Microtubules: a network for solitary waves
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In the present paper we deal with nonlinear dynamics of microtubules. The structure and role of microtubules in cells are explained as well as one of models explaining their dynamics. Solutions of the crucial nonlinear differential equation depend on used mathematical methods. Two commonly used procedures, continuum and semi-discrete approximations, are explained. These solutions are solitary waves usually called as kink solitons, breathers and bell-type solitons.
Кључне речи:
molecular motors / non-linear dynamics / solitons / non-linear differential equationsИзвор:
Journal of the Serbian Chemical Society, 2017, 82, 5, 469-481Финансирање / пројекти:
- Фотоника микро и нано структурних материјала (RS-MESTD-Integrated and Interdisciplinary Research (IIR or III)-45010)
DOI: 10.2298/JSC161118020Z
ISSN: 0352-5139
WoS: 000408085400001
Scopus: 2-s2.0-85021708771
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Институција/група
VinčaTY - JOUR AU - Zdravković, Slobodan PY - 2017 UR - https://vinar.vin.bg.ac.rs/handle/123456789/1690 AB - In the present paper we deal with nonlinear dynamics of microtubules. The structure and role of microtubules in cells are explained as well as one of models explaining their dynamics. Solutions of the crucial nonlinear differential equation depend on used mathematical methods. Two commonly used procedures, continuum and semi-discrete approximations, are explained. These solutions are solitary waves usually called as kink solitons, breathers and bell-type solitons. T2 - Journal of the Serbian Chemical Society T1 - Microtubules: a network for solitary waves VL - 82 IS - 5 SP - 469 EP - 481 DO - 10.2298/JSC161118020Z ER -
@article{ author = "Zdravković, Slobodan", year = "2017", abstract = "In the present paper we deal with nonlinear dynamics of microtubules. The structure and role of microtubules in cells are explained as well as one of models explaining their dynamics. Solutions of the crucial nonlinear differential equation depend on used mathematical methods. Two commonly used procedures, continuum and semi-discrete approximations, are explained. These solutions are solitary waves usually called as kink solitons, breathers and bell-type solitons.", journal = "Journal of the Serbian Chemical Society", title = "Microtubules: a network for solitary waves", volume = "82", number = "5", pages = "469-481", doi = "10.2298/JSC161118020Z" }
Zdravković, S.. (2017). Microtubules: a network for solitary waves. in Journal of the Serbian Chemical Society, 82(5), 469-481. https://doi.org/10.2298/JSC161118020Z
Zdravković S. Microtubules: a network for solitary waves. in Journal of the Serbian Chemical Society. 2017;82(5):469-481. doi:10.2298/JSC161118020Z .
Zdravković, Slobodan, "Microtubules: a network for solitary waves" in Journal of the Serbian Chemical Society, 82, no. 5 (2017):469-481, https://doi.org/10.2298/JSC161118020Z . .