English

On damped second-order gradient systems

Analysis of PDEs 2019-04-22 v5

Abstract

Using small deformations of the total energy, as introduced in [31], we establish that damped second order gradient systems u(t)+γu(t)+G(u(t))=0,u^{\prime\prime}(t)+\gamma u^\prime(t)+\nabla G(u(t))=0,may be viewed as quasi-gradient systems. In order to study the asymptotic behavior of these systems, we prove that any (nontrivial) desingularizing function appearing in KL inequality satisfies φ(s)cs\varphi(s)\ge c\sqrt s whenever the original function is definable and C2.C^2. Variants to this result are given. These facts are used in turn to prove that a desingularizing function of the potential GG also desingularizes the total energy and its deformed versions. Our approach brings forward several results interesting for their own sake: we provide an asymptotic alternative for quasi-gradient systems, either a trajectory converges, or its norm tends to infinity. The convergence rates are also analyzed by an original method based on a one-dimensional worst-case gradient system.We conclude by establishing the convergence of solutions of damped second order systems in various cases including the definable case. The real-analytic case is recovered and some results concerning convex functions are also derived.

Keywords

Cite

@article{arxiv.1411.8005,
  title  = {On damped second-order gradient systems},
  author = {Mohamed Ali Jendoubi and Pascal Bégout and Jérôme Bolte and Mohamed Jendoubi},
  journal= {arXiv preprint arXiv:1411.8005},
  year   = {2019}
}
R2 v1 2026-06-22T07:15:24.822Z