Generic properties of critical points of the boundary mean curvature
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  • Generic properties of critical points of the boundary mean curvature

Generic properties of critical points of the boundary mean curvature

Authors

  • Anna Maria Micheletti
  • Angela Pistoia

Keywords

Mean curvature, non degenerate critical points, generic property

Abstract

Given a bounded domain $\Omega\subset\mathbb{R}^N$ of class $C^k$ with $k\ge3$, we prove that for a generic deformation $I+\psi$, with $\psi$ small enough, all the critical points of the mean curvature of the boundary of the domain $(I+\psi)\Omega$ are non degenerate.

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Published

2013-04-22

How to Cite

1.
MICHELETTI, Anna Maria & PISTOIA, Angela. Generic properties of critical points of the boundary mean curvature. Topological Methods in Nonlinear Analysis [online]. 22 April 2013, T. 41, nr 2, s. 323–334. [accessed 7.12.2021].

Issue

Vol 41, No 2 (June 2013)

Section

Articles

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