English

Stabilization of fractional-evolution systems

Analysis of PDEs 2019-02-08 v1

Abstract

This paper is devoted to the analysis of the problem of stabilization of fractional (in time) partial differential equations. We consider the following equation tα,ηu(t)=Au(t)ηΓ(1α)0t(ts)αeη(ts)u(s)ds,  t>0, \partial^{\alpha,\eta}_{t} u(t)=\mathcal{A}u(t)-\frac{\eta}{\Gamma (1-\alpha)}\int_{0}^{t}(t-s)^{-\alpha} \, e^{-\eta(t-s)}u(s)\, ds,\; t > 0, with the initial data u(0)=u0u(0)=u^{0}, where A\mathcal{A} is a unbounded operator in Hilbert space and tα,η\partial_{t}^{\alpha,\eta} stands for the fractional derivative. We provide two main results concerning the behavior of the solutions when t+t\longrightarrow+\infty. We look first to the case η>0\eta>0 where we prove that the solution of this problem is exponential stable then we consider the case η=0\eta=0 when we prove under some consideration on the resolvent that the energy of the solution goes to 00 as tt goes to the infinity as 1/tα1/t^\alpha.

Keywords

Cite

@article{arxiv.1902.02558,
  title  = {Stabilization of fractional-evolution systems},
  author = {Kaïs Ammari and Fathi Hassine and Luc Robbiano},
  journal= {arXiv preprint arXiv:1902.02558},
  year   = {2019}
}
R2 v1 2026-06-23T07:34:25.078Z