Items by Smyshlyaev, Valery
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Abdessamad, Z., Kostin, I., Panasenko, G. and Smyshlyaev, V. P., 2007. Homogenization of thermo-viscoelastic Kelvin Voigt model. Comptes Rendus Mecanique, 335, 423--429.
Dominguez, V., Graham, I. G. and Smyshlyaev, V. P., 2007. A hybrid numerical-asymptotic boundary integral method for high-frequency acoustic scattering. Numerische Mathematik, 106 (3), pp. 471-510.
Cherednichenko, K. D., Smyshlyaev, V. P. and Zhikov, V. V., 2006. Non-local homogenized limits for composite media with highly anisotropic periodic fibres. Proceedings of the Royal Society of Edinburgh Section A - Mathematics, 136, 87--114.
Bonner, B. D., Graham, I. G. and Smyshlyaev, V. P., 2005. The computation of conical diffraction coefficients in high-frequency acoustic wave scattering. SIAM Journal on Numerical Analysis (SINUM), 43 (3), pp. 1202-1230.
Cherednichenko, K. D. and Smyshlyaev, V. P., 2004. On full two-scale expansion of the solutions of nonlinear periodic rapidly oscillating problems and higher-order homogenised variational problems. Archive for Rational Mechanics and Analysis, 174, 385--442.
Babich, V. M., Dement'ev, D. B., Samokish, B. A. and Smyshlyaev, V. P., 2004. Scattering of High-Frequency Electromagnetic Waves by the Vertex of a Perfectly Conducting Cone (Singular Directions). Journal of Mathematical Sciences N.Y., 122, 3453--3458.
Kiselev, A. P. and Smyshlyaev, V. P., 2003. V. M. Babich (on the occasion of his seventieth birthday). Journal of Mathematical Sciences N.Y., 117, 3891--3894.
Smyshlyaev, V. P., Babich, V. M., Dementiev, D. B. and Samokish, B. A., 2002. Diffraction of creeping waves by conical points. In: Abrahams, I. D., Martin, P. A. and Simon, M. J., eds. IUTAM Symposium on Diffraction and Scattering in Fluid Mechanics and Elasticity. Proceedings of the IUTAM Symposium held in Manchester, United Kingdom, 16-20 July 2000, 2000-07-16 - 2000-07-20, Manchester.
Babich, V. M., Dement'ev, D. B., Samokish, B. A. and Smyshlyaev, V. P., 2002. On the scattering of a high-frequency wave by the vertex of an arbitrary cone (singular directions). Journal of Mathematical Sciences N.Y., 111, 3623--3631.