Learning outcomes

To provide the student with applied mathematical tools for solving problems in physics. To treat basic problems of non linear physics

Content

1) Elements of variational calculus The brachistochrone problem, Euler equations, examples of applications. 2) Classification of second order partial differential equations. 3) Introduction to problems in non linear physics 4) Special functions in mathematical physics Bessel fucntions, modified and spherical Bessel functions, Legendre polynoms, associated Legendre functions, spherical harmonics, orthogonal polynoms, hypergeometric confluent functions

Assessment method

Oral exam (theory), written paper (exercices).

Sources, references and any support material

G. B. Arfken & H. J. Weber, Mathematical Methods for Physicists, 6th Ed., Elsevier Academic Press, 2005.

Language of instruction

Français
Training Study programme Block Credits Mandatory
Bachelier en sciences physiques Standard 0 3
Bachelier en sciences physiques Standard 3 3