Perturbations of Critical Values in Nonsmooth Critical Point Theory
Perturbations of Critical Values in Nonsmooth Critical Point Theory
Several theorems about the perturbation of critical values for continuous functionals are proved. Their applications to eigenvalue problems for variational inequalities are given.
- Polytechnic University of Turin Italy
- Institute of Mathematics and Informatics Bulgaria
- Bulgarian Academy of Sciences Bulgaria
critical values, eigenvalue problems, perturbation, Nonsmooth Critical Point Theory, Elliptic Variational Inequatilies, Perturbation Problems, Unilateral problems; variational inequalities (elliptic type), Variational inequalities (global problems) in infinite-dimensional spaces, Abstract critical point theory (Morse theory, Lyusternik-Shnirel'man theory, etc.) in infinite-dimensional spaces, Variational Convergence, variational inequalities, continuous functionals
critical values, eigenvalue problems, perturbation, Nonsmooth Critical Point Theory, Elliptic Variational Inequatilies, Perturbation Problems, Unilateral problems; variational inequalities (elliptic type), Variational inequalities (global problems) in infinite-dimensional spaces, Abstract critical point theory (Morse theory, Lyusternik-Shnirel'man theory, etc.) in infinite-dimensional spaces, Variational Convergence, variational inequalities, continuous functionals
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