Abstract
In this paper we consider the unstable chaotic attractor of a Hamiltonian system with Toda lattice potential and stabilize it by an integral form control. In order to obtain stability results, we use a control function in an integral form: =u(t)=int{0}{t} k(t, s) X(s) d s SRC=JPCS17301012089ieqn1.gif in which all the back story of the process X(t) is taken into consideration. Using the exponential kernel =k(t, s)=e{-beta(t-s)} SRC=JPCS17301012089ieqn2.gif, we replace the study of integro-differential system of order 4 with an analysis of 5th order system of ordinary differential equations (without integrals). Numerical solution of the resulting system leads to the asymptotically stabilization of the unstable fixed point.
| Original language | English |
|---|---|
| Article number | 012089 |
| Journal | Journal of Physics: Conference Series |
| Volume | 1730 |
| Issue number | 1 |
| DOIs | |
| State | Published - 3 Feb 2021 |
| Event | 9th International Conference on Mathematical Modeling in Physical Sciences, IC-MSQUARE 2020 - Tinos Island, Virtual, Greece Duration: 7 Sep 2020 → 10 Sep 2020 |
All Science Journal Classification (ASJC) codes
- General Physics and Astronomy