Course 2020-2021 a.y.

• Basics on differential equations, separation of variables, linear equations, linear systems. Quick overview of some nonlinear equations.

• Vector spaces, Banach spaces, Hilbert spaces. Separable spaces: $ell^2$ and $L^2_T$. Operators: norms and fixed points.

• Continuity, convexity, compactness. Fréchet-derivatives. Fixed points, contractions.

• Classical problems in calculus of variations, critical points. Maxima and minima, necessary/sufficient conditions. Convexity.

• Control theory, bang-bang principle. Hamiltonians, the Pontryagin maximum principle.

• Dynamic programming. The Hamilton-Jacobi-Bellman equation.

• Carry out a formal mathematical proof.
• Recognize the abstract mathematical structures that underline modern theories.
• Master infinite-dimensional vector spaces techniques.
• Model optimization problems from calculus of variations.
• Model optimal control problems.
• Model dynamic optimization problems.

• Apply to data science, to social sciences, and to economics the techniques of mathematical optimization.
• Work out both the quantitative and the qualitative perspectives.
• Solve infinite-dimensional optimization problems.
• Solve optimal control problems.
• Solve dynamic optimization problems.

• Face-to-face lectures
• Exercises (exercises, database, software etc.)
• Group assignments

Every one/two weeks there is a problem session where mathematical problems concerning the topics taught in class are discussed and solved.

Written exam. Depending on the covid restrictions, group assignments might also be evaluated.

Lecture notes. A textbook is in preparation but it may not be available at the beginning of the course. In this case, notes will be available.