|
This article is cited in 3 scientific papers (total in 3 papers)
Modeling for reinforced with isogonal trajectories ring-shaped lamels in polar coordinate system
Natalia A. Feodorova Institute of Space and Information Technologies, Siberian Federal University, Krasnoyarsk, Russia
Abstract:
The resolving differential equations system formulated in terms of movements for axially symmetric reinforced ring-shaped lamels problem is obtained in case of polar coordinate system. A variety of reinforcement structures is reached by isogonal trajectories building for given curves classes. In context of the consistent approach for differential equations system solving the composite construction with a priory specified properties is achieved.
Keywords:
reinforcement, structural model, isogonal trajectories.
Full text:
PDF file (223 kB)
References:
PDF file
HTML file
UDC:
539.3+534.11 Received: 10.02.2011 Received in revised form: 10.03.2011 Accepted: 24.04.2011
Citation:
Natalia A. Feodorova, “Modeling for reinforced with isogonal trajectories ring-shaped lamels in polar coordinate system”, J. Sib. Fed. Univ. Math. Phys., 4:3 (2011), 400–405
Citation in format AMSBIB
\Bibitem{Fed11}
\by Natalia~A.~Feodorova
\paper Modeling for reinforced with isogonal trajectories ring-shaped lamels in polar coordinate system
\jour J. Sib. Fed. Univ. Math. Phys.
\yr 2011
\vol 4
\issue 3
\pages 400--405
\mathnet{http://mi.mathnet.ru/jsfu199}
Linking options:
http://mi.mathnet.ru/eng/jsfu199 http://mi.mathnet.ru/eng/jsfu/v4/i3/p400
Citing articles on Google Scholar:
Russian citations,
English citations
Related articles on Google Scholar:
Russian articles,
English articles
This publication is cited in the following articles:
-
Yu. V. Nemirovskii, N. A. Fedorova, “Issledovanie ratsionalnykh struktur krivolineinogo armirovaniya v polyarnoi sisteme koordinat”, Vestn. Sam. gos. tekhn. un-ta. Ser. Fiz.-mat. nauki, 1(30) (2013), 233–244
-
M. P. Galanin, N. A. Fedorova, “Armirovanie ploskikh konstruktsii po izogonalnym traektoriyam”, Preprinty IPM im. M. V. Keldysha, 2017, 033, 16 pp.
-
Nemirovsky V Yu., Feodorova N.A., “Modeling Limit States For Curvilinearly Reinforced Rotated Disk”, Math. Montisnigri, 44 (2019), 84–99
|
Number of views: |
This page: | 297 | Full text: | 70 | References: | 31 |
|