Вывод уравнений градиентной теории в криволинейных координатах |
М.А. Гузев, C. Qi |
2013, выпуск 1, С. 35-42 |
Аннотация |
Для градиентной теории получены уравнения равновесия в криволинейных координатах. |
Ключевые слова: градиентная теория, криволинейные координаты |
Полный текст статьи (файл PDF) |
Библиографический список |
[1] R. A. Toupin, “Elastic materials with couple stresses”, Arch. Ration. Mech. Anal., 11:1 (1962), 385–414. [2] R. D. Mindlin, “Micro-structure in linear elasticity”, Arch. Ration. Mech. Anal., 16:1 (1964), 51–78. [3] R. A. Toupin, “Theories of elasticity with couple-stress”, Arch. Ration. Mech. Anal., 17:2 (1964), 85–112. [4] J. L. Bleustein, “A note on the boundary conditions of Toupin’s strain-gradient theory”, Int. J. Solids Struct., 3 (1967), 1053–1057. [5] R. D. Mindlin, N. N. Eshel, “On first strain-gradient theories in linear elasticity”, Int. J. Solids Struct., 4 (1968), 109–124. [6] N. N. Eshel, G. Rosenfeld, “Axi-symmetric problems in elastic materials of grade two”, J. Franklin Inst., 299:1 (1975), 43–51. [7] P. Germain, “The method of virtual power in continuum mechanics. Part 2: microstructure”, SIAM J. Appl. Math., 25:3 (1973), 556–575. [8] I. Vardoulakis, E. C. Aifantis, “A gradient flow theory of plasticity for granular materials”, Acta Mech., 87 (1991), 197–217. [9] N. A. Fleck, J. W. Hutchinson, “A phenomenological theory for strain gradient effects in plasticity”, J. Mech. Phys. Solids, 41:12 (1993), 1825–1857. [10] N. A. Fleck, J. W. Hutchinson, “A reformulation of strain gradient plasticity”, J. Mech. Phys. Solids, 49 (2001), 2245–2271. [11] R. Chambon, D. Caillerie, T. Matsuchima, “Plastic continuum with microstructure, local second gradient theories for geomaterials: localization studies”, Int. J. Solids Struct., 38 (2001), 8503–8527. [12] S. Lurie, P. Belov, N. Tuchkova, “The application of the multiscale models for description of the dispersed composites”, Comput. Mater. Sci., 36:2 (2004), 145–152. [13] П. А. Белов, А. М. Бодунов, С. А. Лурье, И. Ф. Образцов, Ю.Г. Яновский, “О моделировании масштабных эффектов в тонких структурах”, Механика композицонных материалов и конструкций, 8:4 (2002), 585–598. [14] J. D. Zhao, D. C. Sheng, “Strain gradient plasticity by internal-variable approach with normality structure”, Int. J. Solids Struct., 43 (2006), 5836–5850. [15] J. D. Zhao, D. C. Sheng, S. W. Sloan, K. Krabbenhoft, “Limit theorems for gradient-dependent elastoplastic geomaterials”, Int. J. Solids Struct., 44 (2007), 480–506. [16] C. Qi, Q. Qian, M. Wang, and J. Chen, “Derivation of governing equations of strain gradient model of rock mass near deep level tunnels”, Nonlinear geomechanical-geodynamic processes in deep mining, 2nd Russia-China Proceedings, July 2–5, Novosibirsk, 2012, 20–26. [17] М. А. Гузев, “Связь нелокальной и неевклидовой моделей сплошной среды”, Нелинейные геомеханические процессы при отработке месторождений полезных ископаемых на больших глубинах, 2-я Российско-Китайская конференция. Сборник трудов, ИГД СО РАН, Новосибирск, 2012, 27–31. [18] M. A. Guzev, “Comparision of non-Euclidean continuum model with strain gradient theory”, Abstract Book of the 23rd International Congress of Theoretical and Applied Mechanics, August 19–24, 2012, Beijing, China, 144. [19] J. Zhao, D. Pedroso, “Strain gradient theory in orthogonal curvilinear coordinates”, International Journal of Solids and Structures, 45 (2008), 3507–3520. [20] A. C. Eringen, Mechanics of Continua, John Wiley & Sons, Inc., 1967. |