Standard

Prombems of stability with respect to a part of variables. / Korolev, V.S.; Pototskaya, I.Yu.

2015 International Conference on Mechanics - Seventh Polyakhov's Reading. Institute of Electrical and Electronics Engineers Inc., 2015. p. 7106739.

Research output: Chapter in Book/Report/Conference proceedingConference contributionpeer-review

Harvard

Korolev, VS & Pototskaya, IY 2015, Prombems of stability with respect to a part of variables. in 2015 International Conference on Mechanics - Seventh Polyakhov's Reading. Institute of Electrical and Electronics Engineers Inc., pp. 7106739. https://doi.org/10.1109/polyakhov.2015.7106739

APA

Korolev, V. S., & Pototskaya, I. Y. (2015). Prombems of stability with respect to a part of variables. In 2015 International Conference on Mechanics - Seventh Polyakhov's Reading (pp. 7106739). Institute of Electrical and Electronics Engineers Inc.. https://doi.org/10.1109/polyakhov.2015.7106739

Vancouver

Korolev VS, Pototskaya IY. Prombems of stability with respect to a part of variables. In 2015 International Conference on Mechanics - Seventh Polyakhov's Reading. Institute of Electrical and Electronics Engineers Inc. 2015. p. 7106739 https://doi.org/10.1109/polyakhov.2015.7106739

Author

Korolev, V.S. ; Pototskaya, I.Yu. / Prombems of stability with respect to a part of variables. 2015 International Conference on Mechanics - Seventh Polyakhov's Reading. Institute of Electrical and Electronics Engineers Inc., 2015. pp. 7106739

BibTeX

@inproceedings{92a9a92bf5e74ac8bfb587f98ad349fd,
title = "Prombems of stability with respect to a part of variables",
abstract = "Mathematical models based on nonlinear differential equations for dynamic systems of classical mechanics and biophysics are considered. The research concentrates on these equations integration features, their solutions properties, stability and behavior nearby an equilibrium point. Factors which can change the solution stability such as a form of a problem definition, a choice of the generalized coordinates and equations describing the process, the presence of small periodic or random perturbation are taken into account in the research.",
author = "V.S. Korolev and I.Yu. Pototskaya",
year = "2015",
doi = "10.1109/polyakhov.2015.7106739",
language = "English",
pages = "7106739",
booktitle = "2015 International Conference on Mechanics - Seventh Polyakhov's Reading",
publisher = "Institute of Electrical and Electronics Engineers Inc.",
address = "United States",

}

RIS

TY - GEN

T1 - Prombems of stability with respect to a part of variables

AU - Korolev, V.S.

AU - Pototskaya, I.Yu.

PY - 2015

Y1 - 2015

N2 - Mathematical models based on nonlinear differential equations for dynamic systems of classical mechanics and biophysics are considered. The research concentrates on these equations integration features, their solutions properties, stability and behavior nearby an equilibrium point. Factors which can change the solution stability such as a form of a problem definition, a choice of the generalized coordinates and equations describing the process, the presence of small periodic or random perturbation are taken into account in the research.

AB - Mathematical models based on nonlinear differential equations for dynamic systems of classical mechanics and biophysics are considered. The research concentrates on these equations integration features, their solutions properties, stability and behavior nearby an equilibrium point. Factors which can change the solution stability such as a form of a problem definition, a choice of the generalized coordinates and equations describing the process, the presence of small periodic or random perturbation are taken into account in the research.

U2 - 10.1109/polyakhov.2015.7106739

DO - 10.1109/polyakhov.2015.7106739

M3 - Conference contribution

SP - 7106739

BT - 2015 International Conference on Mechanics - Seventh Polyakhov's Reading

PB - Institute of Electrical and Electronics Engineers Inc.

ER -

ID: 4728060