Difference between revisions of "Mobile Communications/General Description of Time Variant Systems"
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$\text{Definitions:}$ The following input signals are suitable for detecting the linear distortions caused by $H(f)$ or $h(t)$: | $\text{Definitions:}$ The following input signals are suitable for detecting the linear distortions caused by $H(f)$ or $h(t)$: | ||
− | *a [[Signal_Representation/Special_Cases_of_Impulse_Signals#Dirac_Delta_Impulse|Dirac impulse]] | + | *a [[Signal_Representation/Special_Cases_of_Impulse_Signals#Dirac_Delta_Impulse|Dirac impulse]] or "Delta impulse": |
:$$s(t) = \delta(t) \hspace{0.3cm}\Rightarrow \hspace{0.3cm} r(t) = \delta(t) \star h(t)= h(t)\hspace{0.3cm}\Rightarrow \hspace{0.3cm} \text{impulse response,}$$ | :$$s(t) = \delta(t) \hspace{0.3cm}\Rightarrow \hspace{0.3cm} r(t) = \delta(t) \star h(t)= h(t)\hspace{0.3cm}\Rightarrow \hspace{0.3cm} \text{impulse response,}$$ | ||
*a [[Linear_and_Time_Invariant_Systems/System_Description_in_Time_Domain#Step_response|step response]] or "Heaviside step function": | *a [[Linear_and_Time_Invariant_Systems/System_Description_in_Time_Domain#Step_response|step response]] or "Heaviside step function": |
Revision as of 11:47, 15 February 2021
Contents
# SYNOPSIS OF THE SECOND MAIN CHAPTER #
After the time variance, the term Frequency Selectivity is now introduced and illustrated with examples, a channel property which is also of great importance for mobile communications. As in the entire book, the description is given in the equivalent low-pass range.
It is covered in detail:
- the difference between time invariant and time variant systems,
- the time variant impulse response as an important descriptive function of time variant systems,
- multi-way reception as the cause of frequency-selective behaviour,
- a detailed derivation and interpretation of the GWSSUS channel model,
- the characteristics of the GWSSUS model: coherence bandwidth, correlation duration, etc.
Transfer function and impulse response
The description parameters of a communication system have already been described in two chapters of the book "Linear Time Variant Systems":
The most important results are briefly explained again here. We assume a linear and time invariant system ⇒ $\text{LTI system}$ with the signal $s(t)$ at the input and the output signal $r(t)$. For the sake of simplicity, let $s(t)$ and $r(t)$ be real. Then the following applies:
- The system can be completely characterized by the transfer function $H(f)$ which is also referred to as the "frequency response". By definition :$$H(f) = R(f)/S(f).$$
- Similarly, the system is defined by the impulse response $h(t)$ , which is the inverse Fourier transform of $H(f)$. The output signal results from the convolution:
- \[r(t) = s(t) \star h(t) \hspace{0.4cm} {\rm with} \hspace{0.4cm} h(t) \hspace{0.2cm} \circ\!\!-\!\!\!-\!\!\!-\!\!\bullet \hspace{0.2cm} H(f) \hspace{0.05cm}.\]
$\text{Definitions:}$ The following input signals are suitable for detecting the linear distortions caused by $H(f)$ or $h(t)$:
- a Dirac impulse or "Delta impulse":
- $$s(t) = \delta(t) \hspace{0.3cm}\Rightarrow \hspace{0.3cm} r(t) = \delta(t) \star h(t)= h(t)\hspace{0.3cm}\Rightarrow \hspace{0.3cm} \text{impulse response,}$$
- a step response or "Heaviside step function":
- $$s(t) = \gamma(t) \hspace{0.3cm}\Rightarrow \hspace{0.35cm} r(t) = \gamma(t) \star h(t)\hspace{1.5cm}\Rightarrow \hspace{0.3cm} \text{step response,}$$
- a Dirac comb or "Dirac impulse train":
- $$s(t) = p_\delta(t) \hspace{0.25cm}\Rightarrow \hspace{0.3cm} r(t) = p_\delta(t) \star h(t)\hspace{1.3cm}\Rightarrow \hspace{0.3cm} \text{impulse response train.}$$
On the other hand, a DC signal $s(t) = A$ is not suitable to make the frequency dependence of the LTI system visible:
⇒ With a low-pass system the output signal would then be always constant, independent of $H(f)$: $r(t) = A \cdot H(f= 0)$.
On the next page we consider a Dirac impulse train $p_\delta(t)$ as an input signal $s(t)$:
⇒ Hereby the similarities and differences between time-invariant and time-variant systems can be shown clearly.
Note: The properties of $H(f)$ and $h(t)$ are covered in detail in the $\text{LNTwww learning video}$ (in German language):
Eigenschaften des Übertragungskanals ⇒ "Some remarks on the transfer function".
Time–invariant vs. time–variant channels
The graphic is intended to illustrate the difference between a linear time–invariant channel $\rm (LTI)$ and a linear time–variant channel $\rm (LTV)$ .
One can see from this illustration:
- The transmitted signal $s(t)$ is a Dirac impulse train $p_\delta(t)$, i.e. an infinite sequence of Dirac impulses in equidistant intervals $T$, all with the weight $1$ (see upper graph):
- \[s(t) = p_{\rm \delta} (t) = \sum_{n = -\infty}^{+\infty} {\rm \delta} (t - n \cdot T) \hspace{0.05cm}.\]
- The Dirac impulse at $t = 0$ is marked in green. The signal at the channel output is equal to $r(t) = h(t)$ , with $s(t) = {\rm \delta}(t)$ , also indicated in green. As a condition, it is assumed that the extension of the impulse response $h(t)$ is smaller than $T$.
.
- The entire received signal after the LTI channel, according to the middle graph, can then be written as:
- \[r(t) = p_{\rm \delta} (t) \star h(t) = \sum_{n = -\infty}^{+\infty} h (t - n \cdot T) \hspace{0.05cm}.\]
- For a time-variant channel (lower graph) this equation is not applicable. In each time interval, a (slightly) different signal shape is obtained.
$\text{Conclusion:}$ With a time-variant channel you cannot specify neither a one-parameter impulse response $h(t)$ nor a transfer function $H(f)$ .
Note: The differences between LTI and LTV systems are clarified with the $\text{LNTwww learning video}$ (in German language):
Eigenschaften des Übertragungskanals ⇒ "Some remarks on the transfer function".
Two-dimensional impulse response
To identify a time-variant impulse response, a second parameter is used and the impulse response is preferably mapped in a three-dimensional coordinate system.
The condition for this is that the channel is still linear. One speaks then of a $\text{LTV system}$ ("linear time-variant").
The following relations apply:
- \[\text{LTI:}\hspace{0.5cm} r(t) = \int_{-\infty}^{+\infty} h(\tau) \cdot s(t-\tau) \hspace{0.15cm}{\rm d}\tau \hspace{0.05cm},\]
- \[\text{LTV:}\hspace{0.5cm} r(t) \hspace{-0.1cm} = \hspace{-0.1cm} \int_{-\infty}^{+\infty} h(\tau, \hspace{0.1cm}t) \cdot s(t-\tau) \hspace{0.15cm}{\rm d}\tau \hspace{0.05cm}.\]
Regarding the last equation and the above graph, it should be noted
- The parameter $\tau$ specifies the delay time to denote the time dispersion. By writing out the convolution operation, it was possible to make $\tau$ also the parameter of the LTI impulse response. On the last pages we spoke about $h(t)$ .
- The second parameter of the impulse response or the second axis marks the absolute time $t$, which is used, among other things, to describe the time variance. At different times $t$ the impulse response $h(\tau, \hspace{0.05cm}t)$ has a different form.
- A peculiarity of the 2D representation is that the $t$–axis is always plotted time-discretely $($at multiples of $T)$ while the $\tau$–axis can be continuous in time as in the example shown. However, in mobile communications, a time-discrete $h(\tau, \hspace{0.05cm}t_0)$ with respect to $\tau$ is assumed $($„echoes”$)$.
- The LTV equation is only applicable if the change of the channel $($marked in the figure by the parameter $T)$ proceeds slowly in comparison to the maximum delay $\tau_{\rm max}$. In mobile communications this condition ⇒ $\tau_{\rm max} < T$ is almost always fulfilled.
- Selecting whether to apply the first Fourier integral to the parameter $\tau$ or $t$ leads to different spectral functions. In the Exercise 2.1Z for example, the time variant 2D–Transfer function is considered:
- \[H(f,\hspace{0.05cm} t) \hspace{0.2cm} \bullet\!\!-\!\!\!-\!\!\!-\!\!\circ \hspace{0.2cm} h(\tau,\hspace{0.05cm}t) \hspace{0.05cm}.\]
Exercises to the chapter
Exercise 2.1: Two-Dimensional Impulse Response
Exercise 2.1Z: 2D-Frequency and 2D-Time Representations