Victor Lomonosov (7 February 1946 – 29 March 2018) was a Russian-American mathematician known for his work in functional analysis. In operator theory, he is best known for his work in 1973 on the invariant subspace problem, which was described by Walter Rudin in his classical book on Functional Analysis as "Lomonosov's spectacular invariant subspace theorem".[1] The Theorem Lomonosov gives a very short proof, using the Schauder fixed point theorem, that if the bounded linear operator T on a Banach space commutes with a non-zero compact operator then T has a non-trivial invariant subspace.[2] Lomonosov has also published on the Bishop–Phelps theorem[3] and Burnside's Theorem [4]
Lomonosov received his master's degree from the Moscow State University in 1969 and his Ph.D. from National University of Kharkiv in 1974 (adviser Vladimir Matsaev). He was appointed at the rank of Associate Professor at Kent State University in the fall of 1991, becoming Professor at the same university in 1999.
References
- ↑ Rudin, Walter (1991) [1973]. Functional Analysis (2nd ed.). New York: McGraw-Hill. ISBN 0-07-100944-2.
- ↑ Lomonosov, V. I. (1973). "Invariant subspaces of the family of operators that commute with a completely continuous operator". Akademija Nauk SSSR. Funkcional' Nyi Analiz I Ego Prilozenija. 7 (3): 55–56. doi:10.1007/BF01080698. MR 0420305. S2CID 121421267.
- ↑ Lomonosov, Victor (2000). "A counterexample to the Bishop-Phelps theorem in complex spaces". Israel Journal of Mathematics. 115: 25–28. doi:10.1007/bf02810578. S2CID 53646715.
- ↑ Lomonosov, Victor (1991). "An extension of Burnside's theorem to infinite-dimensional spaces". Israel Journal of Mathematics. 75 (2–3): 329–339. doi:10.1007/bf02776031. S2CID 120120695.