Your search keyword '"Levykin, A. I."' showing total 4 results

1. Stochastic simulation method for a 2D elasticity problem with random loads

Author

Sabelfeld, Karl, Shalimova, Irina, and Levykin, Alexander I.

Subjects

65C05, Transverse and Longitudinal Correlations, Random Walk on Fixed Spheres, Isotropic Random Fields, Poisson integral formula, 65Z05, Lamé equation, Spectral Tensor, 65C20, Successive Over RelaxationMethod, Successive Over Relaxation Method

Abstract

We develop a stochastic simulation method for a numerical solution of the Lamé equation with random loads. To treat the general case of large intensity of random loads, we use the Random Walk on Fixed Spheres (RWFS) method described in our paper citesab-lev-shal-2006. The vector random field of loads which stands in the right-hand-side of the system of elasticity equations is simulated by the Randomization Spectral method presented in citesab-1991 and recently revised and generalized in citekurb-sab-2006. Comparative analysis of RWFS method and an alternative direct evaluation of the correlation tensor of the solution is made. We derive also a closed boundary value problem for the correlation tensor of the solution which is applicable in the case of inhomogeneous random loads. Calculations of the longitudinal and transverse correlations are presented for a domain which is a union of two arbitrarily overlapped discs. We also discuss a possibility to solve an inverse problem of determination of the elastic constants from the known longitudinal and transverse correlations of the loads.

Published

2007

2. Random walk on fixed spheres method for electro- and elastostatics problems

Author

Sabelfeld, Karl, Levykin, Alexander I., and Shalimova, Irina

Subjects

Lame equation, 65C05, Random Walk methods, systems of spherical integral equations, 65Z05, 65F10, stochastic iterative pprocedures

Abstract

Stochastic algorithms for solving Dirichlet boundary value problems for the Laplace and Lame equations governing 2D elasticity problems are developed. The approach presented is based on the Poisson integral formula written for each disc of a domain consisting of a family of overlapping discs. The original differential boundary value problem is reformulated in the form of equivalent system of integral equations defined on the intersection surfaces, i.e., arcs in 2D. A Random Walk algorithm can be applied then directly to the obtained system of integral equations where the random walks are living on the intersecting surfaces. We develop also a discrete random walk technique for solving the system of linear equations approximating the system of integral equations. We construct a randomized version of the successive over relaxation (SOR) method. In [6] we have demonstrated that in the case of classical potential theory our method considerably improves the convergence rate of the standard Random Walk on Spheres method. In this paper we extend the algorithm to the system of Lame equations which cannot be solved by the conventional Random Walk on Spheres method. Illustrating computations for 2D Laplace and Lame equations, and comparative analysis of different stochastic algorithms are presented.

Published

2005

3. Discrete random walk on large spherical grids generated by spherical means for PDEs

Author

Sabelfeld, Karl, Shalimova, Irina, and Levykin, Alexander I.

Subjects

65C05, 76F99

Abstract

A new general stochastic-deterministic approach for a numerical solution of boundary value problems of potential and elasticity theories is suggested. It is based on the use of the Poisson-like integral formulae for overlapping spheres. An equivalent system of integral equations is derived and then approximated by a system of linear algebraic equations. We develop two classes of special Monte Carlo iterative methods for solving these systems of equations which are a kind of stochastic versions of the Chebyshev iteration method and successive overrelaxation method (SOR). In the case of classical potential theory this approach accelerates the convergence of the well known Random Walk on Spheres method (RWS). What is however much more important, this approach suggests a first construction of a fast convergent finite-variance Monte Carlo method for the system of Lamé equations.

Published

2004

4. Kinetics of formation of aerosols during photolysis of tungsten hexacarbonyl under decreased pressure

Author

Sergei Dubtsov, Dul Tsev, E. N., Ankilov, A. N., Levykin, A. I., and Sabel Fel D, K. K.