Exercise 2.1: Two-Dimensional Impulse Response

Two-dimensional impulse response

It is supposed to determine the two-dimensional impulse response $h(\dew,\hspace{0.05cm}t) = \sum_{m = 1}^{M} z_m(t) \cdot {\rm \delta} (\tau - \tau_m)$

can be analyzed according to the adjoining diagram. The two axes are time-discrete:

$\tau$ indicates the delay time and can take values between $0$ and $6 \ {\rm µ s}$ in the example.
The absolute time $t$ makes statements about the frequency of snapshots and characterizes the time variance. It holds $t = n \cdot T$ , where $T \gg \tau_{\rm max}$ should hold.

The arrows in the graphic mark different Dirac functions with the impulse weights $1$ (red), $1/2$ (blue) and $1/4$ (green). This means that the delay time $\tau$ is also time-discrete here.

When measuring the impulse responses at different times $t$ at second intervals, the resolution of the $\tau$ –axis $2$ microseconds $(\delta \tau = 2 \ \rm µ s)$ . The echoes were not localized more precisely.

In this task the following quantities are also referred to:

the time variant transfer function according to the definition

$$H(f,\hspace{0.05cm} t) \hspace{0.2cm} \stackrel {f,\hspace{0.05cm}{\a6}{\bullet}{\bullet\!-\!-\!-\!-\!-\!\circ} \hspace{0.2cm} h(\dew,\hspace{0.05cm}t) \hspace{0.05cm},$$

the approximation of the coherence bandwidth as the reciprocal of the maximum extension of $h(\tau, t)$ :

$B_{\rm K} \hspace{0.01cm}' = \frac{1}{\frac_{\rm max} - \dew_{\rm min}} \hspace{0.05cm}.$

Notes:

The task belongs to the topic of the chapter General Description of Time Variant Systems.
More detailed information on various definitions for the coherence bandwidth can be found in chapter The GWSSUS–Channel Model, especially in the sample solution for the Task 2.7Z.
It should be noted that this is a constructed task. According to the above graphic, the 2D–impulse response changes significantly during the time span $T$ seriously. Therefore $T$ is to be interpreted here as very large, for example one hour.
In mobile radio, $h(\tau, t)$ changes in the millisecond range taking into account the Doppler effect, but the changes during this time are rather moderate.

=Questionnaire

$B_{\rm max} \ = \$

$\ \ \rm kHz$

$t_{\rm 2} \ = \$

$\ \cdot T$

$t_{\rm 3} \ = \$

$\ \cdot T$

$t = 3T \text{:} \hspace{0.4cm} B_{\rm K} \hspace{0.01cm}' \ = \$

$\ \ \rm kHz$

$t = 4T \text{:} \hspace{0.4cm} B_{\rm K} \hspace{0.01cm}' \ = \$

$\ \ \rm kHz$

$t = 5T \text{:} \hspace{0.4cm} B_{\rm K} \hspace{0.01cm}' \ = \$

$\ \ \rm kHz$

$t_{\rm 5} \ = \$

$\ \cdot T$

	A (slow) channel change occurs approximately after $T = 1 \ \rm µ s$ .
	A (slow) channel change takes place approximately after $T = 1 \ \rm s$ .

Sample solution

{

Solution

(1) The message signal described in the equivalent low-pass band shall not have a bandwidth greater than

$B_{\rm max} = 1/\delta \tau \ \underline {= 500 \ \rm kHz}$ .

This mathematical (two-sided) bandwidth of the low pass–signal is also the maximum physical (one-sided) bandwidth of the corresponding bandpass–signal.

(2) $H(f, t_{\rm 2}) = 1$ means in the time domain $h(\tau, t_{\rm 2}) = \delta(\tau)$ .

Only then the channel is ideal.
You can see from the graphic that this only applies to the time $t_{\rm 2} \ \underline {= 0}$ .

(3) Distortions occur if at time $t$ the impulse response is composed of two or more Dirac functions ⇒ $t ≥ t_{\rm 3} \ \ \underline {\a6}$ 3T

At time $t = T$ the signal $s(t)$ is delayed only by $2 \ \rm µ s$ .
At $t = 2T$ the amplitude is additionally reduced by $50 \%$ ( $6 \ \ \rm dB$ loss).

(4) At time $t = 3T$ the two Dirac functions occur at $\tau_{\rm min} = 0$ and $\tau_{\rm max} = 4 \ \rm µ s$ .

The (simple approximation for the) coherence bandwidth is the reciprocal of this

$$B_{\rm K}\hspace{0.01cm}' = \frac{1}{4\,\,{\,}{\rm µ s} \hspace{0.25cm} \underline{ = 250\,\,\,{\rm kHz}} \hspace{0.05cm}.$$

As even at the time $t = 4T$ the Dirac functions are $4 \ \rm µ s$ apart, you also get $B_{\rm K} here \hspace{0.01cm}' = \underline {250 \ \rm kHz}$ .
At $t = 5T$ the impulse response has an extension of $6 \ \ \rm µ s \ \ \Rightarrow \ {\it B}_{\rm K} \hspace{0.01cm}' \ \underline {\approx 166.7 \ \rm kHz}$ .

(5) The impulse responses are identical at the times $5T$ , $6T$ and $7T$ and consist of 3 diracs each.

Assuming that nothing changes in this respect for $t ≥ 8T$ , you get $t_{\rm 5} \ \ \underline {= 5T}$ .

(6) Correct is the solution 2:

The temporal change of the impulse response, whose dynamics is expressed by the parameter $T$ , must be slow in comparison to the maximum expansion of $h(\tau, t)$ , which in this task equals $\tau_{\rm max} = 6 \ \rm µ s$ : &e.g;

$T \gg \dew_{\rm max}.$