Standard

On boundedness of the attainability set of non-stationary bilinear systems. / Ekimov, Alexander V.; Smirnov, Alexander V.

1997. 364-365 Paper presented at Proceedings of the 1997 1st International Conference on Control of Oscillations and Chaos, COC. Part 3 (of 3), St.Petersburg, Russia.

Research output: Contribution to conferencePaperpeer-review

Harvard

Ekimov, AV & Smirnov, AV 1997, 'On boundedness of the attainability set of non-stationary bilinear systems', Paper presented at Proceedings of the 1997 1st International Conference on Control of Oscillations and Chaos, COC. Part 3 (of 3), St.Petersburg, Russia, 27/08/97 - 29/08/97 pp. 364-365.

APA

Ekimov, A. V., & Smirnov, A. V. (1997). On boundedness of the attainability set of non-stationary bilinear systems. 364-365. Paper presented at Proceedings of the 1997 1st International Conference on Control of Oscillations and Chaos, COC. Part 3 (of 3), St.Petersburg, Russia.

Vancouver

Ekimov AV, Smirnov AV. On boundedness of the attainability set of non-stationary bilinear systems. 1997. Paper presented at Proceedings of the 1997 1st International Conference on Control of Oscillations and Chaos, COC. Part 3 (of 3), St.Petersburg, Russia.

Author

Ekimov, Alexander V. ; Smirnov, Alexander V. / On boundedness of the attainability set of non-stationary bilinear systems. Paper presented at Proceedings of the 1997 1st International Conference on Control of Oscillations and Chaos, COC. Part 3 (of 3), St.Petersburg, Russia.2 p.

BibTeX

@conference{6ba07d078a474e68bfe563f32da9fcc9,
title = "On boundedness of the attainability set of non-stationary bilinear systems",
abstract = "The attainability set is a fundamental characteristic of a controllable system. An attainability set analysis and construction of its estimations, significantly simplifies the solving of a large class of problems in mathematical theory of control. The fullest analysis of an attainability set is fulfilled for the linear controllable systems.",
author = "Ekimov, {Alexander V.} and Smirnov, {Alexander V.}",
year = "1997",
month = jan,
day = "1",
language = "English",
pages = "364--365",
note = "Proceedings of the 1997 1st International Conference on Control of Oscillations and Chaos, COC. Part 3 (of 3) ; Conference date: 27-08-1997 Through 29-08-1997",

}

RIS

TY - CONF

T1 - On boundedness of the attainability set of non-stationary bilinear systems

AU - Ekimov, Alexander V.

AU - Smirnov, Alexander V.

PY - 1997/1/1

Y1 - 1997/1/1

N2 - The attainability set is a fundamental characteristic of a controllable system. An attainability set analysis and construction of its estimations, significantly simplifies the solving of a large class of problems in mathematical theory of control. The fullest analysis of an attainability set is fulfilled for the linear controllable systems.

AB - The attainability set is a fundamental characteristic of a controllable system. An attainability set analysis and construction of its estimations, significantly simplifies the solving of a large class of problems in mathematical theory of control. The fullest analysis of an attainability set is fulfilled for the linear controllable systems.

UR - http://www.scopus.com/inward/record.url?scp=0030700121&partnerID=8YFLogxK

M3 - Paper

AN - SCOPUS:0030700121

SP - 364

EP - 365

T2 - Proceedings of the 1997 1st International Conference on Control of Oscillations and Chaos, COC. Part 3 (of 3)

Y2 - 27 August 1997 through 29 August 1997

ER -

ID: 60765112