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@article{INTO_2022_208_a9,
author = {M. V. Shamolin},
title = {Systems with~dissipation with~five degrees of freedom: analysis and ~integrability. {I.} {Primordial} problem from dynamics of a multidimensional rigid body in a nonconservative field of forces},
journal = {Itogi nauki i tehniki. Sovremenna\^a matematika i e\"e prilo\v{z}eni\^a. Temati\v{c}eskie obzory},
pages = {91--121},
publisher = {mathdoc},
volume = {208},
year = {2022},
language = {ru},
url = {http://geodesic.mathdoc.fr/item/INTO_2022_208_a9/}
}
TY - JOUR AU - M. V. Shamolin TI - Systems with~dissipation with~five degrees of freedom: analysis and ~integrability. I. Primordial problem from dynamics of a multidimensional rigid body in a nonconservative field of forces JO - Itogi nauki i tehniki. Sovremennaâ matematika i eë priloženiâ. Tematičeskie obzory PY - 2022 SP - 91 EP - 121 VL - 208 PB - mathdoc UR - http://geodesic.mathdoc.fr/item/INTO_2022_208_a9/ LA - ru ID - INTO_2022_208_a9 ER -
%0 Journal Article %A M. V. Shamolin %T Systems with~dissipation with~five degrees of freedom: analysis and ~integrability. I. Primordial problem from dynamics of a multidimensional rigid body in a nonconservative field of forces %J Itogi nauki i tehniki. Sovremennaâ matematika i eë priloženiâ. Tematičeskie obzory %D 2022 %P 91-121 %V 208 %I mathdoc %U http://geodesic.mathdoc.fr/item/INTO_2022_208_a9/ %G ru %F INTO_2022_208_a9
M. V. Shamolin. Systems with~dissipation with~five degrees of freedom: analysis and ~integrability. I. Primordial problem from dynamics of a multidimensional rigid body in a nonconservative field of forces. Itogi nauki i tehniki. Sovremennaâ matematika i eë priloženiâ. Tematičeskie obzory, Proceedings of the Voronezh International Spring Mathematical School "Modern Methods of the Theory of Boundary-Value Problems. Pontryagin Readings – XXXII”, Voronezh, May 3–9, 2021, Part 1, Tome 208 (2022), pp. 91-121. http://geodesic.mathdoc.fr/item/INTO_2022_208_a9/
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