.For electricalpolarization the monopoleterm a0 is dominant,as seenin (20). For magneticpolarization,a0 anda• are of the same order, and thus the monopoleand dipole terms are dominant,as can be seenfrom (21). Here are the anglessubtendedby the propagationvectors k0, k•, respectively,and the velocityv in F0, respectively,as describedin Figure 6. In the presentpaper,a symmetricalDopplereffect in the far zoneswas chosen,prescribingthat the incidentwavepropagatesin a directionperpendicular waveis recastas a superposition(integral) of plane waves [Censor,1991;Stratton,1941]. The transformation of such nonplanar wavesfrom one inertial frame to another may be derived by direct transformation of each componentplane wave included in the givennonplanarwave spectralrepresentation.In the present case the scattered wave in r• and in F0 are not planar, as may be seenfrom (18), and the effect of the motion on the phase cannot be separated from the effect of the motion on the time-dependent amplitude. The presence of a frequencycomponent(i.e., a sine wave of a given frequency)in a given time signal is identified by a high peak in its power spectrum (equation(5)) at that frequency.This propertywill serveto identify the dominantfrequencycomponent of the scatteredwave. Sincean analytic expression of the short-timeFouriertransform(6) of the scattered wave (18) is not available,the powerspectral to the velocity(i.e., k. v = 0). ThereforeCto= •r/2. density must be estimatedwith a numericalspectral Hence,for the incidentwave,a transverseDopplerefestimator. Spectral estimatorsmay be divided into fect is discussed.For cto- •r/2, the scatteredwave, two main categories: (1) nonparametric (or classical) for both electricand magneticpolarization,is illustrated in Figure 7. 4. Spectral Analysis of the Doppler Effect The relativisticDopplereffect,as statedin the be- spectral estimators which are based on the discrete Fouriertransformalgorithm(DFT) and (2) parametric (or modern) spectralestimatorswhich are based on somemodels describingthe behavior of the analyzed signal or its spectrum. In the present simulation it was decided to use ginningof this paper, is derivedfrom the Lorentz a DFT based algorithm and its efficientimplementransformationswhen the electromagneticfields are tation, the fast Fourier transform(FFT) algorithm planewaves.In this casethe effectof the motionon [Cooleyand Tukey,1965;Ifeachorand Jarvis,1993; 470 BEN-SHIMOL AND CENSOR: NEAR ZONE INVERSE Kay, 1988; Marple, 1987]. An extensivediscussion DOPPLER EFFECT 1 of spectral analysisand estimation is given by Kay [1988]and Marple[1987]. 0.8 The useof a numericalcomputationforcesus to set specificvaluesfor eachparameterwhichtakespart in the analyzedconfiguration.The cylindermotion has been simulatedsothat the cylinder traversesa trajectory parallel to the x axis from large negativex values to large positivex valuesmovingwith constant velocity. The cylinder is locatedbelow the x axis of • 0.4 0.2 0 the laboratoryframe of referenceFo (seeFigure6) so it doesnot coincide(i.e., collide)with the observer, and infinite field values are thus avoided. The inci- dent plane wave is chosenat I GHz frequency,and the velocity of the cylinder is much lower than the speedof light, althoughthe relativisticformalismis retained for all cases(variouscaseswere tested by us, but only a few resultsare presentedin the figures 0.6 -1.4 -1.2 -1 -0.8 -0.6 -0.4 [GHz] Figure 9. Normalized PSD of the wave scattered from a moving dipole (H polarization). The time signal coversthe near and far zones. given here). Consequently,the Doppler frequency pies causepoorer frequencyresolution. The FFT alshift in the far zone is much lower than the carrier frequency,and thus the resolutioncapability of the spectralestimatormust be consideredin orderto get resultswith sufficientaccuracy.For the chosenveloc- ity, say3 x 10• m/s (i.e.,• - 0.01),the Dopplershift in the far zone is of the order of megahertz,and may be even ]essin the near zone. For carrier frequencyin gorithm is designedfor optimal DFT computation, i.e., for N discrete frequency values. In order to make such computations practical, the location of the peak of the power spectrum is obtained in two steps. An initial estimation of the peak location is computedwith a shortFFT algorithm(i.e., low number of discretefrequencyvalues). This initial esti- the RF range(1 GHZ in the presentexample),a vast mation is used later to define the limits where this numberof samples (2 x 10s samples for a resolution peak occurssolely (i.e., without sidelobes). Later, of 10 Hz with a samplingfrequencyof 2 GHz) has an optimization algorithm searchesfor the location to be includedin eachanalysisin order to detect the frequencychangewith sufficientaccuracy,thus rendering such computationsimpractical. Fewer sam- I 1 I of the peak using the DTFT (discretetime Fourier transform)algorithm (i.e., the frequencyvaluesare continuous). The use of the initial FFT estimation prevents the detection of sidelobesand reducesthe number of DFT computations which are neededfor the requiredfrequencyresolution(1 Hz in the present paper). As mentioned earlier, there has to be some balance betweenthe requirementsof an exact frequency determination(i.e., analysisof longsignalduration) ' I I]=0.01 0.8 •0.6 and the determination of the exact time when this frequencyoccurs(i.e., analysisof short signalduration). In the extreme casewhere the signalfrom all rangesis used to calculate the spectrum, the power spectral density (PSD) containstwo large peaks at frequenciesbelongingto the far zones(and which 0.4 0.2 0 -10.5 -10 -9.5 -9 are predicted by the relativistic transformations for plane waves),but there is no way to determinewhen Figure 8. Normalized powerspectraldensity(PSD) these frequenciesappear in the original signal (see of the wave scatteredfrom a movingmonopole(E Figures 8 and 9 for electric and magnetic polarizapolarization).The time signalcoversthe near and tion, respectively). Furthermore, the analyzed sig[ GHz ] far zones. nal contains information from the far and near zones BEN-SHIMOL AND CENSOR: NEAR which cannot be resolvedfrom the power spectrum. In order to decreasetime uncertainty and enable a spectralanalysisat "specificlocations"of the cylinder, a sliding rectangular time window was introduced, i.e., the scattered wave was divided into overlapping segments. For each such segmentthe PSD is calculatedusing samplesfrom that segment,and the frequencyin which the maximal power value appearedwastaken to be the Dopplershift belongingto the center of the current segment. The window size (i.e., the time extent of eachsegment)has beenvaried from small valuescoveringabout one cycleof the measuredsignal in the far zone to the extreme case where a singlewindow coveredalmost the full signal, in order to get the optimal window which yields the best frequency-locationinformation. Summarizingthe descriptionabove,the numerical simulationand analysisis composedof the following steps: 1. The scattered wave, as measuredby the observerat the origin of F0, is simulatedusingequation ZONE INVERSE DOPPLER EFFECT 471 7.5 [•=0.01 , Nindow size ! ,,-• 2.5 2Cycles , ......... "i i . 20 Cycles ..... t 40Cycles I -2.5 -5 -7.5 ß ., -40 i -20 kvt 0 20 40 Figure 11. NormalizedDopplershift for the moving 2-D dipole. The incidentwaveis magneticallypolarized, and the D FT-based algorithm is used for the computations.Eachline representsa differentdifferent window width which is measured in numbers of cyclesof the measuredsignalin the far zone(solid line, two cycles;dashedline, 20 cycles;dash-dotted line, 40 cycles). In general,narrow windowsfollow better rapid amplitude changesin the near zone. (18) andthe scatteringcoefficients givenin equations (20), (21) (for electricand magneticpolarization,respectively),and (19). The time rangecoversthe near Doppler shift is definedas the frequencyin whichthe and far zonesof the observer.Examplesof suchsig- maximal value of the power spectrum occurs. 3. A more accurate computation of the Doppler nalsare shownin Figure 7 for both electricand magfrequency(usingthe abovedefinition)is obtainedby netic polarization. 2. The scatteredwaveis dividedinto overlapping an optimization algorithm. The algorithm is based segments,and eachis zero paddedand processedby on a minimum finding algorithm aroundthe Doppler an FFT algorithm. From the FFT transform a power frequencywhich is determined by the previousstep. 4. The frequencyof the peak is assignedto the spectrum is calculated. The initial estimation of the center of the time segment 5. __._,, • Discussion •3=0.01 Some results of the computed Doppler shift are presented in Figures 10 and 11 for a moving 2-D -•,, 0.5 monopole and a moving 2-D dipole, respectively. In the far zone, the computed Doppler shift fits the theoretical value which may be obtained analytically • ....... 20Cycles • [ ..... 40 Cycles by substituting the asymptotic expressionof Han-0.5 t,'x kel functionfor large argumentsin (18). In the near zone,the transitionfrom the to < 0 range (cylinder -1 approaching)to the to > 0 range(cylinderreceding) is not abrupt; that is, the Doppler frequency shift -1.5 -6 -4 -2 0 2 4 6 changesgradually, but the changeis not monotonic. Figure 10. Normalized Doppler shift for the mov- The fast change of the amplitudes of the scattered ing 2-D monopole. The discreteFourier transform waves in the near zone of the cylinder is shown in (DFT) basedalgorithmis usedfor the computations. Figure 7 and appearsas a high frequency-component In general,narrow windowsfollow better rapid am- in the PSD. This may explain the differencebetween plitude changesin the near zone. Figure 10 (monopole)and Figure 11 (dipole). The • [ -- 2Cycles •'• ""- kv! , , 472 BEN-SHIMOL AND CENSOR: 1.5 NEAR . . 0.5 -0.5 -1 -1.5 -3 -2 -1 0 1 2 3 Figure 12. NormalizedDopplershift (relativeto w/•)versuskvt forthe moving2-D monopole. The instantaneous frequencyis computednumerically.The increasein frequencyin the nearzonefollowsthe fast amplitude change. relative amplitude changefor the dipole caseis faster than in the monopole casewhich is supported by the resultsshownin Figures 10 and 11, i.e., the increase of the Doppler shift in the near zone of the cylinder. Close examination of Figures 10 and 11 showsthat near the origin, for 0 < kvt << 1, the Dopplershift is still positive. This shouldnot be interpretedas an inverseDoppler effect sinceit is causedby the finite width of the slicing window. As the width of the ZONE INVERSE DOPPLER EFFECT The effectis more pronouncedfor the 2-D dipolecase (i.e., magnetic polarization). In addition, a numerical computationof the instantaneousfrequencyfor the 2-D caseis presentedin Figures 12 and 13. The results agree with Figures 10 and 11. The numerical computationof the instantaneousfrequencyis much faster and more efficientthan the DFT-based algorithm but is more sensitiveto the presenceof noise, which usually occurs in real situations. Moreover, the computationsof differencesas an approximation to the analytical derivatives may be inaccurate for fast changes(which appear in the near zone), and one has to sample the signal with a very high sampling frequency,which may lead to other numerical problemssuch as accuracy and round-off errors. Varioussetsof simulationparameterssuchascylinder velocity,segmentwidth, samplingfrequency,etc., were used in order to discover an inverse Doppler shift in the near zone of the 2-D cylinder. Such an effect was not found. The DFT-based algorithm was applied to the mea- suredfieldsof the 3-D movingdipole. Sincea singularity occursin (7) and (8) for t' = 0, the trajectory of the moving observerwas slightly displacedabove the y axis and parallel to it, so collisionwas avoided. The results are given in Figures 14 and 15 and are in agreementwith the resultsgivenby Enghetaet al. [1980]and Engheta[1990],exceptfor a very narrow slicingwindowincreases, moreinformationfromthe regionnear the origin, wherethe rapid changeof sigpast (relative to the window'smidpoint) is involved nal values is characterizedby very high frequencies with the computation, thus slowingthe responseto the change in the Doppler shift at positive times. where the peaks of the PSDs occur and are selected as the dominant frequencies. 1.5 7.5 2.5 -2.5 -5 .5 -7.5 kvt , , Figure 13. Normalized Doppler shift (relative to co//)versuskvt for the moving2-D dipole. The instantaneousfrequencyis computednumerically.The increasein frequencyin the near zonefollowsthe fast amplitude change. -3 -2 -1 0 1 2 3 4 Figure14. Normalized Doppler shift(relative to co•) computedwith the DFT-basedalgorithm.The inverseDoppler shift appears in the near zone. Close to the origin, the effectof the fast amplitudechange is dominant. The extent of the high frequencylags in proportion to the width of the slicingwindow. BEN-SHIMOL AND CENSOR: NEAR ZONE INVERSE DOPPLER EFFECT 473 applied, and none of them show the existence of an inverse Doppler effect for the 2-D case. 1.5 For the three dimensionalcase,the analysisand 1 resultswhichwere givenby Enghetaet al. [1980] and Engheta[1990]are rechecked with respectto the 0.5 instantaneous bandwidth o in the near zone. This ex- amination supports the phenomenon of the inverse -0.5 Dopplereffectfor the three-dimensionaldipolein free -1 space, excluding a very narrow zone where the fast change in the amplitude is not reflected in the in- -1.5 -2 -4 -2 0 2 4 6 Figure 15. NormalizedDoppler shift (relative to w•3)for the magneticfield of the 3-D dipole as computed with the D FT-based algorithm. The inverse Doppler shift which appearsin the near zone is very closeto the origin, and thus may be invalid. Close to the origin, the effectof the fast amplitude change is dominant. The extent of the high frequencylags in proportion to the width of the slicing window. 6. Summary stantaneousfrequency. Analyzing the fields of the three-dimensional dipole with the D FT-basedalgorithm supportsthe existenceof the inverseDoppler effectphenomenonand showsthat in a very narrow regionthe fast changeof the amplitude is dominant. Appendix: A Simple Example The behaviorof "instantaneous frequency"(i.e., the time derivativeof the phase) does not always serve as a generalization of the term "frequency," asillustratedby the followingexample[after Cohen, 1995]' Take a time signal f (t) The existenceof the inverseDoppler effectin free spacehas been scrutinized,in view of somepapers reportingthe effectin the vicinity of a movingradi- -- 81(t) 4. 82(t) -__ Aleiw•t4. zx2c A _iw=t (A1) = A(t)eJ•ø(t) ating 3-D dipole. The difference between the terms "frequency" and "instantaneous frequency"andtheir relation to the physicalmeaningof the Doppler effect were carefullyconsidered.A theoreticalexperiment consistingof a movingperfectlyconducting thin cylinder in the presenceof an exciting plane wave was discussed. The responseof the cylinder may be taken to be due to a 2-D monopoleor a 2-D dipole for electric or magnetic polarization of the incident plane wave, respectively,therefore enabling us to compare our results with those of the 3- where the amplitudes A1, A= are taken to be real constantsand Wl, w= are positive angular frequen- cies. Sincew•, w= are taken to be positive,s(t) is analytic. The powerspectrumof s(t) consistsof two delta functionsat (angular) frequencieswl and w=, i.e., i0 : ',! :,,' ',,r •, : •,• D casewhichwerereportedby Enghetaet al. [1980]. The spectral analysis is based on the discrete time Fouriertransform(DTFT) and its fast implementation (FFT). The measuredsignal was divided into overlappingsegmentsin order to reducethe time uncertainty of the Doppler shift. A classicalspectral estimatorwas applied to eachsuchsegment,and the Doppler shift was defined as the differencebetween the location of the highest peak of the PSD and the frequencyof the exciting plane wave. The time instance of this Doppler shift was set at the center of the time segment. Intensive numerical analysis involving various sets of simulation parameterswas -lO -20 -30 :'i il ]i ii i '• I ............ •_--•.2,•2=• ß ::i :;! '!i (o, =10rad/sec 1 cøz =20rad/sec 1 -40 Figure 16. The instantaneous frequency of Aleiw't4-A2e iw2t.Thedashed linesshows thepos- sibilityof negative frequency values foran analytic signal. 474 BEN-SHIMOL AND CENSOR: S(w) = A• 6(w- w•) + A26(w- w2) NEAR (A2) The amplitudeA(t) and the phaseqo(t)are givenby ZONE INVERSE DOPPLER EFFECT de Zutter, D., The dyadic Green'sfunction for the Fourier spectra of the fields from harmonic sourcesin uniform motion, Electromagnetics,2, 221-237, 1982. de Zutter, D., Green'sfunctionfor the Fourierspectraof n(t)- v/A• 2+A22 +2A•A2 cos(w• - w2)t(A3) the fields from two-dimensional sources or scatterers in uniform motion, Radio Sci., 22, 1197-1203, 1987. Doppler, C. J., •lberdasfarbige LichtderDoppelsterne and und einiger anderer Gestirne des Himmels, Abh. K. BShmischenGes. Wiss., 2, 467-482, 1842. Engheta, N., An overview of the theory of the near zone inverseDoppler effect, in Recent Advancesin Electromagnetic Theory, edited by H. N. Kritikos and D. L. respectively.The instantaneousfrequencyis calcuJaggard,pp. 56-73, Springer-Verlag,New York, 1990. lated as the time derivative of the phase, i.e., Engheta, N., A. R. Mickelson,and C. H. Papas, On the near-zone inverse Doppler effect, IEEE Trans. Antendqo(t) I 1 A• - A•i nas Propag.,AP-œ8, 512-522, 1980. Frank, I. M., Doppler effect in a refractive medium, J. (^s) Phys. USSR, 2, 49-67, 1943. Figure 16 illustrate the instantaneousfrequencyof Gill, T. P., The Doppler Effect, Academic, San Diego, Calif., 1965. the signals(t) for two cases.The followingsimple exampleillustrates somedifficultiesarisingfrom the Ifeachor, E. C., and B. W. Jervis, Digital Signal Processing: A Practical Approach,Addison-Wesley,Reading, definitionof the instantaneousfrequency: qo(t) - arctan A1c0s031t q+A2cosw2t 03(t) -- dt ---• (031 q-032) q-• (031 -032)A•(t ) Mass., 1993. 1. The instantaneousfrequencyis not necessarily Kay, S. M., Modern SpectralEstimation: Theory and Aponeof the distinctfrequencies in the spectrum(put plication, Prentice Hall, Englewood Cliffs, N.J., 1988. A1 = A2 in (A5), for example). Marple, S. L., Jr., Digital SpectralAnalysis with Applica2. The instantaneousfrequencymay be continutions, Prentice Hall, Englewood Cliffs, N.J., 1987. ous, ranging over an infinite number of values even Michielsen, B. L., G. C. Herman, A. T. de Hoop, and D. de Zutter, Three-dimensionalrelativistic scattering for a signalhaving a spectrumconsistingof few dis- tinct frequencies. of electromagneticobject in uniform translational mo- References waves in ionized media, Res. Rep. 10, 75 pp., Res. Lab. tion, J. Math. Phys., 22, 2716-2722, 1981. 3. The instantaneousfrequencymay be negative Papas, C. H., Theory of ElectromagneticWave Propagafor analytic signals(i.e. signalswith zero spectrum tion, McGraw-Hill, New York, 1965. for negativefrequencies). Papoulis, A., Signal Analysis, McGraw-Hill, New York, 4. For band-limited signalsthe instantaneousfre1977. quency may extend outside the band. Rydbeck, D. E. H., The Doppler effect in dispersive,inho- mogeneousmedia with applicationsto electromagnetic of Electron., ChalmersUniv. of Technol.,Gothenburg, Censor,D., Scatteringin velocitydependentsystems(in Hebrew), D.Sci. thesis,Technion-Isr.Inst. of Technol., Haifa, Isr., 1967. Censor, D., Scattering of a plane wave at a plane interface separating two moving media, Radio Sci., •, 1079-1088, 1969. Censor,D., Scatteringin velocitydependentsystems,Radio Sci., 7, 331-337, 1972. Censor, D., Application-oriented relativistic electrodynamics, in Progress in Electromagnetics Research, edited by J. A. Kong, chap.4, pp. 119-158, Elsevier, New York, 1991. Cohen L., Time-FrequencyAnalysis, Prentice-Hall, EnglewoodCliffs, N.J., 1995. Sweden, 1960. Stratton, J. A., Electromagnetic Theory, McGraw-Hill, New York, 1941. Vakman, D. E., SophisticatedSignalsand the Uncertainty Principle in Radar, Springer-Verlag, New York, 1968. Van Bladel, J., Electromagnetic Fields, Hemisphere,New York, 1985. Y. Ben-Shimol and D. Censor, Department of Electrical and Computer Engineering, Ben-Gurion University of the Negev, Box 653, Beer-Sheva, 84105, Israel. (e-mail:[email protected]]; [email protected]) Cooley, J. W., and J. W. Tukey, An algorithm for the machine computation of complex Fourier series, Math. Cornput., 19, 297-301, 1965. (ReceivedMarch 3, 1997; revisedDecember5, 1997; acceptedJanuary5, 1998.)
