ISTITUZIONI DI FISICA MATEMATICA
Academic Year 2018/2019 - 1° Year - Curriculum APPLICATIVO- Elements of Mathematical Physics - PDEs: Giuseppe MULONE
- Elements of mathematical physics: continuum mechanics: Giuseppe MULONE
Taught classes: 70 hours
Exercise: 24 hours
Term / Semester: 1° and 2°
Learning Objectives
- Elements of Mathematical Physics - PDEs
1. Give the basic elements of the partial differential equations of mathematical physics (I module).2. Understanding of physical phenomena governed by partial differential equations; Construction of mathematical models: equations of the waves, heat, Laplace equation.
3. Understanding of the different solution methods: why it has been proposed a solution method? What are some other alternative methods? Understanding how the analytical solutions obtained are interpreting the physical real situations (wellposedness of the models or paradoxes).
4. It will be privileged the undertsnding the physical part, the models and their analytical solution.
- Elements of mathematical physics: continuum mechanics
The objectives of the course are:
1. Give the basic elements of continuum mechanics and fluid dynamics (II module).
2. Understanding the mechanics of continuous physical phenomena and fluid dynamics.
3. Understanding of the different solution methods: why it has been proposed a solution method? What are some alternative methods? Understanding how the analytical solutions obtained are related to the physics of the problem.
4. It will be privileged the understanding of the physical part,the methods and the analytical resolution.
Course Structure
- Elements of Mathematical Physics - PDEs
Lectures and exercises done by students at home and in class.
- Elements of mathematical physics: continuum mechanics
Lectures and exercises done by students at home and in class.
Detailed Course Content
- Elements of Mathematical Physics - PDEs
Partial differential equations of mathematical physics.Waves equations
Heat equations
Laplace's equation and Poisson.
The complete programme here:
http://www.dmi.unict.it/~mulone/IFM1718.pdf
- Elements of mathematical physics: continuum mechanics
(Form II)
Continuum Mechanics
Ideal fluids, Stokesian fluids, Navier Stokes equations
The complete program is here:
http://www.dmi.unict.it/~mulone/IFM1819.pdf
Textbook Information
- Elements of Mathematical Physics - PDEs
[1] G. MULONE, Appunti di equazioni a derivate parziali della fisica matematica.
[2] M.M. SMIRNOV, Second-Order partial differential equations, ed. Noordhoff.
[3] F.JOHN, Partial differential equations, Springer-Verlag.
[4] V.I. SMIRNOV, Corso di matematica superiore II, Editori Riuniti.
[5] J. FLAVIN, S. RIONERO, Qualitative estimates for partial differential equations. An introduction. Boca Raton, Florida: CRC Press, 1996.
[7] N.S.KOSHLYAKOV, M.M.SMIRNOV, E.B.GLINER, Differential equations of mathematical physics, ed. North-Holland.
[8] A.N.TICHONOV, A.A. SAMARSKIJ, Equazioni della fisica matematica, ed. Mir.
[9] L.C. EVANS, Partial differential equations, American Mathematical Society, 1998.
[10] H. LEVINE, Partial differential equations, American Mathematical Society, 1997.
- Elements of mathematical physics: continuum mechanics
[1] G. MULONE, Appunti di elementi di meccanica dei continui.
[2] T. RUGGERI, Introduzione della termomeccanica dei continui, II edizione riveduta e corretta, Monduzzi Editoriale, 2014.
[3] J. FLAVIN, S. RIONERO, Qualitative estimates for partial differential equations. An introduction. Boca Raton, Florida: CRC Press, 1996.
[4] T. MANACORDA, Introduzione alla termomeccanica dei continui, QUMI, ed. Pitagora.
[5] S. RIONERO, Lezioni di Meccanica Razionale, ed. Liguori.
[6] J. SERRIN, Mathematical principles of Classical Fluid Mechanics, Handbuk der Phisick VIII/1, 1959.
[7] C. TRUESDELL, The elements of continuum Mechanics, ed. SpringerVerlag.