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Journal of Automation and Information Sciences
SJR: 0.232 SNIP: 0.464 CiteScore™: 0.27

ISSN Imprimir: 1064-2315
ISSN En Línea: 2163-9337

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Journal of Automation and Information Sciences

DOI: 10.1615/JAutomatInfScien.v50.i7.20
pages 7-24

Numerical Study of the Stability of Composite Materials on Computers of Hybrid Architecture

Alexander N. Khimich
V.M. Glushkov Institute of Cybernetics of National Academy of Sciences of Ukraine, Kiev
Vladimir А. Dekret
S.P. Timoshenko Institute of Mechanics of National Academy of Sciences of Ukraine, Kiev
Alexander V. Popov
V.M. Glushkov Institute of Cybernetics of National Academy of Sciences of Ukraine, Kiev
Aleksei V. Chistyakov
V.M. Glushkov Institute of Cybernetics of National Academy of Sciences of Ukraine, Kiev

SINOPSIS

The problem of numerical investigation of the stability of composite materials under compression along the reinforced elements using multicore computers with graphic processors is considered. The problem of the three-dimensional theory of stability of composites with the using the "finite-size fibers" model and mathematical methods for its solution are presented. A hybrid algorithm for solving a particular generalized eigenvalue problem for band matrices is proposed.

REFERENCIAS

  1. https://www.top500.org/Lists/2017/11/.

  2. Nemnyugin S.A., Stesik O.L., Parallel programming for multiprocessor computing systems [in Russian], BHV-Petersburg, SPb, 2002.

  3. Boreskov A.V., Kharlamov A.A., Fundamentals of working with CUDA technology [in Russian], DMK Press, Moscow, 2010.

  4. Guz A.N., Bases of the three-dimensional theory of stability of deformable bodies [in Russian], Vishcha school, Kiev, 1986.

  5. Guz A.N., Fundamentals of the three-dimensional theory of stability of deformable bodies, Heidelberg, Berlin, New York, Springer, 1999.

  6. Guz A.N., Dekret V.A., Short fiber model in the theory of stability of composites [in Russian], Lambert Acad. Publ., Saarbruecken, 2015.

  7. Guz A.N., Mechanics of fracture of composite materials under compression [in Russian], Naukova dumka, Kiev, 1990.

  8. Kokhanenko Yu.V., Numerical study of three-dimensional stability problems for laminated and ribbon-reinforced composites, Int. Appl. Mech., 2001, 37, No. 3, 317–345.

  9. Guz A.N., Kokhanenko Yu.V., Numerical solution of problems of the three-dimensional theory of stability of elastic bodies, Prikladnaya mekhanika, 2004, 40, No. 11, 117–126.

  10. Guz A.N., Dekret V.A., Kokhanenko Yu.V., Solution of plane problems of the three-dimensional problems stability of a ribbon-reinforced composite, Int. Appl. Mech., 2000, 36, No. 10, 1317–1328.

  11. Guz A.N., Dekret V.A., Interaction of two parallel short fibers in the matrix at loss of stability, Computer Modeling in Engineering & Sciences, 2006, 13, No. 3, 165–170.

  12. Guz A.N., Dekret V.A., On two models in the three-dimensional theory of stability of composites, Int. Appl. Mech., 2008, 44, No. 8, 839–854.

  13. Guz A.N., Dekret V.A., Stability loss in nanotube reinforced composites, Computer Modeling in Engineering & Sciences, 2009, 42, No. 1, 69-80.

  14. Guz A.N., Dekret V.A., Stability problem of composite material reinforced by periodical row of short fibers, Ibid., 2009, 42, No. 3, 177–186.

  15. Parlett B., Symmetric eigenvalue problem. Numerical methods [Russian translation], Mir, Moscow, 1983.

  16. Khimich A.N., Molchanov I.N., Popov A.V., Chistyakova T.V., Yakovlev M.F., Parallel algorithms for solving problems of computational mathematics [in Russian], Naukova dumka, Kiev, 2008.

  17. Khimich A.N., Popov A.V., Chistyakov A.V., Hybrid algorithms for solving the algebraic eigenvalue problem with sparse matrices, Kibernetika i sistemnyi analiz, 2017, 53, No. 6, 132–146.

  18. Khimich A.N., Baranov A.Yu., Hybrid algorithm for solving linear systems with band matrices by direct methods, Kompyuternaya matematika, 2013, 2, 80–87.

  19. Khimich A.N., Molchanov I.N., Mova V.I., Nikolaychuk O.O., Popov O.V., Chistyakova T.V., Yakovlev M.F., Tulchinskiy V.G., Yushchenko R.A., Intellectual personal supercomputer for solving scientific and technical problems, Nauka i innovatsii, 2016, 12.

  20. https://www.mathworks.com/products/matlab-online.html.

  21. https://www.intel.com/content/www/us/en/products/processors/xeon-phi.

  22. Chistyakov A.V., On some features of the solution of the algebraic eigenvalue problem on parallel computers with Intel Xeon Phi processors, Proceedings of the International Scientific Conference “Modern Informatics: Problems, Achievements and Developm.


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