
Position, Degree: Corresponding Member of the NAS of Ukraine, Doctor of Physical and Mathematical Sciences, Professor
Position: Head of the Department of Applied Mechanics
E-mail: alexander.zuyev@gmail.com, web: http://zuyev.science
Research Fields: mathematical control theory, stability theory, qualitative theory of differential equations, mathematical problems of mechanics and chemical Engineering
Personal profiles:
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1997 – Diploma with distinction in Mathematics from Donetsk National University; 1994 – 1997 – Student Employee, Software Engineer (part time), “Recon” company, Donetsk; 1997 – 2000 – Postgraduate Student at the Institute of Applied Mathematics and Mechanics, National Academy of Sciences of Ukraine; 2000 – Candidate of Sciences. Thesis on Stabilization and stability of nonlinear dynamical systems with application to problems of rigid bodies mechanics; 2008 – Doctor of Sciences (Dr. habil.). Thesis on Motion control and stabilization of infinite dimensional mechanical systems with elastic elements. 2000 – 2002 – Junior Research Fellow, Institute of Applied Mathematics and Mechanics, National Academy of Sciences of Ukraine; Lecturer (2000–2001) and Docent (2001–2002, part time), Dept. of Mathematics & Information Science, Donetsk State University of Management. Donetsk National University: 2005–2008 – Docent 2008–2014 – Professor Institute of Applied Mathematics and Mechanics, National Academy of Sciences of Ukraine 2002–2005 – Research Associate 2005–2008 – Senior Research Fellow 2009–2014 – Leading Researcher 2014– present – Head of the Department of Applied Mechanics 2003 – Visiting Scientist at the Abdus Salam International Centre for Theoretical Physics, Trieste, Italy; 2004– Alexander von Humboldt Research Fellow, TU Ilmenau, Germany; 2010 and 2014 – Alexander von Humboldt Research Fellow (Alumni Program), University of Stuttgart, Germany. 2025 – Award of the National Academy of Sciences of Ukraine“For Scientific Achievements” 2023 – Award of the National Academy of Sciences of Ukraine “For Preparing the Next Generation of Scientists,” presented on the occasion of International Mathematics Day for fruitful scientific and pedagogical work, personal contribution to the development of mathematical science and education, and active promotion of mathematical knowledge. 2018 – Commemorative Award from the Presidium of the National Academy of Sciences of Ukraine in honor of the 100th anniversary of the National Academy of Sciences of Ukraine 2010 – Named Scholarship from the Verkhovna Rada of Ukraine for the most talented young scientists 2010 – Award of the Cabinet of Ministers of Ukraine for outstanding achievements by young people in the development of Ukraine 2009 – Named scholarship from the Verkhovna Rada of Ukraine for the most talented young scientists 2008 – State Prize of Ukraine in Science and Technology 2006 – Award of the President of Ukraine for Young Scientists 2004 – Humboldt Foundation Scholarship 2002 – P. V. Kharlamov Award at the Institute of Applied Mathematics and Mechanics of the National Academy of Sciences of Ukraine 2001–2002 – Scholarship from the National Academy of Sciences of Ukraine for Young Scientists 2001 –Certificate of Merit from IFAC(International Federation of Automatic Control) 2001 – Diploma from the National Academy of Sciences for Young Scientists 2001 – Certificate of Merit from the National Academy of Sciences of Ukraine for the best scientific work by young scientists Monographs G.M. Sklyar, A.L. Zuyev (eds). Zuyev A. Zuev, A.L., Ignatyev, A.O., Kovalev, A.M. Articles Y. Yevgenieva, A. Zuyev, P. Benner A. Zuyev, P. Benner J. Kalosha, Y. Yevgenieva, A. Zuyev A. L. Zuyev, L. Feng, P. Benner V. Grushkovskaya, A. L. Zuyev Y. Yevgenieva, A. L. Zuyev, P. Benner, A. Seidel-Morgenstern A. L. Zuyev, V. Grushkovskaya V. Grushkovska, I. Vasylieva, A. L. Zuyev A. L. Zuyev, F. Pellicano, A. Zippo, G. Iarriccio Y. Yevgenieva, A. L. Zuyev, J. Kalosha Yu.N. Kononov, V.F. Shcherbak, A.L. Zuyev O. L. Zuev, Yu. M. Kononov, V. F. Shcherbak V. Grushkovskaya, A. L. Zuyev P. Benner, S. Chuiko, A. L. Zuyev A. L. Zuyev, I. V. Gosea A. L. Zuyev, J. Kalosha R. Misra, R. Wisniewski, A. L. Zuyev J. I. Kalosha, A. L. Zuyev A. L. Zuyev, P. Benner J. I. Kalosha, A. L. Zuyev, P. Benner P. Benner, A. Seidel-Morgenstern, A. L. Zuyev A. L. Zuyev, J. Kalosha A. L. Zuyev, P. Benner, A. Seidel-Morgenstern V. Grushkovskaya, A. L. Zuyev V. Grushkovskaya, A. L. Zuyev O. L. Zuev P. Benner, A. Seidel-Morgenstern, A. L. Zuyev A. L. Zuyev, I. Vasylieva V. Grushkovskaya, A. L. Zuyev V. Grushkovskaya, A. L. Zuyev A. L. Zuyev, V. Grushkovskaya V. Grushkovskaya, A. L. Zuyev A. L. Zuyev, I. G. Vasylieva V. Grushkovskaya, A. L. Zuyev A. L. Zuyev, J. Novikova V.V. Grushkovskaya, A.L. Zuyev, C. Ebenbauer V. Grushkovskaya, A.L. Zuyev, C. Ebenbauer A. L. Zuyev, V. Grushkovskaya A. L. Zuyev, A. Kienle, P. Benner V. Grushkovskaya, A. L. Zuyev A. L. Zuyev, A. Seidel-Morgenstern, P. Benner A. L. Zuyev, V. Grushkovskaya A. L. Zuyev, V. Grushkovskaya, P. Benner A. L. Zuyev, P. Benner A. L. Zuyev V. Grushkovskaya, A. L. Zuyev A. L. Zuyev A. L. Zuyev, Yu. V. Novikova A. L. Zuyev, O. Sawodny V. Grushkovskaya, A. L. Zuyev A.L. Zuev, Y.V. Novikova A.L. Zuev, Y.V. Novikova A.L. Zuev, Y.V. Novikova Professional Development (Internship): 6.03.2019-29.09.2019 р. – Max Planck Institute for the Dynamics of Complex Technical Systems (Magdeburg, Germany) 1.06.2018-21.12.2018 р. – Max Planck Institute for the Dynamics of Complex Technical Systems (Magdeburg, Germany) 1.06.2017-15.12.2017 р. – Max Planck Institute for the Dynamics of Complex Technical Systems (Magdeburg, Germany) 1.06.2016-30.11.2016 р. – Max Planck Institute for the Dynamics of Complex Technical Systems (Magdeburg, Germany) Supervision of Graduate Students: Teaching Experience Courses for undergraduate, graduate, and PhD students:
Stabilization of Distributed Parameter Systems: Design Methods and Applications (SEMA SIMAI Springer Series). Springer. 2021.
https://doi.org/10.1007/978-3-030-61742-4
Partial Stabilization and Control of Distributed Parameter Systems with Elastic Elements (Lecture Notes in Control and Information Sciences, 458). Springer. 2015.
https://doi.org/10.1007/978-3-319-11532-0
Stability and Stabilization of Nonlinear Systems. Naukova Dumka. 2013.
https://www.nas.gov.ua/UA/Book/Pages/default.aspx?BookID=0000007787
Stability and decay rate estimates for a nonlinear dispersed flow reactor model with boundary control. 2025 European Control Conference (ECC), Thessaloniki, Greece. – 2025. – P. 1672-1677. DOI: 10.23919/ECC65951.2025.11187013
Iterative Approximations of Periodic Trajectories for Nonlinear Systems With Discontinuous Inputs. IEEE Control Systems Letters. – 2025. – Vol. 9. – P. 985-990. DOI:10.1109/LCSYS.2025.3579409
Partial stabilization of an orbital satellite model with flexible attachment. Journal of Mathematical Sciences. – 2025. – Vol. 291, No. 6. – P. 1016‑1024. DOI:10.1007/s10958-025-07875-1
Estimates of the Kolmogorov n-width for nonlinear transformations with application to distributed-parameter control systems // IEEE Control Systems Letters. – 2024. – V. 8. – P. 1877-1882. DOI: 10.1109/LCSYS.2024.3418314
Design of stabilizing feedback controllers for high-order nonholonomic systems // IEEE Control Systems Letters. – 2024. – V. 8. – P. 988-993. DOI: 10.1109/LCSYS.2024.3406931
Periodic optimal control of a plug flow reactor model with an isoperimetric constraint // Journal of Optimization Theory and Applications. – 2024. – V. 202, Is. 2. – P. 582-604. DOI: 10.1007/s10957-024-02439-w
Stabilization of a nonholonomic car model with off-hooked trailers // 2024 32nd Mediterranean Conference on Control and Automation (MED). – IEEE, 2024. – P. 364-369. DOI: 10.1109/MED61351.2024.10566256
Partial stabilization of nonlinear systems along a given trajectory // 2024 European Control Conference (ECC). – IEEE, 2024. – P. 1954-1959. DOI: 10.23919/ECC64448.2024.10590790
Dynamic Modelling of a Controlled Orthotropic Plate: Analytic and Data-Driven Approaches in the Frequency Domain //ASME International Mechanical Engineering Congress and Exposition. – American Society of Mechanical Engineers. – 2024. – V. 5. – Art. no. V005T07A052. DOI: 10.1115/IMECE2024-145739
On the Controllability of an Orbiting Satellite Model with Electromagnetic-only Actuation // Праці Інституту прикладної математики і механіки НАН України. – 2024. – Т. 38(1). – С. 54-62. DOI: 10.37069/1683-4720-2024-38-6
Founder of the Donetsk school of mechanics: On the 100th anniversary of Pavel Kharlamov’s birth // Праці Інституту прикладної математики і механіки НАН України. – 2024. – Т.38(1). – С. 3-10. DOI: 10.37069/1683-4720-2024-38-1
Pavel Vasilyevich Kharlamov—Founder of the Donetsk School of Mechanics: On the 100th Anniversary of His Birth // Bulletin of the National Academy of Sciences of Ukraine. – 2024. – №. 6. – С. 96-101. DOI: 10.15407/visn2024.06.096
Motion planning and stabilization of nonholonomic systems using gradient flow approximations // Nonlinear Dynamics. – 2023. – V. 111, Is. 23. – P. 21647-21671. DOI: 10.1007/s11071-023-08908-7
A periodic boundary value problem with switchings under nonlinear perturbations // Boundary Value Problems. – 2023. – V. 2023, Is. 1. – Art. no. 50. DOI: 10.1186/s13661-023-01734-1
Approximating a flexible beam model in the Loewner framework // 2023 European Control Conference (ECC). – IEEE, 2023. – P. 1-7. DOI: 10.23919/ECC57647.2023.10178203
A Dynamic Observer for a Class of Infinite-Dimensional Vibrating Flexible Structures // 2023 European Control Conference (ECC). – 2023. – P. 1-6. DOI: 10.23919/ECC57647.2023.10178223
Attitude stabilization of a satellite having only electromagnetic actuation using oscillating controls // Aerospace. – 2022. – V. 9, Is. 8. – Art. no. 444. DOI: 10.3390/aerospace9080444
Asymptotic stabilization of a flexible beam with attached mass // Ukrainian Mathematical Journal. – 2022. – V. 73, Is. 10. – P. 1537-1550. DOI: 10.1007/s11253-022-02012-6
Stabilization of crystallization models governed by hyperbolic systems // SEMA SIMAI Springer Series. – 2021. – V. 2. – P. 123-135. DOI: 10.1007/978-3-030-61742-4_8
On the eigenvalue distribution for a beam with attached masses // SEMA SIMAI Springer Series. – 2021. – V. 2. – P. 43-56. DOI: 10.1007/978-3-030-61742-4_3
Analysis of switching strategies for the optimization of periodic chemical reactions with controlled flow-rate // Springer Proceedings in Mathematics and Statistics. – 2021. – V. 364. – P. 59-69. DOI: 10.1007/978-3-030-77314-4_5
Observer design for a flexible structure with distributed and point sensors // Праці Інституту прикладної математики і механіки НАН України. – 2021. – Т. 35(2). – С. 125-136. DOI: 10.37069/1683-4720-2021-35-9
On the orbital stability of periodic trajectories of a class of discontinuous systems // PAMM. – 2021. – V. 21, Is. 1. – P. e202100222. DOI: 10.1002/pamm.202100222
Extremum seeking approach for nonholonomic systems with multiple time scale dynamics // IFAC-PapersOnLine. – 2020. – V. 53, Is. 2. – P. 5392-5398. DOI: 10.1016/j.ifacol.2020.12.1529
Partial stabilization of nonholonomic systems with application to multi-agent coordination // European Control Conference (ECC). – 2020. – Art. no. 9143613.– P. 1665-1670. DOI: 10.23919/ECC51009.2020.9143613
Mathematical Theory of Control: Nonlinear Dynamics and Engineering Applications // Bulletin of the National Academy of Sciences of Ukraine. – 2020. – №. 1. – С. 29-37. DOI: 10.15407/visn2020.01.029
Periodic switching strategies for an isoperimetric control problem with application to nonlinear chemical reactions // Applied Mathematical Modelling. – 2019. – V. 69. – P. 287-300. DOI: 10.1016/j.apm.2018.12.005
Partial stabilization of stochastic systems with application to rotating rigid bodies // IFAC-PapersOnLine. – 2019. – V. 52, Is. 16. – P. 162-167. DOI: 10.1016/j.ifacol.2019.11.772
Partial stability concept in extremum seeking problems // IFAC-PapersOnLine. – 2019. – V. 52, Is. 16. – P. 682-687. DOI: 10.1016/j.ifacol.2019.12.041
On exponential stabilization of nonholonomic systems with time-varying drift // IFAC-PapersOnLine. – 2019. – V. 52, Is. 16. – P. 156-161. DOI: 10.1016/j.ifacol.2019.11.771
On stabilization of nonlinear systems with drift by time-varying feedback laws // 2019 12th International Workshop on Robot Motion and Control (RoMoCo). – IEEE, 2019. – Art. no. 8787353. – P. 9-14. DOI: 10.1109/RoMoCo.2019.8787353
Stabilization of non-admissible curves for a class of nonholonomic systems // 2019 18th European Control Conference (ECC). – IEEE, 2019. – Art. no. 8795948. – P. 656-661. DOI: 10.23919/ECC.2019.8795948
Control design for partial stabilization of nonlinear mechanical systems with random disturbances // Збірник Праць Інституту математики НАН України. – 2019. – Т. 16(2). – С. 209-223. https://trim.imath.kiev.ua/index.php/trim/article/download/423/414/1295
Stabilization of underactuated nonlinear systems to non‐feasible curves // PAMM. – 2019. – V. 19, Is. 1. – P. e201900160. DOI: 10.1002/pamm.201900160
Modeling and stabilization of a rotating mechanical system with elastic plates // IFAC-PapersOnLine. – 2018. – Vol.51, No.2. – P. 493–498. DOI: 10.1016/j.ifacol.2018.03.083
On a class of generating vector fields for the extremum seeking problem: Lie bracket approximation and stability properties // Automatica. – 2018. – Vol. 94. – P. 151–160. DOI: 10.1016/j.automatica.2018.04.024
On extremum seeking controllers based on the Lie bracket approximation in domains with obstacles // PAMM – Proceedings in Applied Mathematics and Mechanics. – 2018. – Vol. 18, No. 1. DOI: 10.1002/pamm.201800298
Motion planning for control-affine systems satisfying low-order controllability conditions // International Journal of Control. – 2017. – Vol.90, No.11. – P. 2517-2537. DOI: 10.1080/00207179.2016.1257157
Construction of a Lyapunov functional for a class of controlled population balance models // PAMM – Proceedings in Applied Mathematics and Mechanics. – 2017. – Vol. 17, No.1. – P. 827-828. DOI: 10.1002/pamm.201710381
Motion planning problem with obstacle avoidance for step-2 bracket-generating systems // PAMM – Proceedings in Applied Mathematics and Mechanics. – 2017. – Vol. 17, No.1. – P. 799-800. DOI: 10.1002/pamm.201710367
An isoperimetric optimal control problem for a non-isothermal chemical reactor with periodic inputs // Chemical Engineering Science. – 2017. – Vol. 161. – P. 206-214. DOI: 10.1016/j.ces.2016.12.025
Obstacle avoidance problem for driftless nonlinear systems with oscillating controls // IFAC-PapersOnLine. – 2017. – Vol.50, No.1. – P. 15343–15348. DOI: 10.1016/j.ifacol.2017.08.1093
Time-varying stabilization of a class of driftless systems satisfying second-order controllability conditions // Proc. 2016 European Control Conference (ECC), Aalborg, Denmark. – 2016. – P. 575-580.
Local steering problem for a class of control-affine systems with application to continuous crystallization processes // PAMM – Proceedings in Applied Mathematics and Mechanics. – 2016. – Vol.16, No.1. – P. 831-832. DOI: 10.1002/pamm.201610404
Exponential stabilization of nonholonomic systems by means of oscillating controls // SIAM Journal on Control and Optimization. – 2016. – Vol. 54. – P. 1678-1696. DOI: 10.1137/140999955
Attractors of nonlinear dynamical systems with a weakly monotone measure // Journal of Mathematical Analysis and Applications. – 2015. – Vol. 422. – P. 559-570. DOI: 10.1016/j.jmaa.2014.08.046
Reachable sets of quasilinear hyperbolic control systems with applications to separation processes // PAMM – Proceedings in Applied Mathematics and Mechanics. – 2015. – Vol. 15, No. 1. – P. 647-648. DOI:10.1002/pamm.201510313
Estimation of the reachable set for the problem of vibrating Kirchhoff plate // Ukrainian Mathematical Journal. – 2015. – Vol. 66, No. 11. – P. 1639-1653. DOI: 10.1007/s11253-015-1041-0
Modelling and control of a shell structure based on a finite dimensional variational formulation // Mathematical and Computer Modelling of Dynamical Systems. – 2015. – 21. – P. 591-612. DOI: 10.1080/13873954.2015.1065278
Optimal stabilization problem with minimax cost in a critical case // IEEE Transactions on Automatic Control. – 2014. – Vol. 59. – P. 2512-2517.
Stabilization of Kirchhoff Plate Oscillations Using State-Feedback Control // Proceedings of the Institute of Applied Mathematics and Mechanics of the National Academy of Sciences of Ukraine. . – 2014. – Т. 28. – С. 31-44.
Stabilization of the Motion of a Rotating Body with an Elastic Plate // Proceedings of the Institute of Mathematics of the National Academy of Sciences of Ukraine. – 2014. – Т. 11, № 4. – С. 112-124.
Estimation of the attainability set in the Kirchhoff plate vibration problem // Ukrainian Mathematical Journal. – 2014. – Т. 66, № 11. – С. 1463-1476.