Sergei Natanovich Bernstein - Biography

Sergei Natanovich Bernstein (Серге́й Ната́нович Бернште́йн, sometimes Romanized as ; March 5, 1880, Odessa – October 26, 1968, Moscow) was a Russian and Soviet mathematician known for contributions to partial differential equations, differential geometry, probability theory, and approximation theory.

Work

Partial differential equations

In his doctoral dissertation, submitted in 1904 to the Sorbonne, Bernstein solved Hilbert's nineteenth problem on the analytic solution of elliptic differential equations. His later work was devoted to Dirichlet's boundary problem for non-linear equations of elliptic type, where, in particular, he introduced a priori estimates.

Probability theory

In 1917, Bernstein suggested the first axiomatic foundation of probability theory, based on the underlying algebraic structure. It was later superseded by the measure-theoretic approach of Kolmogorov.

In the 1920-s, he introduced a method for proving limit theorems for sums of dependent random variables.

Approximation theory

Bernstein laid the foundations of constructive function theory, a field studying the connection between smoothness properties of a function and its approximations by polynomials. In particular, he proved Bernstein's theorem (approximation theory).

Other fields

Publications

• S. N. Bernstein, Collected Works (Russian):
  • vol. 1, The Constructive Theory of Functions (1905–1930), translated: Atomic Energy Commission, Springfield, Va, 1958
  • vol. 2, The Constructive Theory of Functions (1931–1953)
  • vol. 3, Differential equations, calculus of variations and geometry (1903–1947)
  • vol. 4, Theory of Probability. Mathematical statistics (1911–1946)
• S. N. Bernstein, The Theory of Probabilities (Russian), Moscow, Leningrad, 1946

See also

• A priori estimate
• Bernstein algebra
• Bernstein's inequality (mathematical analysis)
• Bernstein inequalities in probability theory
• Bernstein polynomial
• Bernstein's problem
• Bernstein's theorem (approximation theory)
• Bernstein's theorem on monotone functions
• Bernstein–von Mises theorem

Notes

External links

• History of Approximation Theory (HAT) page