Victor Ivrii Victor Ivrii , is a Soviet , Canadian mathematician who specializes in analysis , microlocal analysis , spectral theory and partial differential equations . He is a professor at the University of Toronto Department of Mathematics .International Congress of Mathematicians , Helsinki—1978 and Berkeley—1986.Education and Degrees He graduated from :ru:Физико-математическая школа им. М. А. Лаврентьева при НГУ|Physical Mathematical School at Novosibirsk State University in 1965, received his University Diploma in 1970 and PhD in 1973 in Novosibirsk State University . He defended his Doktor nauk thesis in St. Petersburg Department of Steklov Institute of Mathematics of Russian Academy of Sciences in 1982.Scientific Contributions Weakly hyperbolic equations His first main works were devoted to the well-posedness of the Cauchy problem for weakly hyperbolic equations. In particular he discovered a necessary condition for Cauchy problem to be well-posed no matter what the lower terms in the equation are.Propagation of singularities In a series of papers he explored propagation of singularities of symmetric hyperbolic systems inside of the domain and near the boundary. He was invited to give a talk at ICM—1978, Helsinki but was not granted an exit visa by the Soviet authorities; however his talk was published in the Proceedings of the Congress.His work in propagation of singularities logically guided him to the theory of asymptotic distribution of eigenvalues. V. Ivrii's debut in this field was a proof of Weyl conjecture . Then he developed a rescaling technique which allowed to consider domains and operators with singularities. He again was invited give a talk at ICM—1986, Berkeley but again was not granted an exit visa by the Soviet authorities. His talk was read by Lars Hörmander and published in the Proceedings of the Congress.research monographs , and, all published by Springer-Verlag.The methods developed by V. Ivrii were very useful for the rigorous justification of Thomas-Fermi theory . Together with Israel Michael Sigal he justified the Scott correction term for molecules. Later V. Ivrii justified the Dirac and Schwinger correction terms.Institutions
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