Vladimir Boltyansky
Vladimir Grigoryevich Boltjanski (Russian: Владимир Григорьевич Болтянский, scientific transliteration Vladimir Grigor'evič Boltjanskij; born April 26, 1925 in Moscow ) is a Russian mathematician who deals with dynamic optimization and geometry.
Boltjanski studied from 1943 to 1948 at the Lomonosov University in Moscow Mathematics ( interrupted by military service in World War II ) and was in 1951 at the Mathematical Institute of the Soviet Academy of Sciences. In 1955, he was there at Lew Pontryagin PhD (Russian doctor here corresponds to the habilitation ). From 1959 he was a professor. Later he was a professor at the Institute for Systems Research of the Academy of Sciences of the USSR. In the 1990s he taught at the Mathematical Research CIMAT in Guanajuato in Mexico.
Boltjanski is known for his work on dynamic optimization and control theory ( continuous and discrete processes ). He proved the fact, inter alia, Pontrjaginsche the maximum principle for nonlinear processes. He also worked on convex geometry and the third Hilbert problem (originally released by Max Dehn ).
He is a corresponding member of the Russian Academy of Education. For his work on dynamic optimization, he received the Lenin Prize with Gamkrelidze, Mischenko and Pontryagin. In 1967 he received the Prize of the Uzbek SSR for his work on ordered rings.
Writings
- Descriptive VA Efremovich combinatorial topology, Vieweg 1986 ( engl. Intuitive Combinatorial Topology, Springer, 2001; Russian original 1982)
- Optimal Control of Discrete Systems ", Leipzig, Geest and Portig 1976
- Mathematical methods of optimal control, Fachbuchverlag, Leipzig, 198, 2nd Edition Hanser Verlag 1972
- With Gochberg sets and problems in combinatorial geometry, German Academic Publishers, Berlin 1972
- With Lev Pontryagin, Gamkrelidze, Mathematical theory of optimal processes Mischenko, Oldenbourg, Munich, 1967
- With Isaac Jaglom Convex figures, Berlin, German Academic Publishers, 1956
- H. Martini, V. Soltan Geometric methods and optimization problems, Kluwer 1999
- Hilbert's Third Problem, Washington DC, Winston, 1978
- Third, Hilbert problem in Pavel Alexandrov (Editor) The Hilbert problems, Ostwald's classic, Harri German publishing house, 1998
- Equivalent and equidecomposable figures, Boston, Heath, 1963