Dr. Maria Korovina is a Leading Researcher at Lomonosov Moscow State University, specializing in the analytic theory of differential equations and resurgent analysis. She earned her PhD and Doctor of Physico-Mathematical Sciences degrees from the Faculty of Computational Mathematics and Cybernetics at the same institution, where her doctoral research addressed elliptic problems in spaces with asymptotics and their applications to self-adjoint extensions of the Laplace operator. Throughout her career, she has contributed significantly to the analytic theory of differential equations, focusing on the Poincaré problem and the asymptotic behavior of solutions with meromorphic coefficients near irregular singular points. Her pioneering work established general forms of asymptotic expansions for equations with simple and multiple roots of the principal symbol, later extended to arbitrary principal symbols. Among her notable contributions is the development of a method for constructing these asymptotic expansions, which has advanced understanding in mathematical analysis and differential equations. Dr. Korovina has an extensive publication record, with over fifty articles indexed in Web of Science and Scopus and more than one hundred on Google Scholar, along with several scholarly books in Russian. Her research is recognized for its theoretical depth and precision, making substantial contributions to the field of applied and theoretical mathematics. 144 Citations, 54 publications, h-index: 8.
Profiles: Scopus | ORCID
Featured Publications
1. Korovina, M. V., & Smirnov, I. (2024). Method for investigation of convergence of formal series involved in asymptotics of solutions of second-order differential equations in the neighborhood of irregular singular points. Axioms, 13(12), 853.
2. Korovina, M. V., Matevossian, H. A., & Smirnov, I. N. (2024). Asymptotics of solutions to a third-order equation in a neighborhood of an irregular singular point. Siberian Mathematical Journal.
3. Korovina, M. V., Matevossian, H. A., & Smirnov, I. N. (2024). Asymptotics of solutions to a third-order equation in a neighborhood of an irregular singular point. Vladikavkaz Mathematical Journal.
4. Korovina, M. V., Matevossian, H. A. (2023). On uniform asymptotics of solutions of second-order differential equations with meromorphic coefficients in the neighborhood of singular points. Siberian Electronic Mathematical Reports, 20(020).
5. Korovina, M. V. (2023). Uniform asymptotics of solutions to linear differential equations with holomorphic coefficients in the neighborhood of an infinitely distant point. Lobachevskii Journal of Mathematics.