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Wireless Communications Systems

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Title: Wireless Communications Systems

1
Wireless Communications Systems

Dr. Jose A. Santos

2
Course Objectives and Learning Outcomes

The course aim is to Introduce the theory and
practice of analogue and digital wireless
communications systems and to enable a clear
understanding of the state of the art of
wireless technology.

3
Learning Outcomes

Upon the successful completion of this module a
successful student will
Be equipped with a sound knowledge of modern
wireless communications technologies
Comprehend the techniques of spread spectrum and
be able to explain its pervasiveness in wireless
technologies.

4
Learning Outcomes

Understand, the design of a modern wireless
communication system and be capable of analysing
such systems
satellite communications,
cellular wireless,
cordless systems and
wireless local loop.

5
Learning Outcomes

Understand different Wireless LANs technologies
and Identify key elements that characterize the
protocol architecture of such technologies.
Have gained practical experience in the
implementation of wireless technologies and
systems in MATLAB and be capable of performing
experimental tests on these systems, analysing
the results

6
Course Contents
Subject Area 1 Transmission Fundamentals
Principles

Basic Mathematical Communication Concepts The
Decibel (Week 1)
Time Characterization of Signals (Week 1)
Frequency Characterization of Signals (Week 1)

7
Course Contents
Subject Area 1 Transmission Fundamentals
Principles

The Fourier Transform and Its Properties (Week 1)
Analogue and Digital Data Transmission (Week 2)
Channel Capacity, Data Rate, Bandwidth and
Transmission Media (Week 2)

8
Course Contents
Subject Area 2 Wireless Communications
Technologies

Antennas and Propagation (Week 3)
Signal Encoding Techniques (Week 4)
Spread Spectrum Techniques (Week 5)
Coding and Error Control in Wireless
Transmissions (Week 6)

9
Course Content
Subject Area 3 Wireless Networking

Satellite Communications (Week 7)
Cellular Wireless Networks (Week 8 9)
Cordless Systems (Week 10)
Wireless Local Loop (Week 10)
Mobile IP and Wireless Access Protocol (Week 11)

10
Course Content
Subject Area 4 Wireless LANs

Wireless LAN Technologies (Week 12)
IEEE 802.11 Wireless LAN Standards (Mandatory
Reading)
Bluetooth (Mandatory Reading)

11
Course Content
Subject Area 5 MATLAB Practicals

Introduction to MATLAB, Fourier Analysis Power
Spectrum Generation (Week 2-3)
Functions in MATLAB, Modulation Techniques (AM,
FM, ASK, FSK) (Week 5-6)
Introduction to Simulink, Basic Communications
Models, Error Control, Modulation Systems. (Week
7-8)
Laboratory Exam (Week 12)

12
Teaching Schedule Evaluation

End of year Examination (75)
Covers Learning Outcomes 1,3 and 4
Coursework (25)
Literature Review Paper (50) Week 5
Essay(25) Week 9
Laboratory Exam (25) Week 12
For Details on CW and Exam consult the Module
Handout Document (Module Website).

13
Course Reading List

Essential
Stallings, W. Wireless Communications and
Networks, Prentice Hall. 2002 and 2nd Ed. 2005.
Additional Resources
Mark, J and Zhuang W. Wireless Communications
and Networking Prentice Hall. 2003
Shankar, P.M. Introduction to Wireless Systems,
John Wiley Sons Inc. 2002.
Proakis, J. Communication Systems Engineering
2nd Ed. Prentice Hall, 2002.
Haykin, S. and Moher, M. Modern Wireless
Communications, International Ed. Prentice Hall,
2005.

14
Module Delivery

Class Structures
Theory Class 2 Hours every week
Tutorials 1 Hours (Every week)
Labs (3 Hour Labs)
Availability and Contact
Dr. Jose A. Santos
Room MG121E
ja.santos_at_ulster.ac.uk
http//www.scis.ulster.ac.uk/jose

15
Introduction to Wireless Systems
16
Class 1 Contents - Introduction

Introduction Review of Mathematical Concepts
Wireless and the OSI Model
The Decibel Concept
dB dBm Application to logarithmic formulas
Signal Concepts
Time Domain Signals
Frequency Domain Concepts

17
Class Contents

Introduction to Fourier Analysis of Signals
The Fourier Transform Theorem
The Fourier Series Representation

18
Wireless Open System Interconnection Model

Wireless is only one component of the complex
systems that allows seamless communications world
wide.
Wireless is concerned with 3 of the 7 layers of
the OSI reference model

19
Wireless Open System Interconnection Model

Physical Layer Physical Mechanisms for
transmission of binary digits. (Modulation,
Demodulation Transmission Medium Issues).
Data-Link Layer Error correction and detection,
retransmission of packets, sharing of the medium.

20
Wireless Open System Interconnection Model

Network Layer Determination of the routing of
the information, determination of the QoS and
flow control.
Wireless Systems with mobile nodes place greater
demands on the network layer.

21
The Decibel

In telecommunications, we are often concerned
with the comparison of one power level to
another.
The unit of measurement used to compare two power
levels is the decibel (dB).
A decibel is not an absolute measurement. It is a
relative measurement that indicates the
relationship of one power level to another.

22
The Decibel
It is usual in telecommunications to express
absolute dB quantities i.e. An antenna gain,
the free space loss, etc. All those quantities
are being compared with the basic power
unit
23
Exercise 1

An antenna is said to have an output of 25 dB,
calculate the actual power of the antenna in
Watts.

24
The dBm

Another important quantity used in communications
is the dBm.
It is, like the dB, a measure of power comparison
but with respect to 1mW

25
Exercise 2 3

An antenna is said to have an output of 25 dBm,
calculate the actual power of the antenna in
Watts.
Calculate the Output of the Antenna in dB

26
Output on dB
27
Usefulness of dB and dBm

It is useful to know that using decibels and
logarithms, most of the problems in
communications can be simplified.
Example Formula Simplification

28
Signals

A signal is an electromagnetic wave that is used
to represent and/or transmit information.
An electromagnetic signal is a function that
varies with time, but also can be represented as
a function of frequency.

29
Time Domain Properties

As a function of time, a signal can be
Analogue Intensity varies smoothly over time.
Digital Maintains a constant intensity over a
period of time and then changes to another
intensities.

30
Analogue Signal
31
Digital Signal
32
Periodic Aperiodic Signals

Signals can be further classified in
Periodic Signals
Aperiodic Signals
Periodic signals are those that repeat themselves
over time

33
Periodic and Aperiodic Signals

T is called the PERIOD of the signal and is the
smallest value that satisfies the equation.
Aperiodic Signals do not comply with the
periodicity condition

34
The Sine Wave

It is the fundamental analogue signal
It is represented by 3 parameters
Amplitude,
Frequency - Period
Phase

35
Parameter Definitions

Amplitude Is the peak value of the intensity
(A).
Period Is the duration in time of 1 cycle (T)
Frequency Is the rate in cycles/sec Hz at
which the signal repeats
Phase Is the measure of the relative position in
time with respect of a single period of the
signal.

36
Frequency Domain Concepts

In practice an EM signal will be made of many
frequency components.
A frequency representation of a signal can also
be obtained.
The characterization of the signal if made from
another point of view frequency

37
Frequency Domain
38
Frequency Domain

The signal is composed of sinusoidal signals at
frequencies f and 3f
If enough sinusoidal signals are added and
weighed together, any signal can be represented.
THIS IS THE PRINCIPLE OF THE FOURIER ANALYSIS

39
Frequency Domain

The second frequency of the signal is an integer
multiple of the first frequency ( f ).
When all frequency components are integer
multiple of one frequency, the latter is referred
to as the FUNDAMENTAL FREQUENCY (fo)

40
Frequency Domain

All the other frequency components, are known as
the HARMONICS of the signal.
The fundamental frequency is represented by
The period of the signal is equal to the
corresponding period of the fundamental frequency.

41
Summary

Any electromagnetic signal can be shown to
consist of a collection of periodic analogue
signals (sine waves) at different amplitudes,
frequencies and phases.

42
Bandwidth of the Signal

The Spectrum of the signal is the range of
frequencies that it contains.
The width of the spectrum is known as the
ABSOLUTE BANDWIDTH.

43
Bandwidth of the Signal

Many signals have infinite absolute bandwidth,
but with most of the energy contained in a
relatively narrow band of frequencies.
This band of frequencies is referred to as the
EFFECTIVE BANDWIDTH or simply BANDWIDTH

44
Bandwidth Calculation

For a signal made of the fundamental and two
harmonics (odd multiples only), the frequency
graph will be the spectrum.
The bandwidth will be the highest frequency minus
the fundamental
BW5. fo fo 4. fo Hz
The bandwidth of a signal is expressed in Hertz.

45
The Wavelength

Another important quantity that goes hand in hand
with the frequency is the WAVELENGTH.
It is a measure of the distance (in length units)
of the period of the signal. i.e. it is the
period of the signal expressed in length units.

46
The Wavelength

The wavelength together with the frequency define
the speed at which an electromagnetic signal is
travelling through the medium

47
Frequency Domain Visualization

Fourier Transform Principle of Operation

48
The Fourier Transform Theorem

Conditions Dirichlet Conditions
x(t) is integrable on the real line (time line)
The number of maxima and minima of x(t) in any
finite interval on the real line is finite.
The number of discontinuities of x(t) in any
finite interval on the real line is finite.

49
The Fourier Transform Theorem

The Fourier Transform X(f) of x(t) is given by
The original signal can be obtained back from the
Fourier Transform using

50
The Fourier Transform

X(f) is in general a complex function.
Its magnitude and phase, represent the amplitude
and phase of various frequency components in
x(t).
The function X(f) is sometimes referred to as the
SPECTRUM of the signal x(t). (Voltage Spectrum).

51
Fourier Transform Notation
52
Fourier Transform Properties

a) Linearity The Fourier Transform operation is
linear.
b) Duality

53
Fourier Transform Properties

c) Shift Property A shift of to in the time
domain, causes a phase shift of -2p.f.t0 in the
frequency domain

54
FT Example 1

The Unit Impulse or delta function is a special
function that is defined as

55
FT Example 1

The unit impulse is the base for the shifting of
functions in time
The Fourier Transform of the unit impulse yields
(using the shift property)

56
FT Example 2

The unit impulse spectrum is
Using the Duality Property of the Fourier
Transform

57
Example 3 The Square Pulse
Notation
58
The Square Pulse
59
The sinc function

If the previous result is plotted with a value of
t1 we obtain the following.

60
Periodic Signals Fourier Series Representation

The Fourier series is based in the fact that any
function can be represented as a sum of
sinusoids, this is known as the Fourier Series
A periodic signal x(t) with a fundamental period
T0, that meets the dirichlet conditions, can be
represented in terms of its Fourier Series as
Follows

61
Fourier Series Sine-Cosine Representation