Charles Explorer logo
🇬🇧

Optimisation Theory

Class at Faculty of Mathematics and Physics |
NMSA403

Syllabus

1. Optimization problems and their formulations.

2. Selected parts of convex analyses (convex cones, convex function, epigraph, subdifferential).

3. Separation theorems (Farkas theorem).

4. Theory of nonlinear programming. (Karush-Kuhn-Tucker optimality condition, constraints qualifications).

5. Linear a convex programming like a particular case of nonlinear programming.

6. Symmetric problem of nonlinear programming.

Annotation

Optimization in economy and statistics, convex analysis, introduction to non-linear programming, theory of linear programming with respect to convex analysis and general optimization.

Supposed knowledge: Mathematical analysis (functions with several arguments, constraint extrema problems).