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Lecturer:
Giuseppe Savarè
Course name: Mathematical methods
Course code: 500541
Degree course: Ingegneria Elettronica e Informatica, Ingegneria Industriale
Disciplinary field of science: MAT/05
L'insegnamento costituisce attività di base per: Ingegneria Elettronica e Informatica, Ingegneria Industriale
University credits: ECTS 6
Course website: n.d.
Specific course objectives
Learn how to work in the complex framework, evaluate integrals of olomorphic functions, manipulate power and Fourier series, adopt the point of view of signal theory, calculate and operate with Fourier, Laplace and Zeta transforms, solve simple ordinary differential equations with constant coefficients, understand convolutions.
Course programme
The language of signals
- Continuous and discrete signals.
- Basic operations on signals: sum and linear combinations of signals, traslation and rescalings.
- Scalar products and norms.
Complex functions
- Manipulation of complex numbers
- Rational, exponential, and trigonometric functions, logarithms
- Power series
- Conplex derivatives, olomorphic functions, Cauchy-Riemann conditions
- Line integrals, Cauchy theorem, , analyticity of olomorphic functions
- Singularities, Laurent series, residue formula
- Evaluation of integrals, Jordan lemma
Fourier series
- Periodic signals, trigonometric and exponential functions, Fourier series.
- Pointwise and energy convergence, Gibbs phenomenon.
- Parseval identity
- Applications
Fourier Transform
- Definition of Fourier transform, relationships with Fourier series, elementary properties
- Riemann-Lebesgue lemma
- Inversion theorem for piecewise regular functions
- Plancherel identity, Fourier transform for L^2 functions
Laplace transform
- Definition, links with the Fourier transform, main properties
- Inversion of Laplace transform, residue and Heaviside formula
- Application to simple ordinary differential equations
Convolution
- Definition and simple example of convolutions
- Links with Fourier and Laplace transform
- Simple applications to differential equations
Z trasform
- Definition and simple examples
- Simple applications to difference equations
Course entry requirements
Differential and integral calculus for scalar and vector functions, matrices and linear transformations, sequences and series, power series in the real line, complex numbers, polar coordinates.
Course structure and teaching
Lectures (hours/year in lecture theatre): 30
Practical class (hours/year in lecture theatre): 30
Practicals / Workshops (hours/year in lecture theatre): 0
Suggested reading materials
M. Codegone. Metodi Matematici per l'Ingegneria. Zanichelli.
M. Giaquinta, G. Modica. Note di Metodi Matematici per Ingegneria Informatica. Pitagora, Bologna..
F. Tomarelli. Metodi Matematici per l'Ingegneria. CLU.
Lecture notes available on the web page of the course.
Testing and exams
Written examination.
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