Approximation of symmetrizations and symmetry of critical points

Autor

  • Jean Van Schaftingen

Słowa kluczowe

Symmetrization, rearrangement, random approximation of symmetrizations, minimax methods, Krasnosiel'skiĭ genus, symmetry of solutions of quasilinear elliptic problems

Abstrakt

We give a sufficient condition in order that a sequence of cap or Steiner symmetrizations or of polarizations approximates some fixed cap or Steiner symmetrization. This condition is used to obtain the almost sure convergence for random sequences of symmetrization taken in an appropriate set. The results are applicable to the symmetrization of sets. An application is given to the study of the symmetry of critical points obtained by minimax methods based on the Krasnosel'skiĭ genus.

Pobrania

Opublikowane

2006-09-01

Jak cytować

1.
VAN SCHAFTINGEN, Jean. Approximation of symmetrizations and symmetry of critical points. Topological Methods in Nonlinear Analysis [online]. 1 wrzesień 2006, T. 28, nr 1, s. 61–85. [udostępniono 25.12.2025].

Numer

Vol 28, No 1 (September 2006)

Dział

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