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Qualitative analyses of attainability set of nonlinear controllable systems. / Ekimov, A.V.

Qualitative analyses of attainability set of nonlinear controllable systems. 2014.

Research output: Chapter in Book/Report/Conference proceedingConference contributionResearch

Harvard

Ekimov, AV 2014, Qualitative analyses of attainability set of nonlinear controllable systems. in Qualitative analyses of attainability set of nonlinear controllable systems. https://doi.org/10.1109/BDO.2014.6890014

APA

Ekimov, A. V. (2014). Qualitative analyses of attainability set of nonlinear controllable systems. In Qualitative analyses of attainability set of nonlinear controllable systems https://doi.org/10.1109/BDO.2014.6890014

Vancouver

Ekimov AV. Qualitative analyses of attainability set of nonlinear controllable systems. In Qualitative analyses of attainability set of nonlinear controllable systems. 2014 https://doi.org/10.1109/BDO.2014.6890014

Author

Ekimov, A.V. / Qualitative analyses of attainability set of nonlinear controllable systems. Qualitative analyses of attainability set of nonlinear controllable systems. 2014.

BibTeX

@inproceedings{0c13b505048a47ecbb0b7cf6f4135999,
title = "Qualitative analyses of attainability set of nonlinear controllable systems",
abstract = "{\textcopyright} 2014 IEEE. Let us consider a nonlinear system x = f (t, x) + g (t, x)u (1) where the vector-function f(t, x) is defined and continuous in the domain D = {(t, x) | t ≥ 0, x Rn}. We presuppose in addition, that f(t, x) is a homogeneous vector-function of order m > 1 of the argument x. It has the continuous and bounded partial derivatives ∂fi(t, x)/∂xj, ij = 1, n in the domain G = {(t, x) |t ≥ 0, ≤ H} for any H > 0.",
author = "A.V. Ekimov",
year = "2014",
doi = "10.1109/BDO.2014.6890014",
language = "English",
isbn = "9781479953219",
booktitle = "Qualitative analyses of attainability set of nonlinear controllable systems",

}

RIS

TY - GEN

T1 - Qualitative analyses of attainability set of nonlinear controllable systems

AU - Ekimov, A.V.

PY - 2014

Y1 - 2014

N2 - © 2014 IEEE. Let us consider a nonlinear system x = f (t, x) + g (t, x)u (1) where the vector-function f(t, x) is defined and continuous in the domain D = {(t, x) | t ≥ 0, x Rn}. We presuppose in addition, that f(t, x) is a homogeneous vector-function of order m > 1 of the argument x. It has the continuous and bounded partial derivatives ∂fi(t, x)/∂xj, ij = 1, n in the domain G = {(t, x) |t ≥ 0, ≤ H} for any H > 0.

AB - © 2014 IEEE. Let us consider a nonlinear system x = f (t, x) + g (t, x)u (1) where the vector-function f(t, x) is defined and continuous in the domain D = {(t, x) | t ≥ 0, x Rn}. We presuppose in addition, that f(t, x) is a homogeneous vector-function of order m > 1 of the argument x. It has the continuous and bounded partial derivatives ∂fi(t, x)/∂xj, ij = 1, n in the domain G = {(t, x) |t ≥ 0, ≤ H} for any H > 0.

U2 - 10.1109/BDO.2014.6890014

DO - 10.1109/BDO.2014.6890014

M3 - Conference contribution

SN - 9781479953219

BT - Qualitative analyses of attainability set of nonlinear controllable systems

ER -

ID: 7033188