Difference between revisions of "Mobile Communications/The GWSSUS Channel Model"

Generalized system functions of time variant systems

Linear time-invariant systems  $\rm (LTI)$  can be completely described with only two system functions, the transfer function  $H(f)$  and the impulse response  $h(t)$, $h(\tau)$ after renaming ,. In contrast, four different functions are possible with time-variant systems  $\rm (LTV)$ .   There is no formal differentiation of these functions with regard to time and frequency domain representation by a lowercase and uppercase letters.

Therefore a nomenclature change will be made, which can be formalized as follows:

• The four possible system functions are uniformly denoted by  $\boldsymbol{\eta}_{12}$ .
  

• The first subindex is either a  $\boldsymbol{\rm V}$  $($delay time  $\tau)$  or a  $\boldsymbol{\rm F}$  $($frequency  $f)$.
  

• Either a  $\boldsymbol{\rm Z}$  $($Time  $t)$  or a  $\boldsymbol{\rm D}$  $($Doppler frequency  $f_{\rm D})$  is possible as the second subindex.

Relation between the four system functions

Since, in contrast to line-based transmission, the system functions of mobile communications cannot be described deterministically, but are statistical variables, the corresponding correlation functions must be considered later on. 

In the following, we will refer to these as  $\boldsymbol{\varphi}_{12}$,  and use the same indices as for the system functions  $\boldsymbol{\eta}_{12}$.

These formalized designations are inscribed in the graphic in blue letters.

• Additionally, the designations used in other chapters or literature are given  (grey letters).
• In the other chapters these are also partly used.

• At the top you can see the  time variant impulse response   ${\eta}_{\rm VZ}(\tau,\hspace{0.05cm} t) \equiv h(\tau,\hspace{0.05cm} t)$  in the delay–time range.  The associated autocorrelation function (ACF) is

\[\varphi_{\rm VZ}(\tau_1, t_1, \tau_2, t_2) = {\rm E} \big[ \eta_{\rm VZ}(\tau_1,\hspace{0.05cm} t_1) \cdot \eta_{\rm VZ}^{\star}(\tau_2, t_2) \big]\hspace{0.05cm}. \]

• For the  frequency–time representation  you get the  time-variant transfer function   ${\eta}_{\rm FZ}(f,\hspace{0.05cm} t) \equiv H(f,\hspace{0.05cm} t)$.  The Fourier transform with respect to  $\tau$  is represented in the graph by  ${\rm F}_\tau\hspace{0.05cm}[ \cdot ]$ .  The Fourier integral is written out in full:

\[\eta_{\rm FZ}(f, \hspace{0.05cm} t) = \int_{-\infty}^{+\infty} \eta_{\rm VZ}(\tau,\hspace{0.05cm} t) \cdot {\rm e}^{- {\rm j}\cdot 2 \pi f \tau}\hspace{0.15cm}{\rm d}\tau \hspace{0.05cm}, \hspace{0.3cm} \text{kurz:} \hspace{0.2cm} \eta_{\rm FZ}(f, t) \hspace{0.2cm} \stackrel{f, \hspace{0.05cm} \tau}{\bullet\!\!-\!\!\!-\!\!\!-\!\!\circ} \hspace{0.2cm} \eta_{\rm VZ}(\tau, t) \hspace{0.05cm}.\]

The ACF of this time variant transfer function is general:

\[\varphi_{\rm FZ}(f_1, t_1, f_2, t_2) = {\rm E} \big [ \eta_{\rm FZ}(f_1, t_1) \cdot \eta_{\rm FZ}^{\star}(f_2, t_2) \big ]\hspace{0.05cm}.\]

• The  Scatter–Function  ${\eta}_{\rm VD}(\tau,\hspace{0.05cm} f_{\rm D}) \equiv s(\tau,\hspace{0.05cm} f_{\rm D})$  corresponding to the left block describes the mobile communications channel in the  Delay–Doppler Area.   The function parameter  $f_{\rm D}$  describes the  Doppler frequency.   The scatter function results from the time variant impulse response  ${\eta}_{\rm VZ}(\tau,\hspace{0.05cm} t)$  through Fourier transformation with respect to the second parameter  $t$:

\[ \eta_{\rm VD}(\tau, f_{\rm D}) \hspace{0.2cm} \stackrel{f_{\rm D}, \hspace{0.05cm}t}{\bullet\!\!-\!\!\!-\!\!\!-\!\!\circ} \hspace{0.2cm} \eta_{\rm VZ}(\tau, t)\hspace{0.3cm} \Rightarrow \hspace{0.3cm} \varphi_{\rm VD}(\tau_1, f_{\rm D_1}, \tau_2, f_{\rm D_2}) = {\rm E} \left [ \eta_{\rm VD}(\tau_1, f_{\rm D_1}) \cdot \eta_{\rm VD}^{\star}(\tau_2, f_{\rm D_2}) \right ] \hspace{0.05cm}.\]

• Finally, we consider the so-called  frequency-variant transfer function, i.e. the  frequency–Doppler representation.  According to the graph, this can be reached in two ways:

\[\eta_{\rm FD}(f, f_{\rm D}) \hspace{0.2cm} \stackrel{f_{\rm D}, \hspace{0.05cm}t}{\bullet\!\!-\!\!\!-\!\!\!-\!\!\circ} \hspace{0.2cm} \eta_{\rm FZ}(f, t)\hspace{0.05cm},\]

\[\eta_{\rm FD}(f, f_{\rm D}) \hspace{0.2cm} \stackrel{f, \hspace{0.05cm}\tau}{\bullet\!\!-\!\!\!-\!\!\!-\!\!\circ} \hspace{0.2cm} \eta_{\rm VD}(\tau, f_{\rm D})\hspace{0.05cm}.\]

Simplifications due to the GWSSUS requirements

The general relationship between the four system functions is very complicated due to non-stationary effects.

Connections between the description functions of the GWSSUS model

Compared to the general model, some limitations have to be made in order to arrive at a suitable model for the mobile communications channel from which relevant statements for practical applications can be derived.

The following definitions lead to the  $\rm GWSSUS$ model 
$( \rm G$aussian  $\rm W$ide  $\rm S$ense  $\rm S$tationary  $\rm U$ncorrelated  $\rm S$cattering$)$:

• The random process of the channel impulse response  $h(\tau,\hspace{0.1cm} t) = {\eta}_{\rm VZ}(\tau,\hspace{0.1cm} t)$  is generally assumed to be complex  (i.e., description in the equivalent low-pass range),  Gaussian  $($identifier  $\rm G)$  and zero-mean  (Rayleigh, not Rice, that means, no line of sight) .
  

• The random process is weakly stationary  ⇒   its characteristics change only slightly with time, and the ACF  $ {\varphi}_{\rm VZ}(\tau_1,\hspace{0.05cm} t_1,\hspace{0.05cm}\tau_2,\hspace{0.05cm} t_2)$  of the time variant impulse response does not depend on the absolute times  $t_1$  and  $t_2$  but only on the time difference  $\Delta t = t_2 - t_1$.   This is indicated by the identifier  $\rm WSS$    ⇒   $\rm W$ide $\rm S$ense $\rm S$tationary.
  

• The individual echoes due to multipath propagation are uncorrelated, which is expressed by the identifier  $\rm US$   ⇒   $\rm U$ncorrelated $\rm S$cattering.

The mobile communications channel can be described in full according to this graph.  The individual power density spectra  (labeled blue)  and the correlation function  (labeled red)  is explained in detail in the following pages.

Autocorrelation function of the time variant impulse response

We now consider the  Autocorrelation Function  $\rm (ACF)$  of the time variant impulse response   ⇒   $h(\tau,\hspace{0.1cm} t) = {\eta}_{\rm VZ}(\tau,\hspace{0.1cm} t)$  more closely.  It shows

• Based on the  $\rm WSS$ property, the autocorrelation function can be written with  $\Delta t = t_2 - t_1$ :

\[\varphi_{\rm VZ}(\tau_1, t_1, \tau_2, t_2) = \varphi_{\rm VZ}(\tau_1, \tau_2, \Delta t)\hspace{0.05cm}.\]

• Since the echoes were assumed to be independent of each other  $\rm (US$ property$)$, the impulse response can be assumed to be uncorrelated with respect to the delays  $\tau_1$  and  $\tau_2$  Then:

\[\varphi_{\rm VZ}(\tau_1, \tau_2, \Delta t) = 0 \hspace{0.35cm}{\rm f\ddot{u}r}\hspace{0.35cm} \tau_1 \ne \tau_2\hspace{0.05cm}. \]

• If one now replaces  $\tau_1$  with  $\tau$  and  $\tau_2$  with  $\tau + \Delta \tau$, this autocorrelation function can be represented in the following way:

\[\varphi_{\rm VZ}(\Delta \tau, \Delta t) = \delta(\Delta \tau) \cdot {\it \Phi}_{\rm VZ}(\tau, \Delta t) \hspace{0.05cm}. \]

• Because of the convolution property of the Dirac function, the ACF for  $\tau_1 \ne \tau_2$   ⇒   $\Delta \tau \ne 0$ disappears.

• $ {\it \Phi}_{\rm VZ}(\tau, \Delta t) \hspace{0.1cm}$  is the  delay–time's cross power spectrual density , which depends on the delay  $\tau \ (= \tau_1 =\tau_2)$  and on the time difference  $\Delta t = t_2 - t_1$ .

In the overview on the last page, the  delay–time's cross power spectral density  ${\it \Phi}_{\rm VZ}(\tau, \delta t) $  can be seen in the top middle.

• Since  $\eta_{\rm VZ}(\tau, t) $  ,like any  Impulse Response,  has the unit  $\rm [1/s]$ , the autocorrelation function has the unit  $\rm [1/s^2]$:

\[\varphi_{\rm VZ}(\Delta \tau, \Delta t) = {\rm E} \left [ \eta_{\rm VZ}(\tau, t) \cdot \eta_{\rm VZ}^{\star}(\tau + \Delta \tau, t + \Delta t) \right ].\]

• But since the Dirac function with the time argument   $\delta(\Delta \tau)$ also has the unit  $\rm [1/s]$  the delay–time's cross power spectral density  ${\it \Phi}_{\rm VZ}(\tau, \Delta t) $  also has the unit $\rm [1/s]$:

\[\varphi_{\rm VZ}(\Delta \tau, \Delta t) = \delta(\Delta \tau) \cdot {\it \Phi}_{\rm VZ}(\tau, \Delta t) \hspace{0.05cm}.\]

Power spectral density of the time variant impulse response

Delay power spectral density

One obtains the   delay's power spectral density   ${\it \Phi}_{\rm V}(\Delta \tau)$  by setting the second parameter  ${\it \Phi}_{\rm VZ}(\Delta \tau, \Delta t)$  in the function  $\Delta t = 0$ .   The graphic on the right shows an exemplary curve.

The delay's power spectral density is a central quantity for the description of the mobile communications channel.  This has the following characteristics:

• ${\it \Phi}_{\rm V}(\Delta \tau_0)$  is a measure for the "power" of those signal components which are delayed by  $\tau_0$ .  For this purpose, an implicit averaging over all Doppler frequencies  $(f_{\rm D})$  is carried out.
  

• The delay's power spectral density  ${\it \Phi}_{\rm V}(\Delta \tau)$  has, like  ${\it \Phi}_{\rm VZ}(\Delta \tau, \Delta t)$ , the unit  $\rm [1/s]$.   It characterizes the power distribution over all possible delay times  $\tau$.
  

• In the above graphic, the power  $ P_0 \approx {\it \Phi}_{\rm V}(\Delta \tau_0)\cdot \Delta \tau$  of those signal components that arrive at the receiver via any path with a delay between  $\tau_0 \pm \Delta \tau/2$ 
  

• Normalizing the power spectral density  ${\it \Phi}_{\rm V}(\Delta \tau)$  in such a way that the area is  $1$  results in the  probability density function  $\rm (PDF)$ of the delay time:

\[{\rm PDF}_{\rm V}(\tau) = \frac{{\it \Phi}_{\rm V}(\tau)}{\int_{0 }^{\infty}{\it \Phi}_{\rm V}(\tau)\hspace{0.15cm}{\rm d}\tau} \hspace{0.05cm}.\]

Note on nomenclature:

• In the book "Stochastic Signal Theory" we would have denoted this  Probability Density Function  with  $f_\tau(\tau)$ .
• To make the connection between  ${\it \Phi}_{\rm V}(\Delta \tau)$  and the PDF clear and to avoid confusion with the frequency  $f$  we use the nomenclature given here.
  

$\text{Example 1: Delay models according to COST 207}$

In the 1990s, the European Union founded the working group COST 207 with the aim to provide standardized channel models for cellular mobile communications.  where "COST" stands for  European Cooperation in Science and Technology.

In this international committee profiles for the delay time  $\tau$  have been developed, based on measurements and valid for different application scenarios.   In the following, four different delay's power spectral densities are given, where the normalization factor  ${\it \Phi}_0 = {\it \Phi}_{\rm V}(\tau = 0)$  is always used.  The graph shows the PSDs of these profiles in logarithmic representation:

Delay power density according to COST

(1)  profile $\rm RA$ (Rural Area)   ⇒   rural area:

\[{\it \Phi}_{\rm V}(\tau)/{\it \Phi}_{\rm 0} = {\rm e}^{ -\tau / \tau_0} \hspace{0.3cm}{\rm in \hspace{0.15cm}range}\hspace{0.3cm} 0 < \tau < 0.7\,{\rm µ s}\hspace{0.05cm},\hspace{0.15cm}\tau_0 = 0.109\,{\rm µ s}\hspace{0.05cm}.\]

(2)  profile $\rm TU$ (Typical Urban)   ⇒   cities and suburbs:

\[{\it \Phi}_{\rm V}(\tau)/{\it \Phi}_{\rm 0} = {\rm e}^{ -\tau / \tau_0} \hspace{0.3cm}{\rm in \hspace{0.15cm}range}\hspace{0.3cm} 0 < \tau < 7\,{\rm µ s}\hspace{0.05cm},\hspace{0.15cm}\tau_0 = 1\,{\rm µ s}\hspace{0.05cm}.\]

(3)  profile $\rm BU$ (Bad Urban)   ⇒   unfavourable conditions in cities:

\[{\it \Phi}_{\rm V}(\tau)/{\it \Phi}_{\rm 0} = \left\{ \begin{array}{c} {\rm e}^{ -\tau / \tau_0}\\ 0.5 \cdot {\rm e}^{ (5\,{\rm µ s}-\tau) / \tau_0} \end{array} \right.\quad \begin{array}{*{1}l} \hspace{0.1cm} {\rm für}\hspace{0.3cm} 0 < \tau < 5\,{\rm µ s}\hspace{0.05cm},\hspace{0.15cm}\tau_0 = 1\,{\rm µ s}\hspace{0.05cm}, \\ \hspace{0.1cm} {\rm für}\hspace{0.3cm} 5\,{\rm µ s} < \tau < 10\,{\rm µ s}\hspace{0.05cm},\hspace{0.15cm}\tau_0 = 1\,{\rm µ s} \hspace{0.05cm}. \\ \end{array}\]

(4)  profile $\rm HT$ (Hilly Terrain)   ⇒   hilly and mountainous regions:

\[{\it \Phi}_{\rm V}(\tau)/{\it \Phi}_{\rm 0} = \left\{ \begin{array}{c} {\rm e}^{ -\tau / \tau_0}\\ 0.04 \cdot {\rm e}^{ (15\,{\rm µ s}-\tau) / \tau_0} \end{array} \right.\quad \begin{array}{*{1}l} \hspace{-0.25cm} {\rm für}\hspace{0.3cm} 0 < \tau < 2\,{\rm µ s}\hspace{0.05cm},\hspace{0.15cm}\tau_0 = 0.286\,{\rm µ s}\hspace{0.05cm}, \\ \hspace{-0.25cm} {\rm for}\hspace{0.3cm} 15\,{\rm µ s} < \tau < 20\,{\rm µ s}\hspace{0.05cm},\hspace{0.15cm}\tau_0 = 1\,{\rm µ s} \hspace{0.05cm}. \\ \end{array}\]

One can tell from the graphics:

• The exponential functions in linear representation now become straight lines.
  
• For logarithmic display, you can read the PSD parameter  $\tau_0$  for  $\rm 10 \cdot lg \ (1/e) = -4.34 \ dB$  as shown in the graph for the  $\rm TU$ profile.
• These four COST–profiles are described in the  Excercise 2.8  in more detail.

ACF and PSD of the frequency-variant transfer function

The system function   $\eta_{\rm FD}(f, f_{\rm D})$  described in the nbsp; overview on the first page of this chapter  is also known as the  frequency-variant transfer function  where the adjective "frequency-variant" refers to the Doppler frequency

The associated ACF is defined as follows:

\[\varphi_{\rm FD}(f_1, f_{\rm D_1}, f_2, f_{\rm D_2}) = {\rm E} \left [ \eta_{\rm FD}(f_1, f_{\rm D_1}) \cdot \eta_{\rm FZ}^{\star}(f_2, f_{\rm D_2}) \right ]\hspace{0.05cm}. \]

By similar considerations as on the  previous page  this autocorrelation function can be represented under GWSSUS–conditions as follows

\[\varphi_{\rm FD}(\Delta f, \Delta f_{\rm D}) = \delta(\Delta f_{\rm D}) \cdot {\it \Phi}_{\rm FD}(\Delta f, f_{\rm D}) \hspace{0.05cm}.\]

The following applies:

• ${\it \Phi}_{\rm FD}(\Delta f, f_{\rm D})$  is the so-called  frequency–Doppler's cross power spectral density, which is highlighted in the graphic at the end of the page by a yellow background.
  

• The first argument  $\Delta f = f_2 - f_1$  takes into account that ACF and PSD depend only on the frequency difference due to the  stationarity .
• The factor  $\delta (\Delta f_{\rm D})$  with  $\Delta f_{\rm D} = f_{\rm D_2} - f_{\rm D_1}$  expresses the uncorrelation of the PSD with respect to the Doppler shift.
  

• You get from  ${\it \Phi}_{\rm FD}(\Delta f, f_{\rm D})$  to  Doppler's Power Spectral Density   ${\it \Phi}_{\rm D}(f_{\rm D})$ if you set  $\Delta f= 0$ 
• The Doppler's power spectral density  ${\it \Phi}_{\rm D}(f_{\rm D})$  indicates the power with which individual Doppler frequencies occur.
  

• The  probability density  of the Doppler frequency is obtained from  ${\it \Phi}_{\rm D}(f_{\rm D})$  by suitable surface normalization.   The PDF has like  ${\it \Phi}_{\rm D}(f_{\rm D})$  the unit  $\rm [1/Hz]$ 

To calculate the Doppler's PSD

\[{\rm PDF}_{\rm D}(f_{\rm D}) = \frac{{\it \Phi}_{\rm D}(f_{\rm D})}{\int_{-\infty }^{+\infty}{\it \Phi}_{\rm D}(f_{\rm D})\hspace{0.15cm}{\rm d}f_{\rm D}} \hspace{0.05cm}.\]

• Often, for example for a vertical monopulse antenna in an isotropically scattered field, the  ${\it \Phi}_{\rm D}(f_{\rm D})$  given through the  Jakes–spectrum .
  

The frequency–Doppler's cross power spectral density   ${\it \Phi}_{\rm FD}(\Delta f, f_{\rm D})$  is highlighted in yellow.

• The Fourier connections to the neighboring GWSSUS–system description functions are also marked.

• We refer here to the interactive applet  Clarifying the Doppler Effect.

ACF and PSD of the delay Doppler function

The system function shown in the  Overview on the first page of this chapter  on the left hand side was named  $\eta_{\rm VD}(\tau, f_{\rm D})$ .  The ACF of this delay–Doppler–function can be written with  $\Delta \tau = \tau_2 - \tau_1$  and  $\Delta f_{\rm D} = f_{\rm D2} - f_{\rm D1}$  taking into account the GWSSUS properties with  $\Delta \tau = \tau_2 - \tau_1$  and  $\Delta f_{\rm D}{\rm D2} = f_{\rm D2} - f_{\rm D1}$  as follows

\[\varphi_{\rm VD}(\tau_1, f_{\rm D_1}, \tau_2, f_{\rm D_2}) = \varphi_{\rm VD}(\Delta \tau, \Delta f_{\rm D}) = \delta(\Delta \tau) \cdot {\rm \delta}(\Delta f_{\rm D}) \cdot {\it \Phi}_{\rm VD}(\tau, f_{\rm D}) \hspace{0.05cm}.\]

It should be noted about this equation:

• The first Dirac function  $\delta (\delta \tau)$  takes into account that the delays are uncorrelated ("Uncorrelated Scattering").
• The second Dirac function  $\delta (\Delta f_{\rm D})$  follows from the stationarity ("Wide Sense Stationary").
  

• The delay–Doppler's PSD   ${\it \Phi}_{\rm VD}(\tau, f_{\rm D})$ , also called  Scatter–PSD , can be derived from  ${\it \Phi}_{\rm VZ}(\tau, \Delta t)$  or   ${\it \Phi}_{\rm FD}(\Delta f, f_{\rm D})$ :

\[{\it \Phi}_{\rm VD}(\tau, f_{\rm D}) ={\rm F}_{\Delta t} \big [ {\it \Phi}_{\rm VZ}(\tau, \Delta t) \big ] = \int_{-\infty}^{+\infty} {\it \Phi}_{\rm VZ}(\tau, \Delta t) \cdot {\rm e}^{- {\rm j}\hspace{0.05cm}\cdot \hspace{0.05cm}2 \pi \hspace{0.05cm}\cdot \hspace{0.05cm}f_{\rm D} \hspace{0.05cm}\cdot \hspace{0.05cm}\Delta t}\hspace{0.15cm}{\rm d}\Delta t \hspace{0.05cm},\]

\[{\it \Phi}_{\rm VD}(\tau, f_{\rm D}) = {\rm F}_{f_{\rm D}}^{-1} \big [ {\it \Phi}_{\rm FD}(\Delta f, f_{\rm D}) \big ] = \int_{-\infty}^{+\infty} {\it \Phi}_{\rm FD}(\Delta f, f_{\rm D}) \cdot {\rm e}^{+{\rm j}\hspace{0.05cm}\cdot \hspace{0.05cm} 2 \pi \hspace{0.05cm}\cdot \hspace{0.05cm} \tau \hspace{0.05cm}\cdot \hspace{0.05cm} \Delta f}\hspace{0.15cm}{\rm d}\Delta f \hspace{0.05cm}. \]

• Both the system function  $\eta_{\rm VD}(\tau, f_{\rm D})$  and the derived functions  $\varphi _{\rm VD}(\delta \tau, \delta f_{\rm D})$  and  ${\it \Phi}_{\rm VD}(\tau, f_{\rm D})$  are dimensionless.   For more information on this, see the specification for  Excercise 2.6.

• Furthermore, if the GWSSUS requirements are met, the scatter function is equal to the product of the delay's and Doppler's PSDs:

\[{\it \Phi}_{\rm VD}(\tau, f_{\rm D}) = {\it \Phi}_{\rm V}(\tau) \cdot {\it \Phi}_{\rm D}(f_{\rm D})\hspace{0.05cm}.\]

One-dimensional description functions of the GWSSUS model [class=fit

ACF and PSD of the time variant transfer function

The following diagram shows all the relationships between the individual power spectral densities once again in compact form.

Compact summary of all GWSSUS description sizes

This has already been discussed on the last pages:

• the  delay–time–Cross-Power Density Spectrum:

$${\it \Phi}_{\rm VZ}(\tau, \delta t)\hspace{0.55cm}\Rightarrow \hspace{0.3cm}\text{with} \hspace{0.2cm}\delta t = 0\text{:} \hspace{0.2cm} {\it \Phi}_{\rm V}(\tau),$$

• the  frequency–Doppler–cross-power spectral density:

$${\it \Phi}_{\rm FD}(\Delta f, f_{\rm D})\hspace{0.3cm}\Rightarrow \hspace{0.3cm}\text{with} \hspace{0.2cm}\Delta f = 0\text{:} \hspace{0.2cm} {\it \Phi}_{\rm D}( f_{\rm D}),$$

• the  delay–Doppler's Cross-Power Spectral Density :

$${\it \Phi}_{\rm VD}(\tau, f_{\rm D})= {\it \Phi}_{\rm V}(\tau) \cdot {\it \Phi}_{\rm D}(f_{\rm D})\hspace{0.05cm}.$$

The  frequency–time's Correlation function
(marked yellow in the adjacent graph) has not yet been considered:

\[\varphi_{\rm FZ}(f_1, t_1, f_2, t_2) = {\rm E} \left [ \eta_{\rm FZ}(f_1, t_1) \cdot \eta_{\rm FZ}^{\star}(f_2, t_2) \right ]\hspace{0.05cm}.\]

Considering again the GWSSUS simplifications and the identity  $\eta_{\rm FZ}(f, \hspace{0.05cm}t) = H(f, \hspace{0.05cm}t)$, the ACF can be also written with  $\Delta f = f_2 - f_1$  and  $\Delta t = t_2 - t_1$  as follows:

\[\varphi_{\rm FZ}(f_1, t_1, f_2, t_2) \hspace{0.3cm} \Rightarrow \hspace{0.3cm}\varphi_{\rm FZ}(\Delta f, \Delta t) = {\rm E} \big [ H(f, t) \cdot H^{\star}(f + \Delta f, t + \Delta t) \big ]\hspace{0.05cm}.\]

It should be noted in this respect:

• You can see from the name that  $\varphi_{\rm FZ}(\Delta f, \Delta t)$  is a correlation function and not a power spectral density like the functions  $\varphi_{\rm FZ}(\Delta f, \Delta t)$  ${\it \Phi}_{\rm VZ}(\tau, \Delta t)$,  ${\it \Phi}_{\rm FD}(\Delta f, f_{\rm D})$  and  ${\it \Phi}_{\rm VD}(\tau, f_{\rm D})$.
  

• The Fourier connections with the neighboring functions are:

\[{\it \Phi}_{\rm VZ}(\tau, \Delta t) \hspace{0.2cm} \stackrel{\tau, \hspace{0.05cm}\Delta f}{\circ\!\!-\!\!\!-\!\!\!-\!\!\bullet} \hspace{0.2cm} \varphi_{\rm FZ}(\Delta f, \hspace{0.05cm}\Delta t) \hspace{0.2cm} \stackrel{\Delta t,\hspace{0.05cm} f_{\rm D}}{\circ\!\!-\!\!\!-\!\!\!-\!\!\bullet} \hspace{0.2cm} {\it \Phi}_{\rm FD}(\Delta f,\hspace{0.05cm} f_{\rm D}) \hspace{0.05cm}.\]

• If you set the parameters  $\Delta t = 0$  or   $\Delta f = 0$ in this 2D– function, the separate correlation functions for the frequency domain or the time domain result:

\[\varphi_{\rm F}(\Delta f) = \varphi_{\rm FZ}(\Delta f, \Delta t = 0) \hspace{0.05cm},\]

\[\varphi_{\rm Z}(\Delta t) = \varphi_{\rm FZ}(\Delta f = 0, \Delta t ) \hspace{0.05cm}.\]

• From the above graph it is also clear that these correlation functions correspond to the derived power spectral densities via Fourier transformation:

\[\varphi_{\rm F}(\Delta f) \hspace{0.2cm} {\bullet\!\!-\!\!\!-\!\!\!-\!\!\circ} \hspace{0.2cm} {\it \Phi}_{\rm V}(\tau)\hspace{0.05cm}, \hspace{0.4cm}\varphi_{\rm Z}(\Delta t) \hspace{0.2cm} {\circ\!\!-\!\!\!-\!\!\!-\!\!\bullet} \hspace{0.2cm} {\it \Phi}_{\rm D}(f_{\rm D})\hspace{0.05cm}.\]

Parameters of the GWSSUS model

According to the results on the last page, the mobile channel is replaced by

• the delay–power spectral density  ${\it \Phi}_{\rm V}(\tau)$  and
  

• the Doppler–power spectral density  ${\it \Phi}_{\rm D}(f_{\rm D})$
  
  

By suitable normalization to the respective area  $1$  the density functions result with respect to the delay time  $\tau$  or the Doppler frequency  $f_{\rm D}$.

Characteristic values can be derived from the power spectral densities or the corresponding correlation functions.  The most important ones are listed here:

$\text{Example 2:}$  The graphic on the left side shows the delay's power density  ${\it \Phi}_{\rm V}(\tau)$

Multiplexing and coherence bandwidth

• with  $T_{\rm V} = 1 \ \rm µs$  (red curve),
• with  $T_{\rm V} = 2 \ \rm µs$  (blue curve).

In the right-hand  $\varphi_{\rm F}(\delta f)$–representation, the coherence bandwidths are drawn in:

• $B_{\rm K} = 276 \ \rm kHz$  (red curve),
• $B_{\rm K} = 138 \ \rm kHz$  (blue curve).

You can see from these numerical values

• The multipath spread   $T_{\rm V}$ ,obtainable from   ${\it \Phi}_{\rm V}(\tau)$ , and the coherence bandwidth  $B_{\rm K}$ ,determined by   $\varphi_{\rm F}(\delta f)$ , stand in a fixed relation to each other:   $B_{\rm K} \approx 0.276/T_{\rm V}$.
• The often  used approximation  $B_{\rm K}\hspace{0.02cm}' \approx 1/T_{\rm V}$  is, however, very inaccurate at exponential  ${\it \Phi}_{\rm V}(\tau)$ .

Let us now consider the time variance characteristics derived from the time correlation function  $\varphi_{\rm Z}(\delta t)$  or from the Doppler's PSD  ${\it \Phi}_{\rm D}(f_{\rm D})$ :

$\text{Example 3:}$  The diagram is valid for a time variant channel without direct component. Shown on the left is the  Jakes–Spectrum  ${\it \Phi}_{\rm D}(f_{\rm D})$.

Doppler spread and correlation time

The Doppler spread  $B_{\rm D}$  can be determined from this:

\[f_{\rm D,\hspace{0.05cm}max} = 50\,{\rm Hz}\hspace{-0.1cm}: \hspace{-0.1cm}\hspace{0.45cm} B_{\rm D} \approx 35\,{\rm Hz} \hspace{0.05cm},\]

\[f_{\rm D,\hspace{0.05cm}max} = 100\,{\rm Hz}\hspace{-0.1cm}: \hspace{-0.1cm}\hspace{0.2cm} B_{\rm D} \approx 70\,{\rm Hz} \hspace{0.05cm}.\]

The time correlation function  $\varphi_{\rm Z}(\Delta t)$  is sketched on the right, as the Fourier transform of  ${\it \Phi}_{\rm D}(f_{\rm D})$ .

This can be expressed given boundary conditions and with the Bessel function as:

\[\varphi_{\rm Z}(\Delta t \hspace{-0.05cm} = \hspace{-0.05cm}T_{\rm D}) \hspace{-0.05cm}= \hspace{-0.05cm} {\rm J}_0(2 \pi \hspace{-0.05cm} \cdot \hspace{-0.05cm} f_{\rm D,\hspace{0.05cm}max} \hspace{-0.05cm}\cdot \hspace{-0.05cm}\Delta t ).\]

• The correlation duration of the blue curve is  $T_{\rm D} = 4.84 \ \rm ms$.
• For  $f_{\rm D,\hspace{0.05cm}max} = 100\,{\rm Hz}$  the correlation duration is only half.
• In this case, it geneally applies:   $B_{\rm D} \cdot T_{\rm D}\approx 0.17$.

Simulation according to the GWSSUS model

The Monte–Carlo–method, shortly described for the simulation of a GWSSUS mobile communication channel is based on work by Rice [Ric44]^[1] and Höher [Höh90]^[2].

• The 2D–impulse response is represented by a sum of $M$ complex exponential functions.  $M$  can be interpreted as the number of different paths:

\[h(\tau,\ t)= \frac{1}{\sqrt {M}} \cdot \sum_{m=1}^{M} \alpha_m \cdot \delta (t - \tau_m) \cdot {\rm e}^{{\rm j} \hspace{0.05cm} \phi_{m} }\cdot {\rm e}^{ {\rm j} \hspace{0.05cm}2 \pi f_{{\rm D},\hspace{0.05cm} m} t} \hspace{0.05cm}. \]

• First, the delays  $\tau_m$,  the attenuation factors  $\alpha_m$,  the equally distributed phases  $\phi_m$  and the Doppler frequencies  $f_{{\rm D},\hspace{0.05cm} m}$  will be randomly generated according to the GWSSUS specifications. The base for the random generation of the Doppler frequencies  $f_{{\rm D},\hspace{0.05cm} m}$  is the  Jakes–Spectrum  ${\it \Phi}_{\rm D}(f_{\rm D})$, which, appropiately normalized, simultaneously indicates the PDF of the Doppler frequencies.
  

• Because of  ${\it \Phi}_{\rm VD}(\tau, f_{\rm D}) = {\it \Phi}_{\rm V}(\tau) \cdot {\it \Phi}_{\rm D}(f_{\rm D})$&nbsp the delay time  $\tau_m$  is independent of the Doppler frequency  $f_{{\rm D},\hspace{0.05cm} m}$  for all  $m$ .  This is valid with good approximation, for terrestrial land mobile communication.   For the random generation of the parameters  $\alpha_m$  and  $\tau_m$,  which determine the delay–power spectral density  $ {\it \Phi}_{\rm V}(\tau)$  the following   COST profiles  are available: $\rm RA$  (Rural Area),  $\rm TU$  (Typical Urban),  $\rm BU$  (Bad Urban)  and  $\rm HT$  (Hilly Terrain).
  

• The greater the number of different paths   $M$  is chosen for the simulation, the better a real impulse response is approximated by the above equation.  However, the higher accuracy of the siulation is at the expense of its duration.  In the literature, favorable values are given for  $M$  between  $100$  and  $600$ .
  

Time variant transfer function
$($The absolute value squared is  simulated$)$

Excercises to the chapter

Exercise 2.5: Scatter Function

Exercise 2.5Z: Multi-Path Scenario

Exercise 2.6: Dimensions in GWSSUS

Exercise 2.7: Coherence Bandwidth

Exercise 2.7Z: Coherence Bandwidth of the LTI Two-Path Channel

Exercise 2.8: COST Delay Models

Exercise 2.9: Coherence Time

List of sources