Part I, Stability
1. Stability problems for functional equations,
2. Fixed point theorems,
3. Critical point theorems,
4. Well posed optimization problems,
5. Parametric dependence of solutions of variational systems,
6. Applications.
Part II, Approximation
7. Nonlinear approximation theory,
8. Interpolation problems,
9. Approximations in partial differential equations
10. Approximations in integral equations,
11. Approximations with polynomials
12. Special functions,
13. Applications to learning theory.
Part III, Inequalities,
14. Inequalities in analysis
15. Inequalities in approximation theory,
16. Variational inequalities and optimization
17. Multivalued variational inequalities and set-valued analysis
18. Applications.