SIGNAL THEORY
cod. 05700

Academic year 2015/16
2° year of course - First semester
Professor
Giorgio PICCHI
Academic discipline
Telecomunicazioni (ING-INF/03)
Field
Ingegneria delle telecomunicazioni
Type of training activity
Characterising
63 hours
of face-to-face activities
9 credits
hub: PARMA
course unit
in - - -

Learning objectives

___1) Knowledge and understanding.___
The students learn the concepts and the mathematical tools necessary to manipulate both deterministic and random signals (stochastic processes). Signals are treated as mathematical models of physical signals, in particular those found in telecommunications, electrical engineering and computer science. Transformation of signals are also studied as models of physical systems like amplifiers, filters, transmission lines, modulators, samplers, etc.

___2) Applying knowledge and understanding.___
The students learn to apply the acquired knowledge to the modeling, analysis and design of the main systems encountered in Electrical Engineering and Information and Communication Technology (ICT) such as: amplifiers, filters, transmission lines, modulators, samplers etc.

Prerequisites

"Mathematical analysis 1" and "Geometry" (suggested)

Course unit content

--- Probability theory and random variables
Elements of set theory. The axioms of probability. Elements of combinatorics. Conditional probability, total probability and Bayes' formula. Repeated trials. Random Variables: definitions, distribution function, probability density function, discrete and continuous random variables. Transformations of a random variables and the fundamental theorem. Expected value and moments. Continuous and mixed forms of Bayes' formula and total probability theorem. Two random variables: joint distribution and probability density functions, conditional expected values, functions of two r.v. Vectors of random variables and Gaussian vectors.

--- Signals and systems
Definition of signal. Finite power and finite energy signals. Basic signals and transformations. The Dirac delta function. Systems an their properties: time- invariant, linear, memoryless, causal and stable systems. Linear time invariant (LTI) systems: impulse response and its use, convolution, stable and causal LTI systems, cascade and parallel of LTI systems. The complex exponential. Response of LTI systems to complex exponentials (eigenfunctions) and to sinusoids. Frequency response of LTI systems. Fourier Series representation of periodic signals. The Fourier Transform (FT) of non periodic signals: properties of the Fourier Transform, basic Fourier Transform and Fourier Series pairs. Signals through LTI systems (filtering), ideal filters and real filters, distortionless systems and distortions. Power spectral density.

--- Stochastic processes
Definitions. Distribution function and probability density function of stochastic processes. Mean, variance, autocorrelation and autocovariance. Stationary processes: strict-sense and wide-sense stationary processes. Power spectral density and its properties. The white noise ad other basic processes. Filtering of stationary processes. Gaussian processes and their filtering. Ergodic processes.

Full programme

--- Probability theory and random variables
Elements of set theory. The axioms of probability. Elements of combinatorics. Conditional probability, total probability and Bayes' formula. Repeated trials. Random Variables: definitions, distribution function, probability density function, discrete and continuous random variables. Transformations of a random variables and the fundamental theorem. Expected value and moments. Continuous and mixed forms of Bayes' formula and total probability theorem. Two random variables: joint distribution and probability density functions, conditional expected values, functions of two r.v. Vectors of random variables and Gaussian vectors.

--- Signals and systems
Definition of signal. Finite power and finite energy signals. Basic signals and transformations. The Dirac delta function. Systems an their properties: time- invariant, linear, memoryless, causal and stable systems. Linear time invariant (LTI) systems: impulse response and its use, convolution, stable and causal LTI systems, cascade and parallel of LTI systems. The complex exponential. Response of LTI systems to complex exponentials (eigenfunctions) and to sinusoids. Frequency response of LTI systems. Fourier Series representation of periodic signals. The Fourier Transform (FT) of non periodic signals: properties of the Fourier Transform, basic Fourier Transform and Fourier Series pairs. Signals through LTI systems (filtering), ideal filters and real filters, distortionless systems and distortions. Power spectral density. Sampling. Relationship between Fourier and Lapalce Transforms.

--- Stochastic processes
Definitions. Distribution function and probability density function of stochastic processes. Mean, variance, autocorrelation and autocovariance. Stationary processes: strict-sense and wide-sense stationary processes. Power spectral density and its properties. The white noise ad other basic processes. Filtering of stationary processes. Gaussian processes and their filtering. Ergodic processes.

Bibliography

--- R.E. Ziemer, "Elements of Engineering Probability and Statistics", Prentice Hall,
1996
--- B. Carlson, "Communication Systems", Mcgraw Hill Higher Education, 2009
(This textbook is used in other courses also)
--- A. Papoulis "Probability Random Variables and Stochastic Processes", McGraw-Europe, 2002

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Teaching methods

Classroom teaching. In-class problem solving.
Homeworks assigned weekly.

Assessment methods and criteria

Written and oral exam.

Other information

Information to students and various documents are provided through the platform:
didattica.unipr.it

2030 agenda goals for sustainable development

- - -

Contacts

Toll-free number

800 904 084

Student registry office

E. segreteria.ingarc@unipr.it

Quality assurance office

Education manager:
Elena Roncai
T. +39 0521 903663
Office E. dia.didattica@unipr.it
Manager E. elena.roncai@unipr.it

 

President of the degree course

Gianluigi Ferrari
E. gianluigi.ferrari@unipr.it

Faculty advisor

Giovanna Sozzi
E. giovanna.sozzi@unipr.it

Career guidance delegate

Guido Matrella
E. guido.matrella@unipr.it

Tutor professor

Boni Andrea
E. andrea.boni@unipr.it
Caselli Stefano
E. stefano.caselli@unipr.it
Cucinotta Annamaria
E. annamaria.cucinotta@unipr.it
Nicola Delmonte
E. nicola.delmonte@unipr.it
Mucci Domenico
E. domenico.mucci@unipr.it
Saracco Alberto
E. alberto.saracco@unipr.it
Ugolini Alessandro
E. alessandro.ugolini@unipr.it
Vannucci Armando
E. armando.vannucci@unipr.it

Erasmus delegates

Paolo Cova
E. paolo.cova@unipr.it
Corrado Guarino
E. corrado.guarinolobianco@unipr.it
Walter Belardi
E. walter.belardi@unipr.it

Quality assurance manager

Massimo Bertozzi
E. massimo.bertozzi@unipr.it

Tutor students

SPAGGIARI Davide E. davide.spaggiari@unipr.it
MUSETTI Alex E. alex.musetti@unipr.it
BERNUZZI Vittorio E. vittorio.bernuzzi1@studenti.unipr.it
NKEMBI Armel Asongu E. armelasongu.nkembi@unipr.it
BASSANI Marco E. marco.bassani@unipr.it
ZANIBONI Thomas E. thomas.zaniboni@unipr.it
BOCCACCINI Riccardo E. riccardo.boccaccini@unipr.it
MORINI Marco E. marco.morini@unipr.it
SHOZIB Md Sazzadul Islam E. mdsazzadulislam.shozib@studenti.unipr.it