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Official adress |
University str.,2,Tbilisi 380043,Georgia
Tel (995-32)304-784 |
Marital status |
Single |
Nationality |
Georgian |
Date of
birth |
Born on April 10,1965 in
Tbilisi, Georgia |
Key qualification |
Computational mathematics, mathematical modeling, mathematical physics, optimal control |
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Education |
1982-1987 |
Tbilisi State University, Applied Mathematics and Computer Sciences Department, Student |
Academic Degree |
1987-1990 |
Tbilisi State University, Aspirant |
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1995 |
Candidate of Physical-Mathematical Science (Ph.D.)
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Professional Experience |
1987 |
Computer center of GOSPLAN, engineer-programmer Tbilisi State University, researcher
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1990 |
Informational computer center of Tbilisi State University, senior mathematician
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1993 -up now |
Tbilisi State University , Senior scientific worker of Computer Software Department |
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1997 |
Presidential Scholarship Grantees |
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Other activities |
Since 1993 I have been reading lectures in computational mathematics at the Tbilisi State University. In 1995 I defended a candidate's thesis in specialty " Computational mathematics". The title of the thesis:".."Take part in conferences. I am a Presidential Scholarship Grantees. |
Scientific Intersts |
- Investigation of non-local boundary value problem for elliptic equations.
- The convergence of difference schemes, using the operators of exact difference schemes.
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Languages |
Georgian, Russian-perfectly, English-well, Spanish-medially |
Publications |
Number of papers: 9
- N. Odishelidze. On the numerical solution of optimal control problem for helmholtz equation with non-local boundary conditions. Proceedings of Javakhishvili Tbilisi State University, Tbilisi, 1998, vol. 330 (19).
- F. Criado, H. Meladze, N. Odishelidze. An optimal control problem for helmholtz equation with non-local boundary conditions with quadratic functional. Rev. R. Acad. Cienc. Exact. Fis. Nat. (Esp.), Vol. 91, no. 1. pp 65 - 69, 1997,
Matema'ticas.
- F. Criado, N. Odishelidze, F. Criado (J). An optimal control problem for helmholtz equation with non-local boundary conditions. Applied Mathematics and Informatics. 1996, Vol. 1, no. 1, pp 40 - 54.
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Main courses |
- Numerical methods.
- Introduction of mathematical modeling.
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