System Description in Frequency Domain

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# OVERVIEW OF THE FIRST MAIN CHAPTER #


  • In the book  "Signal Representation"  you were familiarised with the mathematical description of deterministic signals in the time and frequency domain.
  • The second book  "Linear Time-Invariant Systems"  now describes what changes a signal or its spectrum undergoes through a communication system and how these changes can be captured mathematically.
  • In the first chapter, the basics of the so-called  $\text{Systems Theory}$  are mentioned, which allows a uniform and simple description of such systems.  We start with the system description in the frequency domain with the partial aspects listed above.


$\text{Please note:}$ 

  • The  "system"  can be a simple circuit as well as a complete, highly complicated communication system with a multitude of components.
  • Here it is only assumed that the system has the two properties  "linear"  and  "time-invariant".


The cause-and-effect principle


Simplest system model

In this chapter we always consider the simple model outlined on the right.

This arrangement is to be interpreted as follows:

  • The focus is on the so-called  "system", which is largely abstracted in its function  ("black box").  Nothing is known in detail about the realisation of the system.
  • The time-dependent input variable  $x(t)$  acting on this system is also referred to as the  "cause function"  in the following.
  • Then at the output of the system, the  "effect function"  $y(t)$  appears - quasi as a response of the system to the input function  $x(t)$.


$\text{Please note:}$ 

The  "system"  can generally be of any kind and is not limited to communications technology alone.  In fact, attempts are also made in other fields of science, such as the natural sciences, economics and business administration, sociology and political science, to capture and describe causal relationships between different variables by means of the cause-and-effect principle.

However, the methods used for these phenomenological systems theories differ significantly from the approach in Communications Engineering, which is outlined in this first main chapter of the present book  "Linear Time-Invariant Systems".

Application in Communications Engineering


The cause-and-effect principle can be applied in Communications Engineering, for example to describe one-port circuits which are also reffered to as one-ports.  Here, one can consider the current curve  $i(t)$  as a cause function and the voltage  $u(t)$  as an effect function.  By observing the I/U relationships, conclusions can be drawn about the properties of the actually unknown one-port.

General model of signal transmission

In Germany  Karl Küpfmüller  introduced the term  "Systems Theory"  for the first time in 1949.  He considers it as a method for describing complex causal relationships in natural sciences and technology, based on a spectral transformation - for example, the  Fourier transform  presented in the book  "Signal Representation".


An information system can entirely be described in therms of systems theory. Here

  • the cause function is the input signal  $x(t)$  or its spectrum  $X(f)$,
  • the effect function is the output signal  $y(t)$  or its spectrum  $Y(f)$.


Also in the following pictures, the input variables are mostly drawn in blue, the output variables in red and system variables in green.

$\text{Example 1:}$ 

(1)  For example, if the  "system"  describes a given linear electric circuit, then given a known input signal  $x(t)$ the output signal $y(t)$  can be predicted with the help of  "Systems Theory".

(2)  A second task of  "Systems Theory"  is to classify the transmission system by measuring  $y(t)$ knowing  $x(t)$  but without knowing the system in detail.

If  $x(t)$ describes, for instance, the voice of a caller in Hamburg and  $y(t)$ the recording of an answering machine in Munich, then the  "transmission system"  consists of the following components:
Microphone – telephone – electrical line – signal converter (electrical-optical) – fibre-optic cable – optical amplifier – signal converter (optical-electrical) – reception filter (for equalisation and noise limitation) –   . . . . . .   – electromagnetic transducer.

Prerequisites for the application of Systems Theory


The model of a communication system given above holds generally and independently of the boundary conditions.  However, the application of systems theory requires some additional limiting preconditions.

Unless explicitly stated otherwise, the following shall always apply:

  • Both  $x(t)$  and  $y(t)$  are  deterministic  signals.  Otherwise, one must proceed according to the chapter  Stochastic System Theory.
  • The system is  linear.  This can be seen, for example, from the fact that a harmonic oscillation  $x(t)$  at the input also results in a harmonic oscillation  $y(t)$  of the same frequency at the output:
$$x(t) = A_x \cdot \cos(\omega_0 \hspace{0.05cm}t - \varphi_x)\hspace{0.2cm}\Rightarrow \hspace{0.2cm} y(t) = A_y \cdot\cos(\omega_0 \hspace{0.05cm}t - \varphi_y).$$
  • New frequencies do not arise.  Only amplitude and phase of the harmonic oscillation can be changed.  Non-linear systems are treated in the chapter  Nonlinear Distortion.
  • Because of linearity, the superposition principle is applicable.  This states that due to  $x_1(t) ⇒ y_1(t)$  and  $x_2(t) ⇒ y_2(t)$  the following mapping also necessarily holds:
$$x_1(t) + x_2(t) \hspace{0.1cm}\Rightarrow \hspace{0.1cm} y_1(t) + y_2(t).$$
  • The system is  time-invariant.  This means that an input signal shifted by   $\tau$  results in the same output signal,  but this is also delayed by $\tau$:
$$x(t - \tau) \hspace{0.1cm}\Rightarrow \hspace{0.1cm} y(t -\tau)\hspace{0.4cm}{\rm if} \hspace{0.4cm}x(t )\hspace{0.2cm}\Rightarrow \hspace{0.1cm} y(t).$$
Time-varying systems are discussed in the book  Mobile Communications.

$\text{Please note:}$  If all the conditions listed here are fulfilled, one deals with a  "linear time-invariant system", abbreviated  $\rm LTI$  system.

Frequency response – Transfer function


We assume an LTI system whose input and output spectra  $X(f)$  and  $Y(f)$  are known or can be derived from the time signals  $x(t)$  and  $y(t)$  via  Fourier transform.

Definition of the frequency response

$\text{Definition:}$  The behaviour of a system is described in the frequency domain by the  $\text{frequency response}$:

$$H(f) = \frac{Y(f)}{X(f)}= \frac{ {\rm response\:function} }{ {\rm cause\:function} }.$$

Other terms for  $H(f)$  are  "system function"  and  "transfer function".


Input spectrum,  output spectrum  and  frequency response

$\text{Example 2:}$  The signal   $x(t)$  with the real spectrum  $X(f)$  (blue curve) is applied to the input of an LTI system.  The measured output spectrum  $Y(f)$  – marked red in the graph – is larger than  $X(f)$  at frequencies lower than  $2 \ \rm kHz$  and has a steeper slope in the region around  $2 \ \rm kHz$.  Above  $2.8 \ \rm kHz$  the signal  $y(t)$  has no spectral components.

  • The green circles mark some measuring points of the frequency response 
$$H(f) = Y(f)/X(f)$$ which is real, too.
  • At low frequencies it holds  $H(f)>1$:  In this range the LTI system has an amplifying effect.
  • The frequency roll-off of  $H(f)$  is similar to that of  $Y(f)$ but not identical.

Properties of the frequency response


The frequency response  $H(f)$  is a central variable in the description of communication systems.

Some properties of this important system characteristic are listed below:

  • The frequency response describes the LTI system on its own.  It can be calculated, for example, from the linear components of an electrical network.  With a different input signal  $x(t)$  and a correspondingly different output signal  $y(t)$  the result is exactly the same frequency response  $H(f)$.
  • The frequency response can have a  "unit".  For example, if one considers the voltage curve  $u(t)$  as cause and the current  $i(t)$  as effect for a one-port, the frequency response  $H(f) = I(f)/U(f)$  has the unit  $\rm A/V$.  $I(f)$  and  $U(f)$  are the Fourier transforms of  $i(t)$  and  $u(t)$, respectively.
  • In the following we only consider two-port networks or so-called quadripoles.  Moreover, without loss of generality, we usually assume that  $x(t)$  and  $y(t)$  are voltages, respectively.  In this case  $H(f)$  is always dimensionsless.
  • Since the spectra  $X(f)$  and  $Y(f)$  are generally complex, the frequency response  $H(f)$  is also a complex function.  The magnitude  $|H(f)|$  is called the  amplitude response  or the  "magnitude frequency response". 
  • This is also often represented in logarithmic form and called the  "damping curve"  or  "gain curve":
$$a(f) = - \ln |H(f)| = - 20 \cdot \lg |H(f)|.$$
  • Depending on whether the first form with the natural logarithm or the second with the decadic logarithm is used, the pseudo-unit  "neper"  $\rm (Np)$  or  "decibel"  $\rm (dB)$  must be added.
  • The  phase response  can be calculated from  $H(f)$  in the following way:
$$b(f) = - {\rm arc} \hspace{0.1cm}H(f) \hspace{0.2cm}{\rm in\hspace{0.1cm}radian \hspace{0.1cm}(rad)}.$$

  $\text{Thus, the total frequency response can also be represented as follows}$:

$$H(f) = \vert H(f)\vert \cdot {\rm e}^{ - {\rm j} \hspace{0.05cm} \cdot\hspace{0.05cm} b(f)} = {\rm e}^{-a(f)}\cdot {\rm e}^{ - {\rm j}\hspace{0.05cm} \cdot \hspace{0.05cm} b(f)}.$$

Low-pass, high-pass, band-pass and band-stop filters


Left:  Low-pass and high-pass;  cutoff frequency  $f_{\rm G}$  $($German:  Grenzfrequenz   ⇒   $\rm G)$ ,
Right:  Band-pass;  lower cutoff frequency  $f_{\rm U}$,  upper cutoff frequency  $f_{\rm O}$

According to the amplitude response  $|H(f)|$  one distinguishes between

  • Low-pass filters:  Signal components tend to be more damped with increasing frequency.
  • High-pass filters:  Here, high-frequency signal components are damped less than low-frequency ones.  A direct signal  $($that is, a signal component with the frequency  $f = 0)$  cannot be transmitted via a high-pass filter.
  • Band-pass filters:  There is a preferred frequency called the centre frequency  $f_{\rm M}$.  The further away the frequency of a signal component is from  $f_{\rm M}$,  the more it will be damped.
  • Band-stop filters:  This is the counterpart to the band-pass filter and it is  $|H(f_{\rm M})| ≈ 0$.  However, very low-frequency and very high-frequency signal components are let pass.


The graph shows on the left the amplitude responses of the filter types  "low-pass"  $\rm (LP)$  and  "high-pass"  $\rm (HP)$, and an the right  "band-pass"  $\rm (BP)$.

In the sketch also shown are the  cutoff frequencies.  These denote 3dB cutoff frequencies here, for example, according to the following definition.

$\text{Definition:}$  The  $\text{3 dB cut-off frequency}$  of a low-pass filter specifies the frequency $f_{\rm G}$, for which holds:

$$\vert H(f = f_{\rm G})\vert = {1}/{\sqrt{2} } \cdot \vert H(f = 0)\vert \hspace{0.5cm}\Rightarrow\hspace{0.5cm} \vert H(f = f_{\rm G})\vert^2 = {1}/{2} \cdot \vert H(f = 0) \vert^2.$$


Note that there are also a number of other definitions for the cut-off frequency.  These can be found on the page  General Remarks  in the chapter  "Some Low-Pass Functions in Systems Theory".


Test signals for measuring the frequency response


For measuring the frequency response  $H(f)$  any input signal  $x(t)$  with spectrum  $X(f)$ is suitable, as long as  $X(f)$  has no zeros (in the range of interest).  By measuring the output spectrum  $Y(f)$  the frequency response can thus be determined in a simple way:

$$H(f) = \frac{Y(f)}{X(f)}.$$

In particular, the following input signals are suitable:

  • $\text{Dirac delta function}$   $x(t) = K · δ(t)$   ⇒   spectrum $X(f) = K$:
Thus, the frequency response by magnitude and phase is of the same shape as the output spectrum  $Y(f)$  and it holds  $H(f) = 1/K · Y(f)$.
If one approximates the Dirac delta function by a narrow rectangle of equal area  $K$, then  $H(f)$  must be corrected by means of a  ${\rm sin}(x)/x$–function.
  • $\text{Dirac comb}$  –  the infinite sum of equally weighted Dirac delta functions at the time interval  $T_{\rm A}$:
This leads according to the chapter  Discrete Signal Representation  to a Dirac comb in the frequency domain with distance  $f_{\rm A} =1/T_{\rm A}$.  This allows a discrete frequency measurement of  $H(f)$  with the spectral samples spaced  $f_{\rm A}$.
  • $\text{Harmonic oscillation}$   $x(t) = A_x · \cos (2πf_0t - φ_x)$   ⇒   Dirac-shaped spectrum at  $\pm f_0$:
The output signal  $y(t) = A_y · \cos(2πf_0t - φ_y)$  is an oscillation of the same frequency $f_0$.  The frequency response for  $f_0 \gt 0$  is:
$$H(f_0) = \frac{Y(f_0)}{X(f_0)} = \frac{A_y}{A_x}\cdot{\rm e}^{\hspace{0.05cm} {\rm j} \hspace{0.05cm} \cdot \hspace{0.05cm} (\varphi_x - \varphi_y)}.$$
To determine the total frequency response  $H(f)$  an infinite number of measurements at different frequencies $f_0$  are required.


Exercises for the chapter


Exercise 1.1: Simple Filter Functions

Exercise 1.1Z: Low-Pass 1st and 2nd Order

Exercise 1.2: Coaxial Cable

Exercise 1.2Z: Measurement of the Frequency Response