Russian Journal of Physical Chemistry A.
Vol. 84.
2010.
P. 1053-1058
On the convergence rate of an iterative method for the linearized navier-stokes equations
A considerably simpler and much more efficient method for Fréchet derivative inversion has been reported. Specifically, the Fréchet derivative is inverted by the method of successive approximations, which preserves the high convergence rate of the series from converges in the class of strong solutions at the rate of a geometric progression with a common ratio arbitrarily close to zero. The efficiency of the implementation of Newton's method as applied to nonlinear problem is determined primarily by the efficiency of the numerical method used to solve problem.
Authors
Journal
Number of issue
3
Language
English
Pages
462-464
Status
Published
Link
Volume
81
Year
2010
Organizations
- 1 Peoples' Friendship University of Russia, ul. Miklukho-Maklaya 6, Moscow, 117198, Russian Federation
Keywords
Common ratio; Convergence rates; Efficient method; Geometric progressions; Linearized navier-stokes equations; Newton's methods; Nonlinear problems; Strong solution; Successive approximations; Linearization; Newton-Raphson method; Navier Stokes equations
Date of creation
19.10.2018
Date of change
19.10.2018
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Russian Journal of Physical Chemistry B.
Vol. 4.
2010.
P. 408-412