Peter Kogut
About Peter Kogut
Peter Kogut Scientist Profile
Peter Kogut is a scientist with a PhD in Physics and Mathematics. He has successfully defended two dissertations: 'Stability and Optimal Stabilization of Neutral Integro-Differential Equations' and 'Homogenization of Optimal Control Problems for Systems with Distributed Parameters.'
Peter Kogut Education and Expertise
Peter Kogut holds a doctorate in Physics and Mathematics. His research encompasses stability and stabilization of differential equations, as well as the homogenization of optimal control problems. His extensive academic background is reflected in his scientific work and numerous publications.
Peter Kogut Scientific Publications
Peter Kogut is the author of multiple scientific publications. Noteworthy among them is 'Variational Model with Nonstandard Growth Conditions for Restoration of Satellite Optical Images via Their Co-Registration with Synthetic Aperture Radar.' His work contributes significantly to the fields of mathematical modeling and image restoration technologies.
Peter Kogut Professional Achievements
Peter Kogut's professional recognition includes becoming the Soros Associated Professor in 1996 and receiving The First Prize of National Academy of Science of Ukraine for his research in homogenization theory of optimal control problems. He has also been honored with 'Excellence in Education of Ukraine' in 2014 and awarded the medal of A. M. Makarov in 2019 for his significant merits.
Peter Kogut Grants and Awards
Peter Kogut received two notable grants: one from the International Fund of Fundamental Investigations - 'Vidrodzhennia' and another from the Ukrainian Fund of Fundamental Investigations. His multiple accolades underscore his contributions to fundamental sciences and education.
Peter Kogut Department Leadership
Since 2014, Peter Kogut has been heading the department of differential equations at Oles Honchar Dnipro National University. His leadership role emphasizes his expertise and dedication to advancing the field of differential equations at the academic level.