Applets:Bessel Functions of the First Kind: Unterschied zwischen den Versionen

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{{LntAppletLink|bessel}}  
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{{LntAppletLinkEn|besselFuns_en}}  
  
 
==Applet Description==
 
==Applet Description==
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:$${\rm J}_n (x) = \sum\limits_{k=0}^{\infty}\frac{(-1)^k \cdot (x/2)^{n \hspace{0.05cm} + \hspace{0.05cm} 2
 
:$${\rm J}_n (x) = \sum\limits_{k=0}^{\infty}\frac{(-1)^k \cdot (x/2)^{n \hspace{0.05cm} + \hspace{0.05cm} 2
\hspace{0.02cm}\cdot \hspace{0.05cm}k}}{k! \cdot (n+k)!} \hspace{0.05cm}.$$
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\hspace{0.05cm}\cdot \hspace{0.05cm}k}}{k! \cdot (n+k)!} \hspace{0.05cm}.$$
  
*Graphically represented, the functions ${\rm J}_n (x)$ for the order $n=0$ to $n=9$ can become different colors.
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*The functions ${\rm J}_n (x)$ can be represented graphically for the order $n=0$ to $n=9$ in different colors.
*The left-hand output provides the function values ${\rm J}_0 (x = x_1)$, ... , ${\rm J}_9 (x = x_1)$ for a slider-settable value $x_1$ in the range $0 \le x_1 \le 15$ with increment $0.5$.  
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*The left output provides the function values ${\rm J}_0 (x = x_1)$, ... , ${\rm J}_9 (x = x_1)$ for a slider-settable value $x_1$ in the range $0 \le x_1 \le 15$ with increment $0.5$.  
*The right hand side returns the function values ${\rm J}_0 (x = x_2)$, ... , ${\rm J}_9 (x = x_2)$ for a slider-settable value $x_2$ (same range and value) Increment as on the left).
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*The right output provides the function values ${\rm J}_0 (x = x_2)$, ... , ${\rm J}_9 (x = x_2)$ for a slider-settable value $x_2$ (same range and value increment like on the left).
  
  
[[Applets:Physical_Signal_%26_Analytical_Signal|'''German description''']]
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[[Applets:Besselfunktionen_erster_Art|'''German description''']]
  
 
==Theoretical Background==
 
==Theoretical Background==
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\cdot {\rm J}_n (x)= 0. $$
 
\cdot {\rm J}_n (x)= 0. $$
  
This is an ordinary second-order linear differential equation. The parameter $ n $ is usually integer, as in this program. These mathematical functions, which were introduced in 1844 by [https://de.wikipedia.org/wiki/Friedrich_Wilhelm_Bessel Friedrich Wilhelm Bessel], can also be represented in closed form as integrals:
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This is an ordinary second-order linear differential equation. The parameter $ n $ is usually integer, also in this program. These mathematical functions, introduced by [https://en.wikipedia.org/wiki/Friedrich_Bessel Friedrich Wilhelm Bessel] in 1844, can also be represented in closed form as integrals:
  
 
:$${\rm J}_n (x) = \frac{1}{2\pi}\cdot \int_{-\pi}^{+\pi} {{\rm e}^{\hspace{0.05cm}{\rm j}\hspace{0.05cm}\cdot \hspace{0.05cm}[\hspace{0.05cm}x \hspace{0.05cm}\cdot \hspace{0.05cm}\sin(\alpha) -\hspace{0.05cm} n \hspace{0.05cm}\cdot \hspace{0.05cm}\alpha \hspace{0.05cm}]}}\hspace{0.1cm}{\rm d}\alpha
 
:$${\rm J}_n (x) = \frac{1}{2\pi}\cdot \int_{-\pi}^{+\pi} {{\rm e}^{\hspace{0.05cm}{\rm j}\hspace{0.05cm}\cdot \hspace{0.05cm}[\hspace{0.05cm}x \hspace{0.05cm}\cdot \hspace{0.05cm}\sin(\alpha) -\hspace{0.05cm} n \hspace{0.05cm}\cdot \hspace{0.05cm}\alpha \hspace{0.05cm}]}}\hspace{0.1cm}{\rm d}\alpha
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The functions  ${\rm J}_n (x)$ belong to the class of Bessel functions of the first kind (German:   ''Besselfunktionen erster Art''). The parameter $n$ is called the ''Order''.  
 
The functions  ${\rm J}_n (x)$ belong to the class of Bessel functions of the first kind (German:   ''Besselfunktionen erster Art''). The parameter $n$ is called the ''Order''.  
  
''Annotation:''   There are a number of modifications of the Bessel functions, including the second-order Bessel functions named ${\rm Y}_n (x)$. For integer $n$, ${\rm Y}_n (x)$ can be replaced by ${\rm J}_n (x)$–functions. However, in this applet, only the first-order Bessel functions are   ⇒   ${\rm J}_n (x)$ is considered.
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''Annotation:''   There are a number of modifications of the Bessel functions, including the Bessel functions of the second kind named ${\rm Y}_n (x)$. For integer $n$, ${\rm Y}_n (x)$ can be replaced by ${\rm J}_n (x)$ functions. However, in this applet, only the first kind Bessel functions ${\rm J}_n (x)$ are considered.
 
<br><br>
 
<br><br>
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===Properties of the Bessel Functions===
 
===Properties of the Bessel Functions===
  
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{{GraueBox|TEXT=   
 
{{GraueBox|TEXT=   
$\text{Example (A):}$&nbsp; &nbsp;Consider ${\rm J}_0 (x = 2) = 0.22389$ and ${\rm J}_1 (x= 2) = 0.57672$. From this it can be calculated iteratively:  
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$\text{Example (A):}$&nbsp; &nbsp;Let ${\rm J}_0 (x = 2) = 0.22389$ and ${\rm J}_1 (x= 2) = 0.57672$. From this it can be calculated iteratively:  
 
:$${\rm J}_2 (x= 2) ={2 \cdot 1}/{2} \cdot {\rm J}_{1} (x= 2) - {\rm J}_{0} (x= 2) = 0.57672 - 0.22389 = \hspace{0.15cm}\underline{0.35283}\hspace{0.05cm},$$
 
:$${\rm J}_2 (x= 2) ={2 \cdot 1}/{2} \cdot {\rm J}_{1} (x= 2) - {\rm J}_{0} (x= 2) = 0.57672 - 0.22389 = \hspace{0.15cm}\underline{0.35283}\hspace{0.05cm},$$
 
:$${\rm J}_3 (x= 2) ={2 \cdot 2}/{2} \cdot {\rm J}_{2} (x= 2) - {\rm J}_{1} (x= 2) = 2 \cdot 0.35283 - 0.57672  = \hspace{0.15cm}\underline{0.12894}\hspace{0.05cm},$$
 
:$${\rm J}_3 (x= 2) ={2 \cdot 2}/{2} \cdot {\rm J}_{2} (x= 2) - {\rm J}_{1} (x= 2) = 2 \cdot 0.35283 - 0.57672  = \hspace{0.15cm}\underline{0.12894}\hspace{0.05cm},$$
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{{GraueBox|TEXT=   
 
{{GraueBox|TEXT=   
$\text{Example (B):}$&nbsp; &nbsp;For the spectrum of the analytic signal, in [[Modulationsverfahren/Phasenmodulation_(PM)#Spektralfunktion_eines_phasenmodulierten_Sinussignals|phase modulation of a sinusoidal signal]]:
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$\text{Example (B):}$&nbsp; &nbsp;For the spectrum of the analytic signal, the following applies to ''Phase Modulation of a sinusoidal signal'':
[[Datei:Mod_T_3_1_S4_version2.png|right|frame|Spectrum of the analytic signal in phase modulation]]  
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[[Datei:Mod_T_3_1_S4_version2.png|right|frame|Phase Modulation: &nbsp; Spectrum of the Analytic Signal]]  
 
:$$S_{\rm +}(f) = A_{\rm T} \cdot \sum_{n = - \infty}^{+\infty}{\rm J}_n (\eta) \cdot \delta \big[f - (f_{\rm T}+ n \cdot f_{\rm N})\big]\hspace{0.05cm}.$$
 
:$$S_{\rm +}(f) = A_{\rm T} \cdot \sum_{n = - \infty}^{+\infty}{\rm J}_n (\eta) \cdot \delta \big[f - (f_{\rm T}+ n \cdot f_{\rm N})\big]\hspace{0.05cm}.$$
 
Denote this  
 
Denote this  
*$f_{\rm T}$ the carrier frequency,  
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*$f_{\rm T}$ the carrier frequency &nbsp; (German: &nbsp; $\rm T$rägerfrequenz),  
*$f_{\rm N}$ the message frequency,
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*$f_{\rm N}$ the frequency of the source signal &nbsp; (German: &nbsp; $\rm N$achrichtenfrequenz),
* $A_{\rm T}$ the carrier amplitude.  
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* $A_{\rm T}$ the carrier amplitude &nbsp; (German: &nbsp; $\rm T$rägeramplitude).  
  
  
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Based on the graphic, the following statements are possible:
 
Based on the graphic, the following statements are possible:
*Here $S_+(f)$ consists of an infinite number of discrete lines at a distance of $f_{\rm N}$.  
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*$S_+(f)$ consists here of an infinite number of discrete lines at a distance of $f_{\rm N}$.  
*It is thus in principle infinitely extended.
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*Thus the sectrum is in principle infinitely extended.
 
*The weights of the spectral lines at $f_{\rm T} + n · f_{\rm N}$ ($n$ integer) are determined by the modulation index $η$ over the Bessel functions ${\rm J}_n(η)$.  
 
*The weights of the spectral lines at $f_{\rm T} + n · f_{\rm N}$ ($n$ integer) are determined by the modulation index $η$ over the Bessel functions ${\rm J}_n(η)$.  
*The spectral lines are real in the case of a sinusoidal source signal and a cosinusoidal carrier and symmetric about $f_{\rm T}$ for even $n$.  
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*The spectral lines are real in the case of a sinusoidal source signal and a cosinusoidal carrier and symmetrical about $f_{\rm T}$ for even $n$.  
*For odd $n$ , a sign change according to the $\text{Property (B)}$ has to be considered.  
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*In the case of odd $n$, a change of sign corresponding to $\text{Property (B)}$ must be taken into account.
*The phase modulation of another phase oscillation of source and / or carrier signal provides the same magnitude spectrum.}}  
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*The Phase Modulation of another phase oscillation of source and / or carrier signal provides the same magnitude spectrum.}}  
 
<br><br>
 
<br><br>
  
===Anwendungen der Besselfunktionen===
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===Applications of the Bessel Functions===
  
Die Anwendungen der Besselfunktionen in den Natur&ndash; und Ingenieurswissenschaften sind vielfältig und spielen eine wichtige Rolle in der Physik, zum Beispiel:
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The applications of the Bessel functions in nature and engineering are diverse and play an important role in physics, for example:
*Untersuchung von Eigenschwingungen von zylindrischen Resonatoren,
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* Electromagnetic waves in a cylindrical waveguide,
*Lösung der radialen Schrödinger&ndash;Gleichung,
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* Solutions to the radial Schrödinger equation,
*Schalldruckamplituden von dünnflüssgigen Rotationsströmen,  
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* Pressure amplitudes of inviscid rotational flows,
*Wärmeleitung in zylindrischen Körpern,
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* Heat conduction in a cylindrical object,
*Streuungsproblem eines Gitters,
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* Diffusion problems on a lattice,
*Dynamik von Schwingkörpern,
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* Dynamics of floating bodies,
*Winkelauflösung.
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*Frequency-dependent friction in circular pipelines
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* Angular resolution.
  
Man zählt die Besselfunktionen wegen ihrer vielfältigen Anwendungen in der mathematischen Physik zu den speziellen Funktionen.
 
  
Wir beschränken uns im Folgenden auf einige Gebiete, die in unserem Lerntutorial $\rm LNTwww$ angesprochen werden.
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The Bessel functions are counted among the special functions because of their many applications in mathematical physics.
  
'''Im enlischen Original'''
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In the following, we restrict ourselves to a few areas that are addressed in our tutorial $\rm LNTwww$.
Electromagnetic waves in a cylindrical waveguide
 
Pressure amplitudes of inviscid rotational flows
 
Heat conduction in a cylindrical object
 
Modes of vibration of a thin circular (or annular) acoustic membrane (such as a drum or other membranophone)
 
Diffusion problems on a lattice
 
Solutions to the radial Schrödinger equation (in spherical and cylindrical coordinates) for a free particle
 
Solving for patterns of acoustical radiation
 
Frequency-dependent friction in circular pipelines
 
Dynamics of floating bodies
 
Angular resolution
 
'''Ende'''
 
  
 
{{GraueBox|TEXT=   
 
{{GraueBox|TEXT=   
$\text{Beispiel (C):} \hspace{0.5cm} \text{Einsatz in der Spektralanalyse} \ \Rightarrow \ \text{Kaiser-Bessel-Filter}$
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$\text{Example (C):} \hspace{0.5cm} \text{Use in Spectral Analysis} \ \Rightarrow \ \text{Kaiser-Bessel filter}$
  
Als '''spektralen Leckeffekt''' bezeichnet man die Verfälschung des Spektrums eines periodischen und damit zeitlich unbegrenzten Signals aufgrund der impliziten Zeitbegrenzung der Diskreten Fouriertransformation (DFT). Dadurch werden zum Beispiel von einem Spektrumanalyzer
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The '''spectral leakage effect''' is the falsification of the spectrum of a periodic and thereby time unlimited signal due to the implicit time limitation of the discrete Fourier transform (DFT). This will be done, for example, by a spectrum analyzer
*im Zeitsignal nicht vorhandene Frequenzanteile vorgetäuscht, und/oder
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* in the time signal not existing frequency components simulated, and/or
*tatsächlich vorhandene Spektralkomponenten durch Seitenkeulen verdeckt.
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* actually existing spectral components are obscured by sidelobes.
  
Aufgabe der [[Signaldarstellung/Spektralanalyse|Spektralanalyse]] ist es, durch die Bereitstellung geeigneter Fensterfunktionen den Einfluss des ''spektralen Leckeffektes'' zu begrenzen.
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The task of the [[Signaldarstellung/Spektralanalyse|spectral analysis]] is to limit the influence of the ''spectral leakage effect'' by providing suitable window functions.
  
Eine solche Fensterfunktion liefert zum Beispiel das Kaiser&ndash;Bessel&ndash;Fenster &nbsp; &rArr; &nbsp; siehe Abschnitt [[Signaldarstellung/Spektralanalyse#Spezielle_Fensterfunktionen|Spezielle Fensterfunktionen]]. Dessen zeitdiskrete Fenserfunktion lautet mit der Besselfunktion nullter Ordnung &nbsp; &rArr; &nbsp; ${\rm J}_0(x)$, dem Parameter $\alpha=3.5$ und der Fensterlänge $N$:
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Such a window function provides, for example, the Kaiser&ndash;Bessel window &nbsp; &rArr; &nbsp; see section [[Signaldarstellung/Spektralanalyse#Spezielle_Fensterfunktionen|Special Window Functions]]. Its time-discrete window function with the Bessel function zero order &nbsp; &rArr; &nbsp; ${\rm J}_0(x)$, the parameter $\alpha=3.5$ and the window length $N$:
 
:$$w_\nu = \frac{ {\rm J}_0\big(\pi \cdot \alpha \cdot \sqrt{1 - (2\nu/N)^2}\big)}{ {\rm J}_0\big(\pi \cdot \alpha \big)}.$$
 
:$$w_\nu = \frac{ {\rm J}_0\big(\pi \cdot \alpha \cdot \sqrt{1 - (2\nu/N)^2}\big)}{ {\rm J}_0\big(\pi \cdot \alpha \big)}.$$
Auf der Seite [[Signaldarstellung/Spektralanalyse#G.C3.BCtekriterien_von_Fensterfunktionen|Gütekriterien von Fensterfunktionen]] sind u.a. die Kenngrößen des Kaiser&ndash;Bessel&ndash;Fensters angegeben:
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On the page [[Signaldarstellung/Spektralanalyse#G.C3.BCtekriterien_von_Fensterfunktionen|Quality Criteria of Window Functions]] and other the parameters of the Kaiser-Bessel window are given:
*Günstig sind der große &bdquo;Minimale Abstand zwischen Hauptkeule und Seitenkeulen&rdquo; und der gewünscht kleine &bdquo;Maximale Skalierungsfehler&rdquo;.
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*Conveniently, the large are &bdquo;minimum distance between the main lobe and side lobes&rdquo; and the desired small &bdquo;maximum scaling error&rdquo;.
*Aufgrund der sehr großen &bdquo;Äquivalenten Rauschbreite&rdquo; schneidet das Kaiser&ndash;Bessel&ndash;Fenster im wichtigsten Vergleichskriterium &bdquo;Maximaler Prozessverlust&rdquo; doch schlechter ab als die etablierten Hamming&ndash; und Hanning&ndash;Fenster.}}
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*Due to the very large &bdquo;equivalent noise width&rdquo; the Kaiser-Bessel window cuts in the most important comparison criterion &bdquo;maximum process loss&rdquo; but worse than the established Hamming and Hanning windows.}}
  
  
 
{{GraueBox|TEXT=   
 
{{GraueBox|TEXT=   
$\text{Beispiel (D):} \hspace{0.5cm} \text{Rice-Fading-Kanalmodell}$
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$\text{Example (D):} \hspace{0.5cm} \text{Rice-Fading Channel Model}$
  
Die [[Mobile_Kommunikation/Wahrscheinlichkeitsdichte_des_Rayleigh%E2%80%93Fadings#Allgemeine_Beschreibung_des_Mobilfunkkanals| Rayleigh&ndash;Verteilung]] beschreibt den Mobilfunkkanal unter der Annahme, dass kein direkter Pfad vorhanden ist und sich somit der multiplikative Faktor $z(t) = x(t) + {\rm j} \cdot y(t)$ allein aus diffus gestreuten Komponenten zusammensetzt.  
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The [[Mobile_Kommunikation/Wahrscheinlichkeitsdichte_des_Rayleigh%E2%80%93Fadings#Allgemeine_Beschreibung_des_Mobilfunkkanals| Rayleigh - Distribution]] describes the mobile channel on the assumption that there is no direct path and thus the multiplicative factor $z(t) = x(t) + {\rm j} \cdot y(t)$ is composed solely of diffusely scattered components.  
  
Bei Vorhandensein einer Direktkomponente (englisch: <i>Line of Sight</i>, LoS) muss man im Modell zu den mittelwertfreien Gaußprozessen $x(t)$ und $y(t)$ noch Gleichkomponenten $x_0$ und/oder $y_0$ hinzufügen:
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In the case of a direct component (English: <i>Line of Sight</i>, LoS) in the model for the mean-free Gaussian processes $x(t)$ and $y(t)$ one has to add equal components $x_0$ and/or $y_0$ :
  
[[Datei:P ID2126 Mob T 1 4 S1 v3.png|right|frame|Rice-Fading-Kanalmodell|class=fit]]
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[[Datei:P ID2126 Mob T 1 4 S1 v3.png|right|frame|Rice-Fading channel model|class=fit]]
 
$$\hspace{0.2cm}x(t) \hspace{0.1cm} \Rightarrow \hspace{0.1cm} x(t) +x_0 \hspace{0.05cm}, \hspace{0.2cm} y(t) \hspace{0.1cm} \Rightarrow \hspace{0.1cm} y(t) +y_0\hspace{0.05cm},$$
 
$$\hspace{0.2cm}x(t) \hspace{0.1cm} \Rightarrow \hspace{0.1cm} x(t) +x_0 \hspace{0.05cm}, \hspace{0.2cm} y(t) \hspace{0.1cm} \Rightarrow \hspace{0.1cm} y(t) +y_0\hspace{0.05cm},$$
  
Zeile 132: Zeile 122:
 
  z_0 = x_0 + {\rm j} \cdot y_0\hspace{0.05cm}.$$
 
  z_0 = x_0 + {\rm j} \cdot y_0\hspace{0.05cm}.$$
  
Die Grafik zeigt das ''Rice&ndash;Fading&ndash;Kanalmodell''. Es lässt sich wie folgt zusammenfassen:
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The graph shows the ''Rice&ndash;Fading channel model''. It can be summarized as follows:
*Der Realteil $x(t)$ ist gaußverteilt mit Mittelwert $x_0$ und Varianz $\sigma ^2$.  
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*The real part $x(t)$ is Gaussianized with mean $x_0$ and variance $\sigma ^2$.  
*Der Imaginärteil $y(t)$ ist ebenfalls gaußverteilt  (Mittelwert $y_0$, gleiche Varianz $\sigma ^2$)  sowie unabhängig von $x(t)$.<br>
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*The imaginary part $y(t)$ is also Gaussian (mean $y_0$, equal variance $\sigma ^2$)  and independent of $x(t)$.<br>
  
*Für $z_0 \ne 0$ ist der Betrag $\vert z(t)\vert$ riceverteilt, woraus die Bezeichnung &bdquo;<i>Rice&ndash;Fading</i>&rdquo; herrührt.  
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*For $z_0 \ne 0$, the amount $\vert z(t)\vert$ rice is distributed, from which the term &bdquo;<i>Rice&ndash;Fading</i>&rdquo; arises.  
  
*Zur Vereinfachung der Schreibweise setzen wir  $\vert z(t)\vert = a(t)$. Für $a < 0$ ist die Betrags&ndash;WDF $f_a(a) \equiv 0$, für $a \ge  0$ gilt folgende Gleichung, wobei ${\rm I_0}(x)$ die <i>modifizierte Besselfunktion</i> nullter Ordnung bezeichnet:
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*To simplify the notation, we set $\vert z(t)\vert = a(t)$. For $a < 0$ , the amounts - WDF are $f_a(a) \equiv 0$, for $a \ge  0$ the following equation holds, where ${\rm I_0}(x)$ is the <i>modified Besselfunktion</i> zeroth order denotes:
:$$f_a(a) = \frac{a}{\sigma^2} \cdot {\rm e}^{  - (a^2 + \vert z_0 \vert ^2)/(2\sigma^2)} \cdot {\rm I}_0 \left [ \frac{a \cdot \vert z_0 \vert}{\sigma^2} \right ] \hspace{0.5cm}\text{mit}\hspace{0.5cm}{\rm I }_0 (u) = {\rm J }_0 ({\rm j} \cdot u) =  
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:$$f_a(a) = \frac{a}{\sigma^2} \cdot {\rm e}^{  - (a^2 + \vert z_0 \vert ^2)/(2\sigma^2)} \cdot {\rm I}_0 \left [ \frac{a \cdot \vert z_0 \vert}{\sigma^2} \right ] \hspace{0.5cm}\text{with}\hspace{0.5cm}{\rm I }_0 (u) = {\rm J }_0 ({\rm j} \cdot u) =  
 
  \sum_{k = 0}^{\infty} \frac{ (u/2)^{2k} }{k! \cdot \Gamma (k+1)}
 
  \sum_{k = 0}^{\infty} \frac{ (u/2)^{2k} }{k! \cdot \Gamma (k+1)}
 
  \hspace{0.05cm}.$$
 
  \hspace{0.05cm}.$$
*Zwischen der modifizierten Besselfunktion und der herkömmlichen Besselfunktion ${\rm I_0}(x)$ &ndash; jeweils erster Art &ndash; besteht also der Zusammenhang ${\rm I }_0 (u) = {\rm J }_0 ({\rm j} \cdot u)$.}}
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*Between the modified Bessel function and the traditional Bessel function ${\rm I_0}(x)$ &ndash; in each case of first kind &ndash; So the connection exists ${\rm I }_0 (u) = {\rm J }_0 ({\rm j} \cdot u)$.}}
  
  
 
{{GraueBox|TEXT=   
 
{{GraueBox|TEXT=   
$\text{Beispiel (E):} \hspace{0.5cm} \text{Analyse des Frequenzspektrums von frequenzmodulierten Signalen}$
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$\text{Example (E):} \hspace{0.5cm} \text{Analysis of the Frequency Spectrum of Frequency Modulated Signals}$
  
Im $\text{Beispiel (B)}$ wurde bereits gezeigt, dass die Winkelmodulation einer harmonischen Schwingung der Frequenz $f_{\rm N}$ zu einem Linienspektrum führt. Die Spektrallinien liegen um die Trägerfrequenz $f_{\rm T}$ bei $f_{\rm T} + n \cdot f_{\rm N}$ mit $n \in \{ \ \text{...}, -2, -1, \ 0, +1, +2, \text{...} \ \}$. Die Gewichte der Diraclinien sind ${\rm J }_n(\eta)$, abhängig vom Modulationsindex $\eta$.
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$\text{Example (B)}$ has already been shown that the angle modulation of a harmonic oscillation of the frequency $f_{\rm N}$ leads to a line spectrum. The spectral lines are around the carrier frequency $f_{\rm T}$ bei $f_{\rm T} + n \cdot f_{\rm N}$ with $n \in \{ \ \text{...}, -2, -1, \ 0, +1, +2, \text{...} \ \}$. The weights of the Dirac lines are ${\rm J }_n(\eta)$, depending on the modulation index $\eta$.
  
[[Datei:P_ID1095__Mod_T_3_2_S4_neu.png|center|frame|Diskrete Spektren bei Phasenmodulation (links) und Frequenzmodulation (rechts)]]   
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[[Datei:P_ID1095__Mod_T_3_2_S4_neu.png|center|frame|Discrete spectra with phase modulation (left) and frequency modulation (right)]]   
  
Die Grafik zeigt das Betragsspektrum $\vert S_{\rm +}(f) \vert$ des analytischen Signals bei Phasenmodulation (PM) und Frequenzmodulation (FM), zwei unterschiedliche Formen der Winkelmodulation (WM). Bessellinien mit Werten kleiner als $0.03$ sind hierbei in beiden Fällen vernachlässigt.  
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The graph shows the magnitude spectrum $\vert S_{\rm +}(f) \vert$ of the analytic signal in phase modulation (PM) and frequency modulation (FM), two different forms of angle modulation (WM). Bessellines with values less than $0.03$ are neglected in both cases.
  
Für die obere Bildhälfte sind die Modulatorparameter so gewählt, dass sich für $f_{\rm N} = 5  \ \rm kHz$ jeweils ein Besselspektrum mit dem Modulationsindex $η = 1.5$ ergibt. Lässt man die Phasenbeziehungen außer Acht, so ergeben sich für beide Systeme gleiche Spektren und gleiche Signale.
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For the upper half of the image, the modulator parameters are chosen so that for each $f_{\rm N} = 5  \ \rm kHz$ here is a Bessel spectrum with the modulation index $η = 1.5$. Disregarding the phase relationships, the same spectra and the same signals result for both systems.
  
Die unteren Grafiken gelten bei sonst gleichen Einstellungen für die Nachrichtenfrequenz $f_{\rm N} = 3 \ \rm kHz$. Man erkennt:  
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The lower graphics apply with otherwise identical settings for the same message frequency $f_{\rm N} = 3 \ \rm kHz$. One notices:  
*Bei der Phasenmodulation ergibt sich gegenüber $f_{\rm N} = 5 \ \rm kHz$ eine schmalere Spektralfunktion, da nun der Abstand der Bessellinien nur mehr $3 \ \rm kHz$ beträgt. Da bei PM der Modulationsindex unabhängig von $f_{\rm N}$ ist, ergeben sich die gleichen Besselgewichte wie bei $f_{\rm N} = 5 \ \rm kHz$.  
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*In phase modulation, the spectral function is narrower than $f_{\rm N} = 5 \ \rm kHz$, because the distance of the Bessel lines is now only $3 \ \rm kHz$. Since the modulation index of PM is independent of $f_{\rm N}$, the same bessel weights result as in $f_{\rm N} = 5 \ \rm kHz$.  
*Auch bei der Frequenzmodulation treten nun die Bessellinien im Abstand von $3 \ \rm kHz$ auf. Da aber bei FM der Modulationsindex umgekehrt proportional zu $f_{\rm N}$ ist, gibt es nun unten aufgrund des größeren Modulationsindex $η = 2.5$  deutlich mehr Bessellinien als im rechten oberen (für $η = 1.5$ gültigen) Diagramm. }}
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*Also in the frequency modulation, the Bessel lines now occur at a distance of $3 \ \rm kHz$. However, since FM has a modulation index inversely proportional to $f_{\rm N}$, there are now more significantly more Bessel lines at the bottom due to the larger modulation index $η = 2.5$ than in the upper right (for $η = 1.5$ valid) chart.}}
  
 
'''Das folgende Kapitel muss noch angepasst werden!'''
 
  
==Zur Handhabung des Applets==
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==Applet Manual==
[[Datei:Handhabung_binomial.png|left|600px]]
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[[Datei:Bessel_abzug3.png|left|600px]]
&nbsp; &nbsp; '''(A)''' &nbsp; &nbsp; Vorauswahl für blauen Parametersatz
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&nbsp; &nbsp; '''(A)''' &nbsp; &nbsp; Sum formula of the Bessel functions ${\rm J}_n(x)$
  
&nbsp; &nbsp; '''(B)''' &nbsp; &nbsp; Parametereingabe $I$ und $p$ per Slider
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&nbsp; &nbsp; '''(B)''' &nbsp; &nbsp; Selection of the order $n$ for the graphical representation
  
&nbsp; &nbsp; '''(C)''' &nbsp; &nbsp; Vorauswahl für roten Parametersatz
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&nbsp; &nbsp; '''(C)''' &nbsp; &nbsp; Plot of the Bessel functions
  
&nbsp; &nbsp; '''(D)''' &nbsp; &nbsp; Parametereingabe $\lambda$ per Slider
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&nbsp; &nbsp; '''(D)''' &nbsp; &nbsp; Variation of the graphic representation
  
&nbsp; &nbsp; '''(E)''' &nbsp; &nbsp; Graphische Darstellung der Verteilungen
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$\hspace{1.5cm}$&bdquo;$+$&rdquo; (Enlarge),
  
&nbsp; &nbsp; '''(F)''' &nbsp; &nbsp; Momentenausgabe für blauen Parametersatz
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$\hspace{1.5cm}$ &bdquo;$-$&rdquo; (Decrease)
  
&nbsp; &nbsp; '''(G)''' &nbsp; &nbsp; Momentenausgabe für roten Parametersatz
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$\hspace{1.5cm}$ &bdquo;$\rm o$&rdquo; (Reset to default)
  
&nbsp; &nbsp; '''(H)''' &nbsp; &nbsp; Variation der grafischen Darstellung
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$\hspace{1.5cm}$ &bdquo;$\leftarrow$&rdquo; (pushed to the left),  usw.
  
$\hspace{1.5cm}$&bdquo;$+$&rdquo; (Vergrößern),
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&nbsp; &nbsp; '''(E)''' &nbsp; &nbsp; Selection of the abscissa value $x_1$ for the left numeric output
  
$\hspace{1.5cm}$ &bdquo;$-$&rdquo; (Verkleinern)
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&nbsp; &nbsp; '''(F)''' &nbsp; &nbsp; Numerical output of the Bessel function values ${\rm J}_n(x_1)$
  
$\hspace{1.5cm}$ &bdquo;$\rm o$&rdquo; (Zurücksetzen)
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&nbsp; &nbsp; '''(G)''' &nbsp; &nbsp; Selection of the abscissa value $x_2$ for the right numeric output
  
$\hspace{1.5cm}$ &bdquo;$\leftarrow$&rdquo; (Verschieben nach links),  usw.
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&nbsp; &nbsp; '''(F)''' &nbsp; &nbsp; Numerical output of the Bessel function values ${\rm J}_n(x_2)$
 
 
&nbsp; &nbsp; '''( I )''' &nbsp; &nbsp; Ausgabe von ${\rm Pr} (z = \mu)$ und ${\rm Pr} (z  \le \mu)$
 
 
 
&nbsp; &nbsp; '''(J)''' &nbsp; &nbsp; Bereich für die Versuchsdurchführung
 
 
<br clear=all>
 
<br clear=all>
<br>'''Andere Möglichkeiten zur Variation der grafischen Darstellung''':
 
*Gedrückte Shifttaste und Scrollen:  Zoomen im Koordinatensystem,
 
*Gedrückte Shifttaste und linke Maustaste: Verschieben des Koordinatensystems.
 
 
 
  
==Über die Autoren==
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==About the Authors==
Dieses interaktive Berechnungstool wurde am [http://www.lnt.ei.tum.de/startseite Lehrstuhl für Nachrichtentechnik] der [https://www.tum.de/ Technischen Universität München] konzipiert und realisiert.  
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This interactive applet was designed and realized at the [http://www.lnt.ei.tum.de/startseite Lehrstuhl für Nachrichtentechnik] of the  [https://www.tum.de/ Technische Universität München].
*Die erste Version wurde 2006 von [[Biografien_und_Bibliografien/An_LNTwww_beteiligte_Studierende#Markus_Elsberger_.28Diplomarbeit_LB_2006.29|Markus Elsberger]] und [[Biografien_und_Bibliografien/An_LNTwww_beteiligte_Studierende#Slim_Lamine_.28Studienarbeit_EI_2006.29|Slim Lamine]] im Rahmen von Abschlussarbeiten mit &bdquo;FlashMX&ndash;Actionscript&rdquo; erstellt (Betreuer: [[Biografien_und_Bibliografien/An_LNTwww_beteiligte_Mitarbeiter_und_Dozenten#Prof._Dr.-Ing._habil._G.C3.BCnter_S.C3.B6der_.28am_LNT_seit_1974.29|Günter Söder]]).  
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*The original version was created in 2005 by [[Biografien_und_Bibliografien/An_LNTwww_beteiligte_Studierende#Markus_Elsberger_.28Diplomarbeit_LB_2006.29|Markus Elsberger]] and [[Biografien_und_Bibliografien/An_LNTwww_beteiligte_Studierende#Slim_Lamine_.28Studienarbeit_EI_2006.29|Slim Lamine]] as part of thesis using  &bdquo;FlashMX&ndash;Actionscript&rdquo; (Supervisor: [[Biografien_und_Bibliografien/An_LNTwww_beteiligte_Mitarbeiter_und_Dozenten#Prof._Dr.-Ing._habil._G.C3.BCnter_S.C3.B6der_.28am_LNT_seit_1974.29|Günter Söder]]).
*2018 wurde das Programm  von [[Biografien_und_Bibliografien/An_LNTwww_beteiligte_Studierende#Xiaohan_Liu_.28Bachelorarbeit_2018.29|Xiaohan Liu]] (Bachelorarbeit, Betreuer: [[Biografien_und_Bibliografien/Beteiligte_der_Professur_Leitungsgebundene_%C3%9Cbertragungstechnik#Tasn.C3.A1d_Kernetzky.2C_M.Sc._.28bei_L.C3.9CT_seit_2014.29|Tasnád Kernetzky]] ) auf  &bdquo;HTML5&rdquo; umgesetzt.
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*In 2018 this Applet was redesigned and updated to &bdquo;HTML5&rdquo; by [[Biografien_und_Bibliografien/An_LNTwww_beteiligte_Studierende#Xiaohan_Liu_.28Bachelorarbeit_2018.29|Xiaohan Liu]] as part of her Bachelor's thesis (Supervisor: [[Biografien_und_Bibliografien/An_LNTwww_beteiligte_LÜT-Angehörige#Dr.-Ing._Tasn.C3.A1d_Kernetzky_.28bei_L.C3.9CT_von_2014-2022.29|Tasnád Kernetzky]]).
  
==Nochmalige Aufrufmöglichkeit des Applets in neuem Fenster==
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==Once again: Open Applet in new Tab==
  
{{LntAppletLink|bessel}}
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{{LntAppletLinkEn|besselFuns_en}}

Aktuelle Version vom 26. Oktober 2023, 11:05 Uhr

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Applet Description


This applet allows the calculation and graphical representation of the Bessel functions of the first kind and $n$–th order according to the series representation:

$${\rm J}_n (x) = \sum\limits_{k=0}^{\infty}\frac{(-1)^k \cdot (x/2)^{n \hspace{0.05cm} + \hspace{0.05cm} 2 \hspace{0.05cm}\cdot \hspace{0.05cm}k}}{k! \cdot (n+k)!} \hspace{0.05cm}.$$
  • The functions ${\rm J}_n (x)$ can be represented graphically for the order $n=0$ to $n=9$ in different colors.
  • The left output provides the function values ${\rm J}_0 (x = x_1)$, ... , ${\rm J}_9 (x = x_1)$ for a slider-settable value $x_1$ in the range $0 \le x_1 \le 15$ with increment $0.5$.
  • The right output provides the function values ${\rm J}_0 (x = x_2)$, ... , ${\rm J}_9 (x = x_2)$ for a slider-settable value $x_2$ (same range and value increment like on the left).


German description

Theoretical Background


General Information about the Bessel Functions

Bessel functions (or cylinder functions) are solutions of the Bessel differential equation of the form

$$x^2 \cdot \frac{ {\rm d}^2}{{\rm d}x^2}\ {\rm J}_n (x) \ + \ x \cdot \frac{ {\rm d}}{{\rm d}x}\ {\rm J}_n (x) \ + \ (x^2 - n^2) \cdot {\rm J}_n (x)= 0. $$

This is an ordinary second-order linear differential equation. The parameter $ n $ is usually integer, also in this program. These mathematical functions, introduced by Friedrich Wilhelm Bessel in 1844, can also be represented in closed form as integrals:

$${\rm J}_n (x) = \frac{1}{2\pi}\cdot \int_{-\pi}^{+\pi} {{\rm e}^{\hspace{0.05cm}{\rm j}\hspace{0.05cm}\cdot \hspace{0.05cm}[\hspace{0.05cm}x \hspace{0.05cm}\cdot \hspace{0.05cm}\sin(\alpha) -\hspace{0.05cm} n \hspace{0.05cm}\cdot \hspace{0.05cm}\alpha \hspace{0.05cm}]}}\hspace{0.1cm}{\rm d}\alpha \hspace{0.05cm}.$$

The functions ${\rm J}_n (x)$ belong to the class of Bessel functions of the first kind (German:   Besselfunktionen erster Art). The parameter $n$ is called the Order.

Annotation:   There are a number of modifications of the Bessel functions, including the Bessel functions of the second kind named ${\rm Y}_n (x)$. For integer $n$, ${\rm Y}_n (x)$ can be replaced by ${\rm J}_n (x)$ functions. However, in this applet, only the first kind Bessel functions ${\rm J}_n (x)$ are considered.

Properties of the Bessel Functions

$\text{Property (A):}$   If the function values for $n = 0$ and $n = 1$ are known, then the Bessel function for $n ≥ 2$ can be determined iteratively:

$${\rm J}_n (x) ={2 \cdot (n-1)}/{x} \cdot {\rm J}_{n-1} (x) - {\rm J}_{n-2} (x) \hspace{0.05cm}.$$


$\text{Example (A):}$   Let ${\rm J}_0 (x = 2) = 0.22389$ and ${\rm J}_1 (x= 2) = 0.57672$. From this it can be calculated iteratively:

$${\rm J}_2 (x= 2) ={2 \cdot 1}/{2} \cdot {\rm J}_{1} (x= 2) - {\rm J}_{0} (x= 2) = 0.57672 - 0.22389 = \hspace{0.15cm}\underline{0.35283}\hspace{0.05cm},$$
$${\rm J}_3 (x= 2) ={2 \cdot 2}/{2} \cdot {\rm J}_{2} (x= 2) - {\rm J}_{1} (x= 2) = 2 \cdot 0.35283 - 0.57672 = \hspace{0.15cm}\underline{0.12894}\hspace{0.05cm},$$
$${\rm J}_4 (x= 2) ={2 \cdot 3}/{2} \cdot {\rm J}_{3} (x= 2) - {\rm J}_{2} (x= 2) = 3 \cdot 0.12894 - 0.35283 = \hspace{0.15cm}\underline{0.03400}\hspace{0.05cm}.$$


$\text{Property (B):}$   The symmetry relationship applies ${\rm J}_{–n}(x) = (–1)^n · {\rm J}_n(x)$:

$${\rm J}_{-1}(x) = - {\rm J}_{1}(x), \hspace{0.3cm}{\rm J}_{-2}(x) = {\rm J}_{2}(x), \hspace{0.3cm}{\rm J}_{-3}(x) = - {\rm J}_{3}(x).$$


$\text{Example (B):}$   For the spectrum of the analytic signal, the following applies to Phase Modulation of a sinusoidal signal:

Phase Modulation:   Spectrum of the Analytic Signal
$$S_{\rm +}(f) = A_{\rm T} \cdot \sum_{n = - \infty}^{+\infty}{\rm J}_n (\eta) \cdot \delta \big[f - (f_{\rm T}+ n \cdot f_{\rm N})\big]\hspace{0.05cm}.$$

Denote this

  • $f_{\rm T}$ the carrier frequency   (German:   $\rm T$rägerfrequenz),
  • $f_{\rm N}$ the frequency of the source signal   (German:   $\rm N$achrichtenfrequenz),
  • $A_{\rm T}$ the carrier amplitude   (German:   $\rm T$rägeramplitude).


The parameter of the Bessel functions in this application is the modulation index $\eta$.

Based on the graphic, the following statements are possible:

  • $S_+(f)$ consists here of an infinite number of discrete lines at a distance of $f_{\rm N}$.
  • Thus the sectrum is in principle infinitely extended.
  • The weights of the spectral lines at $f_{\rm T} + n · f_{\rm N}$ ($n$ integer) are determined by the modulation index $η$ over the Bessel functions ${\rm J}_n(η)$.
  • The spectral lines are real in the case of a sinusoidal source signal and a cosinusoidal carrier and symmetrical about $f_{\rm T}$ for even $n$.
  • In the case of odd $n$, a change of sign corresponding to $\text{Property (B)}$ must be taken into account.
  • The Phase Modulation of another phase oscillation of source and / or carrier signal provides the same magnitude spectrum.



Applications of the Bessel Functions

The applications of the Bessel functions in nature and engineering are diverse and play an important role in physics, for example:

  • Electromagnetic waves in a cylindrical waveguide,
  • Solutions to the radial Schrödinger equation,
  • Pressure amplitudes of inviscid rotational flows,
  • Heat conduction in a cylindrical object,
  • Diffusion problems on a lattice,
  • Dynamics of floating bodies,
  • Frequency-dependent friction in circular pipelines
  • Angular resolution.


The Bessel functions are counted among the special functions because of their many applications in mathematical physics.

In the following, we restrict ourselves to a few areas that are addressed in our tutorial $\rm LNTwww$.

$\text{Example (C):} \hspace{0.5cm} \text{Use in Spectral Analysis} \ \Rightarrow \ \text{Kaiser-Bessel filter}$

The spectral leakage effect is the falsification of the spectrum of a periodic and thereby time unlimited signal due to the implicit time limitation of the discrete Fourier transform (DFT). This will be done, for example, by a spectrum analyzer

  • in the time signal not existing frequency components simulated, and/or
  • actually existing spectral components are obscured by sidelobes.

The task of the spectral analysis is to limit the influence of the spectral leakage effect by providing suitable window functions.

Such a window function provides, for example, the Kaiser–Bessel window   ⇒   see section Special Window Functions. Its time-discrete window function with the Bessel function zero order   ⇒   ${\rm J}_0(x)$, the parameter $\alpha=3.5$ and the window length $N$:

$$w_\nu = \frac{ {\rm J}_0\big(\pi \cdot \alpha \cdot \sqrt{1 - (2\nu/N)^2}\big)}{ {\rm J}_0\big(\pi \cdot \alpha \big)}.$$

On the page Quality Criteria of Window Functions and other the parameters of the Kaiser-Bessel window are given:

  • Conveniently, the large are „minimum distance between the main lobe and side lobes” and the desired small „maximum scaling error”.
  • Due to the very large „equivalent noise width” the Kaiser-Bessel window cuts in the most important comparison criterion „maximum process loss” but worse than the established Hamming and Hanning windows.


$\text{Example (D):} \hspace{0.5cm} \text{Rice-Fading Channel Model}$

The Rayleigh - Distribution describes the mobile channel on the assumption that there is no direct path and thus the multiplicative factor $z(t) = x(t) + {\rm j} \cdot y(t)$ is composed solely of diffusely scattered components.

In the case of a direct component (English: Line of Sight, LoS) in the model for the mean-free Gaussian processes $x(t)$ and $y(t)$ one has to add equal components $x_0$ and/or $y_0$ :

Rice-Fading channel model

$$\hspace{0.2cm}x(t) \hspace{0.1cm} \Rightarrow \hspace{0.1cm} x(t) +x_0 \hspace{0.05cm}, \hspace{0.2cm} y(t) \hspace{0.1cm} \Rightarrow \hspace{0.1cm} y(t) +y_0\hspace{0.05cm},$$

$$\hspace{0.2cm}z(t) = x(t) + {\rm j} \cdot y(t) \hspace{0.1cm} \Rightarrow \hspace{0.1cm} z(t) +z_0 \hspace{0.05cm},\hspace{0.2cm} z_0 = x_0 + {\rm j} \cdot y_0\hspace{0.05cm}.$$

The graph shows the Rice–Fading channel model. It can be summarized as follows:

  • The real part $x(t)$ is Gaussianized with mean $x_0$ and variance $\sigma ^2$.
  • The imaginary part $y(t)$ is also Gaussian (mean $y_0$, equal variance $\sigma ^2$) and independent of $x(t)$.
  • For $z_0 \ne 0$, the amount $\vert z(t)\vert$ rice is distributed, from which the term „Rice–Fading” arises.
  • To simplify the notation, we set $\vert z(t)\vert = a(t)$. For $a < 0$ , the amounts - WDF are $f_a(a) \equiv 0$, for $a \ge 0$ the following equation holds, where ${\rm I_0}(x)$ is the modified Besselfunktion zeroth order denotes:
$$f_a(a) = \frac{a}{\sigma^2} \cdot {\rm e}^{ - (a^2 + \vert z_0 \vert ^2)/(2\sigma^2)} \cdot {\rm I}_0 \left [ \frac{a \cdot \vert z_0 \vert}{\sigma^2} \right ] \hspace{0.5cm}\text{with}\hspace{0.5cm}{\rm I }_0 (u) = {\rm J }_0 ({\rm j} \cdot u) = \sum_{k = 0}^{\infty} \frac{ (u/2)^{2k} }{k! \cdot \Gamma (k+1)} \hspace{0.05cm}.$$
  • Between the modified Bessel function and the traditional Bessel function ${\rm I_0}(x)$ – in each case of first kind – So the connection exists ${\rm I }_0 (u) = {\rm J }_0 ({\rm j} \cdot u)$.


$\text{Example (E):} \hspace{0.5cm} \text{Analysis of the Frequency Spectrum of Frequency Modulated Signals}$

$\text{Example (B)}$ has already been shown that the angle modulation of a harmonic oscillation of the frequency $f_{\rm N}$ leads to a line spectrum. The spectral lines are around the carrier frequency $f_{\rm T}$ bei $f_{\rm T} + n \cdot f_{\rm N}$ with $n \in \{ \ \text{...}, -2, -1, \ 0, +1, +2, \text{...} \ \}$. The weights of the Dirac lines are ${\rm J }_n(\eta)$, depending on the modulation index $\eta$.

Discrete spectra with phase modulation (left) and frequency modulation (right)

The graph shows the magnitude spectrum $\vert S_{\rm +}(f) \vert$ of the analytic signal in phase modulation (PM) and frequency modulation (FM), two different forms of angle modulation (WM). Bessellines with values less than $0.03$ are neglected in both cases.

For the upper half of the image, the modulator parameters are chosen so that for each $f_{\rm N} = 5 \ \rm kHz$ here is a Bessel spectrum with the modulation index $η = 1.5$. Disregarding the phase relationships, the same spectra and the same signals result for both systems.

The lower graphics apply with otherwise identical settings for the same message frequency $f_{\rm N} = 3 \ \rm kHz$. One notices:

  • In phase modulation, the spectral function is narrower than $f_{\rm N} = 5 \ \rm kHz$, because the distance of the Bessel lines is now only $3 \ \rm kHz$. Since the modulation index of PM is independent of $f_{\rm N}$, the same bessel weights result as in $f_{\rm N} = 5 \ \rm kHz$.
  • Also in the frequency modulation, the Bessel lines now occur at a distance of $3 \ \rm kHz$. However, since FM has a modulation index inversely proportional to $f_{\rm N}$, there are now more significantly more Bessel lines at the bottom due to the larger modulation index $η = 2.5$ than in the upper right (for $η = 1.5$ valid) chart.


Applet Manual

Bessel abzug3.png

    (A)     Sum formula of the Bessel functions ${\rm J}_n(x)$

    (B)     Selection of the order $n$ for the graphical representation

    (C)     Plot of the Bessel functions

    (D)     Variation of the graphic representation

$\hspace{1.5cm}$„$+$” (Enlarge),

$\hspace{1.5cm}$ „$-$” (Decrease)

$\hspace{1.5cm}$ „$\rm o$” (Reset to default)

$\hspace{1.5cm}$ „$\leftarrow$” (pushed to the left), usw.

    (E)     Selection of the abscissa value $x_1$ for the left numeric output

    (F)     Numerical output of the Bessel function values ${\rm J}_n(x_1)$

    (G)     Selection of the abscissa value $x_2$ for the right numeric output

    (F)     Numerical output of the Bessel function values ${\rm J}_n(x_2)$

About the Authors

This interactive applet was designed and realized at the Lehrstuhl für Nachrichtentechnik of the Technische Universität München.

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