Boundary variational inequality approach in the anisotropic elasticity for the Signorini problem.
Gachechiladze, A., Natroshvili, D. (2001)
Georgian Mathematical Journal
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Gachechiladze, A., Natroshvili, D. (2001)
Georgian Mathematical Journal
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Avalishvili, M., Gordeziani, D. (2003)
Georgian Mathematical Journal
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Khomasuridze, N. (2001)
Georgian Mathematical Journal
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Khomasuridze, N. (2003)
Georgian Mathematical Journal
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Lomtatidze, A., Malaguti, L. (2000)
Georgian Mathematical Journal
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Duduchava, R., Natroshvili, D., Shargorodsky, E. (1995)
Georgian Mathematical Journal
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Gaprindashvili, G. (1995)
Georgian Mathematical Journal
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Stepanov, V.N. (2005)
Sibirskie Ehlektronnye Matematicheskie Izvestiya [electronic only]
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Ashordia, M. (1996)
Georgian Mathematical Journal
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Lomtatidze, A. (1994)
Georgian Mathematical Journal
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Dong, Xin, Bai, Zhanbing (2008)
The Journal of Nonlinear Sciences and its Applications
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Meirmanov, A.M. (2007)
Sibirskie Ehlektronnye Matematicheskie Izvestiya [electronic only]
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Ahmed, S.M. (2000)
International Journal of Mathematics and Mathematical Sciences
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Yoshihiro Shibata (1992)
Banach Center Publications
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The global existence theorem of classical solutions for one-dimensional nonlinear thermoelasticity is proved for small and smooth initial data in the case of a bounded reference configuration for a homogeneous medium, considering the Neumann type boundary conditions: traction free and insulated. Moreover, the asymptotic behaviour of solutions is investigated.
Svatoslav Staněk (1993)
Annales Polonici Mathematici
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A differential equation of the form (q(t)k(u)u')' = F(t,u)u' is considered and solutions u with u(0) = 0 are studied on the halfline [0,∞). Theorems about the existence, uniqueness, boundedness and dependence of solutions on a parameter are given.