Professor, Department of Mathematical Sciences
University of Agder, Kristiansand, Norway
Yuri V. Rogovchenko achieved a masters degree with honors in mathematics at the Taras Shevchenko National University of Kyiv in 1983 and a Ph.D. degree in differential equations and mathematical physics at the Institute of Mathematics of the National Academy of Sciences of Ukraine in 1987. He worked in the Department of Mathematical Physics and Nonlinear Oscillations at the Institute of Mathematics in Kiev, Ukraine and later at the Eastern Mediterranean University in Famagusta, North Cyprus and at the University of Kalmar, Sweden. Since 2010, he is a Professor of Mathematical Analysis at the Umeå University, Sweden. Dr. Rogovchenko has been a Regular Associate of the Abdus Salam International Centre for Theoretical Physics in Trieste, Italy during 2006-2012 and held visiting positions at the University of Bologna, Université de Picardie J. Verne, Middle East Technical University, Weierstrass Institute for Applied Mathematics and Stochastics, and Mathematisches Forschunginstitut Oberwolfach. He was awarded research fellowships of the Consiglio Nazionale delle Ricerche (Italian National Research Council) in 1993 and 1995 and a CNR-NATO senior research guest fellowship in 1997.
Dr. Rogovchenko published over seventy research papers in reputable academic journals and peer-refereed proceedings of international conferences. He is a member of the editorial board of the "International Journal of Differential Equations" and "Discrete Dynamics in Nature and Society" published by the Hindawi Publishing Corporation. Dr. Rogovchenko has been the Lead Guest Editor for the Special Issues on Recent Advances in Oscillation Theory 2010 and 2011, Guest Editor for the Special Issue on Recent Progress in Differential and Difference Equations and for the Special Issue on Functional Differential and Difference Equations with Applications. He has been serving as a referee for over fifty international journals in pure and applied mathematics.
Qualitative theory of ordinary, Functional and impulsive differential equations; Mathematical modeling in biology, Medicine and social sciences