Alexander Romanov
- Доцент-исследователь:HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE) / School of Applied Mathematics
- Alexander Romanov has been at HSE University since 2012.
Education and Degrees
- 1976
Candidate of Sciences* (PhD) in Real, Complex and Functional Analysis
Voronezh State University - 1975
Doctoral programme
Central Institute of Economics and Mathematics of the Academy of Sciences of the USSR - 1971
Degree in Mathematics
Lomonosov Moscow State University
* Candidate of Sciences
According to the International Standard Classification of Education (ISCED) 2011, Candidate of Sciences belongs to ISCED level 8 - "doctoral or equivalent", together with PhD, DPhil, D.Lit, D.Sc, LL.D, Doctorate or similar. Candidate of Sciences allows its holders to reach the level of the Associate Professor.
According to the International Standard Classification of Education (ISCED) 2011, Candidate of Sciences belongs to ISCED level 8 - "doctoral or equivalent", together with PhD, DPhil, D.Lit, D.Sc, LL.D, Doctorate or similar. Candidate of Sciences allows its holders to reach the level of the Associate Professor.
Courses (2023/2024)
- Calculus (Bachelor’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE); 1 year, 1-4 module)Rus
- Past Courses
Courses (2022/2023)
Calculus (Bachelor’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE); 2 year, 1, 2 module)Rus
Courses (2021/2022)
Calculus (Bachelor’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE); 1 year, 1-4 module)Rus
Courses (2020/2021)
Calculus (Bachelor’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE); 2 year, 1, 2 module)Rus
Courses (2019/2020)
- Calculus (Bachelor’s programme; HSE Tikhonov Moscow Institute of Electronics and Mathematics (MIEM HSE); 1 year, 1-4 module)Rus
- Mathematical methods for the study of periodic processes (Optional course (university); 3, 4 module)Rus
Publications17
- Article A.V. Romanov. Finite-Dimensional Reduction of Systems of Nonlinear Diffusion Equations // Mathematical notes. 2023. Vol. 113. No. 2. P. 267-273. doi
- Preprint A.V. Romanov. Finite-dimensional reduction of systems of nonlinear diffusion equations / Cornell University. Series arXiv "math". 2022. No. 2210.00499.
- Chapter Kondratieva L., Aleksandr Romanov. Self-oscillations in a certain Belousov–Zhabotinsky model, in: XXII International Conference on Computational Mechanics and Modern Applied Software Systems (CMMASS'2021). 17, Avenue du Hoggar Parc d'Activités de Courtabœuf B.P. 112 F-91944 Les Ulis Cedex A France: MATEC Web of Conferences, 2022. Ch. 01011. P. 1-7. doi
- Article Aleksandr V. Romanov. Final dynamics of systems of nonlinear parabolic equations on the circle // AIMS MATHEMATICS. 2021. Vol. 6. No. 12. P. 13407-13422. doi
- Preprint A. V. Romanov. Final Dynamics of Systems of Nonlinear Parabolic Equations on the Circle / Cornell University. Series arXiv "math". 2020. No. 2011.01822.
- Article A.V. Romanov. Ergodic Properties of Tame Dynamical Systems // Mathematical notes. 2019. Vol. 106. No. 2. P. 286-295. doi
- Preprint A.V. Romanov, Kondratieva L. Inertial Manifolds and Limit Cycles of Dynamical Systems in Rn / Cornell University. Series math "arxiv.org". 2019. No. 1911.03932.
- Article Kondratieva L., A.V. Romanov. Inertial manifolds and limit cycles of dynamical systems in Rn // Electronic Journal of Qualitative Theory of Differential Equations. 2019. No. 96. P. 1-11. doi
- Preprint A.V. Romanov. Ergodic Properties of tame dynamical systems / Cornell University. Series math "arxiv.org". 2018. No. 1806.09132.
- Article A.V. Romanov. On Discrete Semi-Flows with Universally Measurable Ellis Semigroup // International Journal of Mathematical Analysis. 2017. Vol. 11. No. 18. P. 863-867. doi
- Article Romanov A. Ergodic properties of discrete dynamical systems and enveloping semigroups // Ergodic Theory and Dynamical Systems. 2016. Vol. 36. No. 1. P. 198-214. doi
- Preprint Romanov A. On the Hyperbolicity Properties of Inertial Manifolds of Reaction–Diffusion Equations / Cornell University. Series math "arxiv.org". 2016. No. 1602.08953.
- Article Romanov A. On the hyperbolicity properties of inertial manifolds of reaction–diffusion equations // Dynamics of Partial Differential Equations. 2016. Vol. 13. No. 3. P. 263-272. doi
- Article Romanov A. Parabolic Equation with Nonlocal Diffusion without a Smooth Inertial Manifold // Mathematical notes. 2014. Vol. 96. No. 4. P. 548-555. doi
- Preprint Romanov A. Ergodic Properties of Discrete Dynamical Systems and Enveloping Semigroups / Cornell University. Series math "arxiv.org". 2013. No. 1309.6283.
- Article Romanov A. Ordinary Semicascades and Their Ergodic Properties // Functional Analysis and Its Applications. 2013. Vol. 47. No. 2. P. 160-163. doi
- Preprint Alexander V. Romanov. Parabolic Equation with Nonlocal Diffusion without a Smooth Inertial Manifold / Cornell University. Series math "arxiv.org". 2013. No. 1306.4249.