Vyacheslav Stepanov
Vyacheslav Vassilievich Stepanov was a Russian mathematician, specializing in analysis.
Stepanov was the son of teachers and from 1908 to 1912 studied mathematics at the Faculty of Mechanics and Mathematics of Moscow State University, where in 1912 he received his Candidate of Sciences degree with Dmitri Egorov as thesis supervisor. Stepanov was also strongly influenced by Nikolai Lusin. In 1912 he undertook further study at the University of Göttingen where he attended lectures by Edmund Landau and David Hilbert. In 1915 he returned to Moscow and became a docent at Moscow State University, where he worked closely with Egorov until 1929 when Egorov was dismissed from his position as director of the Institute of Mechanics and Mathematics. In 1928 Stepanov became a professor at Moscow State University and then in 1939 also the Director of the Institute of Mechanics and Mathematics, where he continued until his death in 1950.
In two publications Stepanov gave necessary and sufficient conditions for a function of two variables, defined on a set S of measure greater than zero, to have a total differential almost everywhere on S. He also worked on dynamical systems, the qualitative theory of ordinary differential equations, and almost periodic functions. In the qualitative theory of ordinary differential equations Stepanov wrote a well-known textbook with his student Viktor Nemytskii. Stepanov played an important role in the Moscow Mathematical Society and was the founder of a Russian school in the qualitative theory of differential equations and dynamical systems theory.
In addition to Nemytskii, his doctoral students include Alexander Gelfond.
In 1946 Stepanov became a member of the Soviet Academy of Sciences.Works
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