000 | 02368nab a2200337 c 4500 | ||
---|---|---|---|
001 | vtls000670887 | ||
003 | RU-ToGU | ||
005 | 20210922102238.0 | ||
007 | cr | | ||
008 | 191202|2019 ru s a eng d | ||
024 | 7 |
_a10.17223/19988621/61/3 _2doi |
|
035 | _ato000670887 | ||
040 |
_aRU-ToGU _brus _cRU-ToGU |
||
100 | 1 |
_aRekkab, Soraya _9495346 |
|
245 | 1 | 0 |
_aRegional gradient compensation with minimum energy _cS. Rekkab, H. Aichaoui, S. Benhadid |
246 | 1 | 1 | _aЛокальная градиентная компенсация при минимуме энергии |
504 | _aБиблиогр.: 13 назв. | ||
520 | 3 | _aIn this paper we interest to the regional gradient remediability or compensation problem with minimum energy. That is, when a system is subjected to disturbances, then one of the objectives becomes to find the optimal control which compensates regionally the effect of the disturbances of the system, with respect to the regional gradient observation. Therefore, we show how to find the optimal control ensuring the effect compensation of any known or unknown disturbance distributed only on a subregion of the geometrical evolution domain, with respect to the observation of the gradient on any given subregion of the evolution domain and this in finite time. Under convenient hypothesis, the minimum energy problem is studied using an extension of the Hilbert Uniqueness Method (HUM). Approximations, numerical simulations, appropriate algorithm, and illustrative examples are also presented. | |
653 | _aоптимальное управление | ||
653 | _aградиенты | ||
653 | _aлинейные дискретные системы | ||
653 | _aэффективные приводы | ||
655 | 4 |
_aстатьи в журналах _9745982 |
|
700 | 1 |
_aAichaoui, Houda _9495347 |
|
700 | 1 |
_aBenhadid, Samir _9495348 |
|
773 | 0 |
_tВестник Томского государственного университета. Математика и механика _d2019 _g№ 61. С. 19-31 _x1998-8621 _w0210-41660 |
|
852 | 4 | _aRU-ToGU | |
856 | 4 | _uhttp://vital.lib.tsu.ru/vital/access/manager/Repository/vtls:000670887 | |
908 | _aстатья | ||
999 | _c454745 |