Sergei K. Godunov

Sergei Konstantinovich Godunov

Sergei Godunov
Born (1929-07-17) July 17, 1929
Moscow, Russian SFSR, USSR
Nationality Russian
Fields Applied mathematics
Institutions Sobolev Institute of Mathematics, Novosibirsk, Russia
Alma mater Moscow State University
Doctoral advisor Ivan Petrovsky
Known for Godunov's theorem
Godunov's scheme
Notable awards State Lenin Prize (1959)

Sergei Konstantinovich Godunov (/ˈɡɒdənˌɔːf/;[1] Russian: Серге́й Константи́нович Годуно́в; born July 17, 1929) is professor at the Sobolev Institute of Mathematics of the Russian Academy of Sciences in Novosibirsk, Russia.

Professor Godunov's most influential work is in the area of applied and numerical mathematics. It has had a major impact on science and engineering, particularly in the development of methodologies used in Computational Fluid Dynamics (CFD) and other computational fields.

On 1–2 May 1997 a symposium entitled: Godunov-type numerical methods, was held at the University of Michigan to honour Godunov. These methods are widely used to compute continuum processes dominated by wave propagation. On the following day, 3 May, Godunov received an honorary degree from the University of Michigan.

Godunov's theorem (Godunov, 1959) (also known as Godunov's order barrier theorem) : Linear numerical schemes for solving partial differential equations, having the property of not generating new extrema (a monotone scheme), can be at most first-order accurate.

Godunov's scheme is a conservative numerical scheme for solving partial differential equations. In this method, the conservative variables are considered as piecewise constant over the mesh cells at each time step and the time evolution is determined by the exact solution of the Riemann (shock tube) problem at the inter-cell boundaries (Hirsch, 1990).

Education

Awards

See also

Notes

References

External links

This article is issued from Wikipedia - version of the Tuesday, March 22, 2016. The text is available under the Creative Commons Attribution/Share Alike but additional terms may apply for the media files.