Sergiy Reutskiy

Sergiy Reutskiy

发布人:办公室    发布时间:2016-09-30    浏览次数:

姓名

Sergiy Reutskiy

性别

Male

民族

 

籍贯

Ukraine

出生年月

1951/04/26

政治面貌

 

最高学历

Ph.d.

最高学位

Doctor of Technical Science

现任职务

Professor

技术职称

 

通讯地址

No.8 West Focheng Road, Jiangning, Nanjing

电话

13770917933

Email

sergiyreutskiy@mail.ru

学习、工作经历、主要研究方向、业绩成果(教学、科研和管理)、荣誉称号等

 

Education

Ph.D., Moscow Research Power Institute named after G.M. Krzizanovski (Leninski prospect, 19, Moscow, Russia), 1987.

M.S., Mechanics and Mathematics Department of Kharkov State University, 1975.

Experience

Department of Engineering Mechanics, College of Mechanics and Material, 2016-now, professor

State Institution «Institute of Technical Problems of Magnetism of the National Academy of Sciences of Ukraine», 2006–2016, senior staff scientist, leading researcher

Laboratory of Magnetohydrodynamics of Moscow Research Power Institute named after G.M. Krzizanovski (Kharkov), 1979 - 2006, post-graduate student, junior staff scientist, scientist, senior staff scientist

Research interests

Applied mathematics, computational methods. The meshless methods for solving initial/boundary value problems with differential, functional-differential, integro-differentiall equations and PDEs of integer/fractional order. Numerical methods for eigenvalue problems of integer/fractional order with applications to mechanical and electromagnetic engineering problems. Numerical methods for modeling of the electromagnetic pollution of environment.

Selected publications

1. Reutskiy S.Y., Lifits S.A.,Tirozzi B. A Quasi Trefftz-type Spectral Method for SolvingInitial Value Problems with Moving Boundaries, Math. Models. and Meth. Appl. Sci., 7, 1997, 385-404.

2. Pontrelli G., Reutskiy S.Y., Lifits S.A., Tirozzi B. A Quasi Trefftz Spectral Method for Stokes Problem, Math. Models. and Meth. Appl. Sci., 7, 1997, 1187—2012.

3. Reutskiy S.Y., Lifits S.A.,Tirozzi B. Trefftz Spectral Method for Initial-Boundary Problems, Computer Assisted Mechanics andEngineering Sciences, 4, 1997, 549-565.

4. Reutskiy S.Y., Tirozzi B. Quasi Trefftz Spectral Method for Separable Linear Elliptic Equations,Comp. Math. with Appl., 37, 1999, 47-74.

5. Reutskiy S.Y., Pittalis S., Tirozzi B. Enhancement of em field inside a local probe microscope, Journal of Modern Optics , 47, 2001, 25-32.

6. Reutskiy S.Y., Tirozzi B. A new boundary method for electromagnetic scattering from inhomogeneous bodies, Journal of Quantative Spectroscopy&Radiative Transfer, 72, 2002, 837-852.

7. Reutskiy S.Y., Tirozzi B., Trefftz spectral method for elliptic equations of general type, Computer Assisted Mechanics and Engineering Sciences, 8, 2001, 629-644.

8. Reutskiy S.Y., A boundary method of Trefftz type with approximate trial functions, Engineering Analysis with Boundary Elements, 26/4, 2002, 341-353.

9. Reutskiy S.Y., Rossoni E., Tirozzi B., Conduction in bundles of demyelinated nerve fibers: computer simulation. Biological Cybernetics, 89, N 6, 439 - 448, (2003).

10. Reutskiy S.Y., Trefftz type method for 2D problems of electromagnetic scattering, Computer Assisted Mechanics and Engineering Sciences, 10:609-618,2003.

11. Reutskiy S.Y., A,Trefftz type method for time-dependent problems,. Engineering Analysis with Boundary Elements, 28, p 13-21, (2004).

12. Reutskiy S. Yu., A Boundary Method of the Trefftz Type for Hydrodynamic Application. Journal of the Chinese Institute of Engineers, 27, N 4, 541 - 546, (2004).

13. Reutskiy S.Yu., Tirozzi B., A meshless boundary method for 2D problems of electromagnetic scattering from inhomogeneous bodies: H-polarized waves, Journal of Quantative Spectroscopy & Radiative Transfer, 83, 313-320, (2004).

14. Reutskiy S.Yu., A boundary method of Trefftz type for PDEs with scattered data, Engineering Analysis with Boundary Elements29, pp. 713 -724, (2005).

15. Reutskiy S.Yu., The method of fundamental solutions for eigenproblems with Laplace and biharmonic operators,CMC: Computers, Materials & Continua, 2, N 3, pp. 177-188, (2005).

16. Reutskiy S.Y., The method of fundamental solutions for Helmholtz eigenvalue problems in simply and multiply connected domains, Eng. Anal. Bound. Elem., 30, 150--159, 2006.

17. Reutskiy S.Y., The Method of External Sources (MES) for Eigenvalue Problems with Helmholtz Equation, CMES: Computer Modeling in Engineering & Sciences, 12, 27—39, 2006.

18. Reutskiy S.Y. and Chen C.S. Approximation of multivariate functions and evaluation of particular solutions using Chebyshev polynomial and trigonometric basis functions, International Journal for Numerical Methods in Engineering, (2006).

19. Reutskiy S.Yu., The method of fundamental solutions for problems of free vibrations of plates. Engineering Analysis with Boundary Elements, v. 31, pp. 10-21, (2007)

20. Reutskiy S.Y., Tirozzi B. Forecast of the Trajectory of the Center of Typhoons and the Maslov Decomposition, Russian Journal of Mathematical Physics,Vol. 14, No. 2, pp. 232-237,(2007).

21. Reutskiy S.Y. The method of approximate fundamental solutions for axisymmetric problems with Laplace operator, Engineering Analysis with Boundary Elements. Special issue Innovative Numerical Methods for Micro and Nano Mechanics and Structures - Part I, v. 31, pp. 410-415, (2007).

22. Reutskiy S.Y., The methods of external and internal excitation for problems of free vibrations of non-homogeneous membranes, Engineering Analysis with Boundary Elements 31 (11), pp. 906–918, (2007).

23. Reutskiy S.Y., The method of external excitation for problems of free vibrations of non-homogeneous Timoshenko beams, International Journal For Computational Methods in Engineering Science and Mechanics. 8, Issue 6, 383 – 390, (2007).

24.Reutskiy S.Y., Chen C.S., Tian H.Y., A boundary meshless method using Chebyshev interpolation and trigonometric basis function for solving heat conduction problems International Journal for Numerical Methods in Engineering. Vol. 74, 10, 1621-1644 (2008).

25. Tian H.Y., Reutskiy S., Chen C.S. A basis function for approximation and the solutions of partial diferential equations, Numerical Methods for Partial Differential Equations 24, № 3, 1018-1036, (2008).

26. Reutskiy S.Yu., A Meshless Method for Nonlinear, Singular and Generalized Sturm-Liouville Problems, CMES: Computer Modeling in Engineering & Sciences 34 (3) (2008), pp. 227-252.

27. Reutskiy, S.Y. The Methods of External Excitation for Analysis of Arbitrarily-Shaped Hollow Conducting Waveguides, PIER: Progress In Electromagnetics Research. 82, 203-226, (2008).

28. Reutskiy S.Yu., Vibration analysis of arbitrarily shaped membranes, CMES: Computer Modeling in Engineering & Sciences 51 (2) (2009), pp. 115-141.

29. Reutskiy S.Yu., The method of external excitation for solving Laplace singular eigenvalue problems. Engineering Analysis with Boundary Elements 33 (2009) 209--214.

30. Chen C.S., Reutskiy S.Y., Rozov V.Y., The method of the fundamental solutions and its modifications for electromagnetic field problems. CAMES: Computer Assisted Mechanics and Engineering Sciences 16 (2009) 21-33.

31. Reutskiy S.Yu., The method of external excitation for solving generalized Sturm-Liouville problems, Journal of Computational and Applied Mathematics, 233 (2010) 2374-2386.

32. Reutskiy S.Y., A meshless method for one-dimensional Stefan problems, Appl. Math. Comput. 217 (2011) 9689--9701.

33. Reutskiy S.Yu., The method of approximate fundamental solutions (MAFS) for elliptic equations of general type with variable coefficients, Engineering Analysis with Boundary Elements 36 (2012) 985–992.

34.Rozov V.Y., Reutskiy S.Y., Pelevin D.Y., Yakovenko V.N.  The research of magnetic field of high-voltage AC transmissions lines, , Issue 1, 2012, 3-9.

35. S.Yu. Reutskiy, The method of approximate fundamental solutions (MAFS) for Stefan problems, Engineering Analysis with Boundary Elements 36 (2012) 281–292

36. Reutskiy S.Yu., A novel method for solving one-, two- and three-dimensional problems with nonlinear equation of the Poisson type, CMES: Computer Modeling in Engineering & Sciences 87(4) (2012), pp. 355-386.

37. Reutskiy S.Yu., Method of particular solutions for nonlinear Poisson-type equations in irregular domains, Engineering Analysis with Boundary Elements 37(2) (2013), pp. 401--408.

38. Reutskiy S.Yu., Method of particular solutions for solving PDEs of the second and fourth orders with variable coefficients, Engineering Analysis with Boundary Elements 37(10) (2013), pp. 1305--1310.

39.Rozov V.Y., Reutskiy S.Y., Pelevin D.Y., Pyliugina O.Y.The magnetic field of power transmission lines and the methods of its mitigation to a safe level, , Issue 2, 2013, Pages 3-9

40. Reutskiy S.Y., The method of approximate fundamental solutions (MAFS) for Stefan problems for the sphere, Appl. Math. Comput. 227 (2014) 648-655.

41. Reutskiy S.Y., A Novel Semi-Analytic Meshless Method for Solving Two and Three-Dimensional Elliptic Equations of General Form with Variable Coefficients in Irregular Domains, CMES: Computer Modeling in Engineering & Sciences 99 (4) (2014), pp. 327-349.

42. Reutskiy S.Y., A method of particular solutions for multi-point boundary value problems, Applied Mathematics and Computation 243 (2014) 559--569.

43. Rozov V.Y., Reutskiy S.Y., Pyliugina O.Y., Method of calculating the magnetic field of three-phase power lines , , Issue 5, 2014, 11-13.

44. Rozov V.Y., Reutskiy S.Y., Levina, S.V.,The study of the effect of weakening of static geomagnetic field by steel columns, , Issue 1, 2014, 12-19.

45.Reutskiy S.Y., A new collocation method for approximate solution of the pantograph funcional differential equations with proportional delay, Applied Mathematics and Computation 266 (2015) 642--655.

46. Reutskiy SY. The backward substitution method for multipoint problems with linear Volterra-Fredholm integro-differential equations of the neutral type. Journal of Computational and Applied Mathematics 2016;296: 724-738.

47. Reutskiy SY. A meshless radial basis function method for 2D steady-state heat conduction problems in anisotropic and inhomogeneous media. Engineering Analysis with Boundary Elements 2016;66: 1-11.

48. Reutskiy SY. A novel method for solving second order fractional eigenvalue problems. Journal of Computational and Applied Mathematics 2016;306: 133–153.

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