ACADEMIC AWARDS AND GRANTS
Laureate of the “Recognition Medal of Penza” (1997).
Grant of the President of the Russian Federation “For Young Doctors of Science of Russia” (1996-1998)
Grant of the Governor and the Government of the Penza Region (2001)
Grant of the French Electrodynamic Academy (1998)
Grant of the Russian Foundation for Basic Research (1996, 1998, 1998-2000, 2001, 2001-2003, 2003-2005, 2006-2008, 2009-2011, 2012, 2013,2018)
Grant of the Ministry of Education of the Russian Federation on the Federal Target Program “Integration” (2001, 2002, 2002-2004, 2006, 2007-2008, 2009-2011, 2012, 2013)
Grant of the Ministry of Education of the Russian Federation “State Target” (2014-2016, 2017-2019)
Grant of the Russian Science Foundation (2014-2016)
Grant of the International Science Foundation (1993)
Grant of Volkswagen Stiftung, Germany (1996, 1999, 2000, 2006)
Grant of Karlstad University, Sweden (2002, 2005, 2006, 2008, 2009, 2011)
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MAIN PUBLICATIONS
1. Smirnov, Y., On the equivalence of the electromagnetic problem of diffraction by an inhomogeneous bounded dielectric body to a volume singular integro-differential equation, Computational Mathematics and Mathematical Physics, 2016, DOI: 10.1134/S0965542516080145.
2. Smirnov, Y., Tsupak, A.A., Investigation of electromagnetic wave diffraction from an inhomogeneous partially shielded solid, Applicable Analysis, 2017, DOI: 10.1080/00036811.2017.1343467.
3. Smirnov, Y., Tsupak, A.A., Existence and uniqueness theorems in electromagnetic diffraction on systems of lossless dielectrics and perfectly conducting screens, Applicable Analysis, 2017, DOI: 10.1080/00036811.2016.1188289.
4. Smirnov, Y., Tsupak, A.A., Valovik, D.V., On the volume singular integro-differential equation approach for the electromagnetic diffraction problem, Applicable Analysis, 2017, DOI: 10.1080/00036811.2015.1115839.
5. Smirnov, Y., Tsupak, A.A., On the Fredholm property of the electric field equation in the vector diffraction problem for a partially screened solid, Differential Equations, 2016, DOI: 10.1134/S0012266116090111.
6. Smirnov, Y., Tsupak, A.A., Method of integral equations in a scalar diffraction problem on a partially screened inhomogeneous body, Differential Equations, 2015, DOI: 10.1134/S0012266115090128.
7. Smirnov, Y., Tsupak, A.A., Diffraction of Acoustic and Electromagnetic Waves by Screens and Inhomogeneous Solids: Mathematical Theory, Moscow, RuScience 2016.
8. Smirnov, Y., Tsupak, A.A., Integro-differential Equations of the Vector Problem of Electromagnetic Wave Diffraction by a System of Nonintersecting Screens and Inhomogeneous Bodies, Advances in Mathematical Physics, 2015, DOI: 10.1155/2015/945965.
9. Medvedik M., Smirnov, Y., Tsupak, A.A., Scalar problem of plane wave diffraction by a system of nonintersecting screens and inhomogeneous bodies, Computational Mathematics and Mathematical Physics, 2014, DOI: 10.1134/S0965542514080089.
10. Medvedik M., Smirnov, Y., Smolkin E., Tsupak, A.A., Electromagnetic wave diffraction by a system of non-intersecting obstacles of various dimensions, Proceedings of the 2015 International Conference on Electromagnetics in Advanced Applications, ICEAA 2015, DOI: 10.1109/ICEAA.2015.7297389.
11. Medvedik, M.Y., Smirnov, Y.G., Tsupak, A.A., Valovik, D.V., Vector problem of electromagnetic wave diffraction by a system of inhomogeneous volume bodies, thin screens, and wire antennas, Journal of Electromagnetic Waves and Applications, 2016, DOI: 10.1080/09205071.2016.1172990.
12. Evstigneev, R.O., Medvedik, M.Y., Smirnov, Y.G., Inverse problem of determining parameters of inhomogeneity of a body from acoustic field measurements, Computational Mathematics and Mathematical Physics, 2016, DOI: 10.1134/S0965542516030040.
13. Medvedik M., Moskaleva M., Analysis of the problem of electromagnetic wave diffraction on non-planar screens of various shapes by the subhierarchic method, Journal of Communications Technology and Electronics 2015, DOI: 10.1134/S106422691505006X.
14. Medvedik M.Yu., Smirnov Yu.G., Inverse problems of restoration of dielectric permittivity of an inhomogeneous body in a waveguide, Penza, PSU Publishing House, 2014.
15. Smirnov Yu.G., Tsupak A.A., Mathematical theory of diffraction of acoustic and electromagnetic waves on the system of screens and inhomogeneous bodies.Moscow, KnoRus, 2016.
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