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All issues Volume 274 (2021) E3S Web Conf., 274 (2021) 03032 References
Open Access
Issue
E3S Web Conf.
Volume 274, 2021
2nd International Scientific Conference on Socio-Technical Construction and Civil Engineering (STCCE – 2021)
Article Number 03032
Number of page(s) 7
Section Building Constructions, Buildings and Structures
DOI https://doi.org/10.1051/e3sconf/202127403032
Published online 18 June 2021
  1. J. Peng, C. Zhou, J. Xue, Q. Dai, X. He, Safety assessment of pipes with multiple local wall thinning defects under pressure and bending moment, Nucl. Eng. Des., 8 (241), 2758–2765 (2011) [CrossRef] [Google Scholar]
  2. J. W. Kim, C. Y. Park, Effect of length of thinning area on thefailure behavior of carbon steel pipe containing a defect of wall thinning, Nucl. Eng. Des., 3 (220), 274–284 (2003) [CrossRef] [Google Scholar]
  3. N. M. Yakupov, On a method for calculating shells of complex geometry (Research on the theory of shells. Tr. seminar, issue 17, Part II, Kazan, 1984) [Google Scholar]
  4. M. S. Kornishin, N. M. Yakupov, Spline option of the finite element method for calculating shells of complex geometry, Applied Mechanics, 23(3), 38–44 (1987) [Google Scholar]
  5. M. S. Kornishin, N. M. Yakupov, On the calculation of shells of complex geometry in cylindrical coordinates based on the spline option of the FEM, Applied Mechanics, 25(8), 53–60 (1989) [Google Scholar]
  6. N. M. Yakupov, K.G. Kiyamov, S.S. Galyaviev, R. Z. Khisamov, Methods and approaches to the study of a stress-strain state of the structures of complex geometry, Construction. News of universities, 8(524), 14–18 (2002) [Google Scholar]
  7. N. M. Yakupov, K.G. Kiyamov, S. N. Yakupov, I. K. Kiyamov, Modeling of structural elements of complex geometry by three-dimensional finite elements, Mechanics of composite materials and structures 17(1), 145–154 (2011) [Google Scholar]
  8. N.M. Yakupov, H.G. Kiyamov, S.N. Yakupov. Modelling of cyclic shells with complex geometry three-dimensional finite elements, Journal of Physics: Conference series, 1158 (2019) DOI: 10.1088/1742-6596/1158/4/042038. [Google Scholar]
  9. N. M. Yakupov, K. G. Kiyamov, S.S. Galyaviev, R. Z. Khisamov, Methods and approachesto the study of the stress-strain state of structures of complex geometry, Stroit., Izv. VUZov, 8 (524), 14–18 (2002) [Google Scholar]
  10. S. N. Yakupov, T. R. Nasibullin, Analysis of stress concentration in thin-walled structural elements with a local deepening, Struct. Mech. of Eng. Constr. and Build., 1, 30–36 (2016) [Google Scholar]
  11. S. P. Ivanov, O.G. Ivanov, R.A. Kayumov, I.Z. Mukhamedova, Stress-strain state of physically nonlinear shells with ends embedded in stationary arrays and interacting with an elastic medium, Bulletin of Kazan Technological University, 17(10), 221–225 (2014) [Google Scholar]
  12. O. A. Ammosova, R. A. Kayumov, I. Z. Mukhamedova, Modeling the thermal process when welding polyethylene pipes at naturally low temperatures, Bulletin of Kazan Technological University, 17(9), 71–76 (2014) [Google Scholar]
  13. N. M. Yakupov, H. G. Kiyamov, I. Z. Mukhamedova, Simulation of toroidal shell with local defect, Lobachevskii Journal of Mathematics, 41(7), 1310–1314 (2019) DOI: 10.1134/S1995080220070434 [CrossRef] [Google Scholar]
  14. V. I. Gulyaev, V. A. Bazhenov, E. A. Gotsulyak, V. V. Gaidaychuk, Calculation of shells of complex shape (Budivelnyk, Kiev, 1990) [Google Scholar]
  15. A. M. Maslennikov, D. V. Gamilov, Stress-strain state of toroidal shells with fractures of the middle surface, Vestn. of TSASU, 1, 90–93 (2007) [Google Scholar]
  16. A. P. Nikolaev, A. P. Kiselev, To the calculation of shells based on the nite element method, Bulletin of Peoples' Friend. Univ. of Russia, Ser. Eng. Research, 107–111 (2002) [Google Scholar]
  17. N. A. Gureeva, Y. V. Klochkov, A. P. Nikolaev, Calculation of a shell of rotation under an arbitrary loading using the FEM based on the Reisner functional, Comput. Technol., 13 (4), 51–19 (2008) [Google Scholar]
  18. Y. V. Klochkov, A. P. Nikolaev, T. A. Kiseleva, Stress-strain state of an elliptical cylinder with an ellipsoidal bottom made of dissimilar materials based on FEM, Izv. Sarat. un-that. New Ser., Ser. Math., Mech. Comput. Sci., 13 (3), 65–70 (2013) [Google Scholar]
  19. R. A. Kayumov, D. E. Strakhov, Prediction of deformation in time of polymeric materials with shape memory at different temperatures, Izvestija KGASU, 2 (16), 195–199 (2011) [Google Scholar]
  20. R. A. Kayumov, D. E. Strakhov, The study of the rheological properties of composite materials ofpower elements of building structures, IOP Conference Series: Materials Science and Engineering, 890, (2020) DOI: 10.1088/1757-899X/890/1/012096 [Google Scholar]
  21. R. A. Kayumov, I. Z. Muhamedova, V. V. Khammatova, Analysis of influence of cold plasma on stiffness properties of polymeric materials, IOP Conference Series: Materials Science and Engineering, 890, (2020) DOI: 10.1088/1757-899X/890/1/012092 [Google Scholar]

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