Your search keyword '"Bialecki, B."' showing total 13 results

1. A Legendre spectral quadrature Galerkin method for the Cauchy-Navier equations of elasticity with variable coefficients

Author

Bialecki, B., Karageorghis, Andreas, and Karageorghis, Andreas [0000-0002-8399-6880]

Subjects

Preconditioner, Applied Mathematics, Numerical analysis, Mathematical analysis, Spectral element method, Mathematics::Analysis of PDEs, 010103 numerical & computational mathematics, Matrix decomposition algorithm, Computer Science::Numerical Analysis, 01 natural sciences, 010101 applied mathematics, Spectral methods, Cauchy-Navier equations, Preconditioned conjugate gradient method, Conjugate gradient method, Legendre polynomials, Conjugate residual method, 0101 mathematics, Galerkin method, Spectral method, Mathematics

Abstract

We solve the Dirichlet and mixed Dirichlet-Neumann boundary value problems for the variable coefficient Cauchy-Navier equations of elasticity in a square using a Legendre spectral Galerkin method. The resulting linear system is solved by the preconditioned conjugate gradient (PCG) method with a preconditioner which is shown to be spectrally equivalent to the matrix of the resulting linear system. Numerical tests demonstrating the convergence properties of the scheme and PCG are presented. © 2017 Springer Science+Business Media New York 1 26 Article in Press

Published

2017

2. Finite Difference Schemes for the Cauchy–Navier Equations of Elasticity with Variable Coefficients

Author

Bialecki, B., Karageorghis, Andreas, and Karageorghis, Andreas [0000-0002-8399-6880]

Subjects

Linear systems, Convergence properties, Conjugate gradient method, Matrix algebra, Theoretical Computer Science, Matrix decomposition, symbols.namesake, Matrix (mathematics), Preconditioned conjugate gradient method, Cauchy–Navier equations, Boundary value problem, Fast Fourier transforms, Mathematics, Numerical Analysis, Boundary conditions, Dirichlet boundary condition, Neumann boundary condition, Preconditioner, Applied Mathematics, Mathematical analysis, Linear system, General Engineering, Finite difference, Matrix decomposition algorithm, Finite difference scheme, Finite difference method, Computer Science::Numerical Analysis, Elasticity, Computational Mathematics, Computational Theory and Mathematics, Navier equations, symbols, Mathematical transformations, Dirichlet-neumann boundary condition, Laplace operator, Software

Abstract

We solve the variable coefficient Cauchy–Navier equations of elasticity in the unit square, for Dirichlet and Dirichlet-Neumann boundary conditions, using second order finite difference schemes. The resulting linear systems are solved by the preconditioned conjugate gradient (PCG) method with preconditioners corresponding to to the Laplace operator. The multiplication of a vector by the matrices of the resulting systems and the solution of systems with the preconditioners are performed at optimal and nearly optimal costs, respectively. For the case of Dirichlet boundary conditions, we prove the second order accuracy of the scheme in the discrete (Formula presented.) norm, symmetry of the resulting matrix and its spectral equivalence to the preconditioner. For the case of Dirichlet–Neumann boundary conditions, we prove symmetry of the resulting matrix. Numerical tests demonstrating the convergence properties of the schemes and PCG are presented. © 2014, Springer Science+Business Media New York. 62 1 78 121

Published

2014

3. Matrix decomposition algorithms for elliptic boundary value problems: a survey

Author

Bialecki, B., Fairweather, G., Karageorghis, Andreas, and Karageorghis, Andreas [0000-0002-8399-6880]

Subjects

Dirichlet problem, Tridiagonal matrix, Applied Mathematics, Mathematical analysis, Block matrix, Elliptic boundary value problems, Unit square, Finite element method, Biharmonic equation, Spectral methods, Finite element Galerkin methods, Poisson's equation, Spline collocation methods, Finite difference methods, Matrix decomposition algorithms, Applied mathematics, Method of fundamental solutions, Boundary value problem, Spectral method, Fast Fourier transforms, Mathematics

Abstract

We provide an overview of matrix decomposition algorithms (MDAs) for the solution of systems of linear equations arising when various discretization techniques are applied in the numerical solution of certain separable elliptic boundary value problems in the unit square. An MDA is a direct method which reduces the algebraic problem to one of solving a set of independent one-dimensional problems which are generally banded, block tridiagonal, or almost block diagonal. Often, fast Fourier transforms (FFTs) can be employed in an MDA with a resulting computational cost of O(N 2 logN) on an N?×?N uniform partition of the unit square. To formulate MDAs, we require knowledge of the eigenvalues and eigenvectors of matrices arising in corresponding two---point boundary value problems in one space dimension. In many important cases, these eigensystems are known explicitly, while in others, they must be computed. The first MDAs were formulated almost fifty years ago, for finite difference methods. Herein, we discuss more recent developments in the formulation and application of MDAs in spline collocation, finite element Galerkin and spectral methods, and the method of fundamental solutions. For ease of exposition, we focus primarily on the Dirichlet problem for Poisson's equation in the unit square, sketch extensions to other boundary conditions and to more involved elliptic problems, including the biharmonic Dirichlet problem, and report extensions to three dimensional problems in a cube. MDAs have also been used extensively as preconditioners in iterative methods for solving linear systems arising from discretizations of non-separable boundary value problems.

Published

2010

4. Spectral Chebyshev Collocation for the Poisson and Biharmonic Equations

Author

Bialecki, B., Karageorghis, Andreas, and Karageorghis, Andreas [0000-0002-8399-6880]

Subjects

Dirichlet problem, Biconjugate gradient method, Chebyshev polynomials, Collocation, Applied Mathematics, Mathematical analysis, Spectral collocation, Mathematics::Numerical Analysis, Computational Mathematics, Poisson and biharmonic equations, Collocation method, Biharmonic equation, Schur complement, Orthogonal collocation, Mathematics

Abstract

This paper is concerned with the spectral Chebyshev collocation solution of the Dirichlet problems for the Poisson and biharmonic equations in a square. The collocation schemes are solved at a cost of 2N3 + O(N2 logN) operations using an appropriate set of basis functions, a matrix diagonalization algorithm, and fast Fourier transforms. For the biharmonic problem, the resulting Schur complement system is solved by a preconditioned biconjugate gradient method. An application of the Poisson spectral preconditioner is discussed for the solution of a variable coefficient spectral problem. Numerical results confirm the efficiency of the proposed algorithms and the spectral and polynomial accuracy of the collocation schemes for smooth and singular solutions, respectively. © 2010 Society for Industrial and Applied Mathematics. 32 5 2995 3019 Cited By :1

Published

2010

5. A Legendre Spectral Galerkin Method for the Biharmonic Dirichlet Problem

Author

Bialecki, B., Karageorghis, Andreas, and Karageorghis, Andreas [0000-0002-8399-6880]

Subjects

Schur complement matrix, Dirichlet problem, Applied Mathematics, Spectral element method, Mathematical analysis, Linear systems, Polynomials, Mathematical techniques, Galerkin methods, Spectral Galerkin method, Gradient methods, Computational Mathematics, Associated Legendre polynomials, Preconditioned conjugate gradient method, Conjugate gradient method, Schur complement method, Convergence of numerical methods, Schur complement, Biharmonic equation, Biharmonic Dirichlet problem, Cholesky method, Legendre polynomials, Algorithms, Mathematics

Abstract

A Legendre spectral Galerkin method is presented for the solution of the biharmonic Dirichlet problem on a square. The solution and its Laplacian are approximated using the set of basis functions suggested by Shen, which are linear combinations of two Legendre polynomials. A Schur complement approach is used to reduce the resulting linear system to one involving the approximation of the Laplacian of the solution on the two vertical sides of the square. The Schur complement system is solved by a preconditioned conjugate gradient method or the Cholesky method. The total cost of the algorithm is O(N3). Numerical results demonstrate the spectral convergence of the method. 22 5 1549 1569

Published

2001

6. Modified nodal cubic spline collocation for three-dimensional variable coefficient second order partial differential equations

Author

Bialecki, B., Karageorghis, Andreas, and Karageorghis, Andreas [0000-0002-8399-6880]

Subjects

Partial differential equation, Applied Mathematics, Numerical analysis, Mathematical analysis, First-order partial differential equation, Matrix decomposition algorithm, symbols.namesake, Nodal spline collocation, Biconjugate gradient stabilized method, Unit cube, Dirichlet boundary condition, Collocation method, symbols, Orthogonal collocation, Mathematics, Fast Fourier transforms

Abstract

We formulate a fourth order modified nodal cubic spline collocation scheme for variable coefficient second order partial differential equations in the unit cube subject to nonzero Dirichlet boundary conditions. The approximate solution satisfies a perturbed partial differential equation at the interior nodes of a uniform N × N × N partition of the cube and the partial differential equation at the boundary nodes. In the special case of Poisson's equation, the resulting linear system is solved by a matrix decomposition algorithm with fast Fourier transforms at a cost O(N3log N. For the general variable coefficient diffusion-dominated case, the system is solved using the preconditioned biconjugate gradient stabilized method. © 2012 Springer Science+Business Media New York. 64 2 349 383

Published

2013

7. Optimal superconvergent one step quadratic spline collocation methods

Author

Bialecki, B., Fairweather, G., Karageorghis, Andreas, Nguyen, Q. N., and Karageorghis, Andreas [0000-0002-8399-6880]

Subjects

Optimal global convergence rates, Collocation, Quadratic spline collocation, Computer Networks and Communications, Applied Mathematics, Numerical analysis, Mathematical analysis, Elliptic boundary value problems, Superconvergence, Unit square, Computer Science::Numerical Analysis, Matrix decomposition, Mathematics::Numerical Analysis, Computational Mathematics, Computer Science::Computational Engineering, Finance, and Science, Collocation method, Matrix decomposition algorithms, Orthogonal collocation, Boundary value problem, Fast fourier transforms, Software, Mathematics

Abstract

We formulate new optimal quadratic spline collocation methods for the solution of various elliptic boundary value problems in the unit square. These methods are constructed so that the collocation equations can be solved using a matrix decomposition algorithm. The results of numerical experiments exhibit the expected optimal global accuracy as well as superconvergence phenomena. © Springer 2008. 48 3 449 472 Cited By :4

Published

2008

8. Spectral Chebyshev-Fourier collocation for the Helmholtz and variable coefficient equations in a disk

Author

Bialecki, B., Karageorghis, Andreas, and Karageorghis, Andreas [0000-0002-8399-6880]

Subjects

Numerical Analysis, Chebyshev polynomials, Collocation, Physics and Astronomy (miscellaneous), Helmholtz equation, Applied Mathematics, Mathematical analysis, Spectral collocation, Mathematics::Numerical Analysis, Computer Science Applications, Computational Mathematics, symbols.namesake, Fourier transform, Modeling and Simulation, Collocation method, symbols, Neumann boundary condition, Orthogonal collocation, Spectral method, Mathematics

Abstract

The paper is concerned with the spectral collocation solution of the Helmholtz equation in a disk in the polar coordinates r and θ. We use spectral Chebyshev collocation in r, spectral Fourier collocation in θ, and a simple integral condition to specify the value of the approximate solution at the center of the disk. The scheme is solved at a quasi optimal cost using the idea of superposition, a matrix decomposition algorithm, and fast Fourier transforms. Both the Dirichlet and Neumann boundary conditions are considered and extensions to equations with variable coefficients are discussed. Numerical results confirm the spectral convergence of the method. © 2008 Elsevier Inc. All rights reserved. 227 19 8588 8603 Cited By :15

Published

2008

9. A nonoverlapping domain decomposition method for Legendre spectral collocation problems

Author

Bialecki, B., Karageorghis, Andreas, and Karageorghis, Andreas [0000-0002-8399-6880]

Subjects

Preconditioned conjugate gradient methods, Dirichlet problems, Tensors, Poisson equation, Polynomials, Domain decomposition methods, Theoretical Computer Science, Gradient methods, Preconditioned conjugate gradient method, Collocation method, Conjugate gradient method, Orthogonal collocation, Boundary value problem, Legendre spectral collocation, Legendre spectral collocation problems, Legendre polynomials, Mathematics, Dirichlet problem, Numerical Analysis, Problem solving, Collocation, Applied Mathematics, Mathematical analysis, General Engineering, Approximation theory, Computer Science::Numerical Analysis, Spectrum analysis, Computational Mathematics, Poisson's equation, Computational Theory and Mathematics, Nonoverlapping domain decomposition, Software

Abstract

We consider the Dirichlet boundary value problem for Poisson's equation in an L-shaped region or a rectangle with a cross-point. In both cases, we approximate the Dirichlet problem using Legendre spectral collocation, that is, polynomial collocation at the Legendre-Gauss nodes. The L-shaped region is partitioned into three nonoverlapping rectangular subregions with two interfaces and the rectangle with the cross-point is partitioned into four rectangular subregions with four interfaces. In each rectangular subregion, the approximate solution is a polynomial tensor product that satisfies Poisson's equation at the collocation points. The approximate solution is continuous on the entire domain and its normal derivatives are continuous at the collocation points on the interfaces, but continuity of the normal derivatives across the interfaces is not guaranteed. At the cross point, we require continuity of the normal derivative in the vertical direction. The solution of the collocation problem is first reduced to finding the approximate solution on the interfaces. The discrete Steklov-Poincaré operator corresponding to the interfaces is self-adjoint and positive definite with respect to the discrete inner product associated with the collocation points on the interfaces. The approximate solution on the interfaces is computed using the preconditioned conjugate gradient method. A preconditioner is obtained from the discrete Steklov-Poincaré operators corresponding to pairs of the adjacent rectangular subregions. Once the solution of the discrete Steklov- Poincaré equation is obtained, the collocation solution in each rectangular subregion is computed using a matrix decomposition method. The total cost of the algorithm is O(N 3), where the number of unknowns is proportional to N 2. © 2007 Springer Science+Business Media, LLC. 32 2 373 409 Cited By :5

Published

2007

10. Optimal superconvergent one step nodal cubic spline collocation methods

Author

Bialecki, B., Fairweather, G., Karageorghis, Andreas, and Karageorghis, Andreas [0000-0002-8399-6880]

Subjects

Mathematical optimization, Problem solving, Partial differential equation, Optimal convergence rates, Applied Mathematics, Numerical analysis, Fast Fourier transform, Elliptic boundary value problems, Superconvergence, Unit square, Matrix algebra, Matrix decomposition, Boundary value problems, Computational Mathematics, Nodal spline collocation, Collocation method, Direct methods, Convergence of numerical methods, Applied mathematics, Fast fourier transforms, Algorithms, Mathematics

Abstract

We formulate new optimal (fourth) order one step nodal cubic spline collocation methods for the solution of various elliptic boundary value problems in the unit square. These methods are constructed so that the respective collocation equations can be solved using matrix decomposition algorithms (MDAs). MDAs are fast, direct methods which employ fast Fourier transforms and require O(N 2 log N) operations on an N × N uniform partition of the unit square. The results of numerical experiments exhibit expected global optimal orders of convergence as well as desired superconvergence phenomena. © 2005 Society for Industrial and Applied Mathematics. 27 2 575 598 Cited By :7

Published

2006

11. Legendre Gauss spectral collocation for the Helmholtz equation on a rectangle

Author

Bialecki, B., Karageorghis, Andreas, and Karageorghis, Andreas [0000-0002-8399-6880]

Subjects

spectral collocation, Collocation, Helmholtz equation, Applied Mathematics, Mathematical analysis, error bound, Robin boundary condition, matrix decomposition, Mathematics::Numerical Analysis, symbols.namesake, Collocation method, Dirichlet boundary condition, boundary conditions, symbols, Legendre Gauss points, Orthogonal collocation, eigenvalue problem, Boundary value problem, Legendre polynomials, Mathematics

Abstract

A spectral collocation method with collocation at the Legendre Gauss points is discussed for solving the Helmholtz equation -Δu+κ(x,y)u=f(x,y) on a rectangle with the solution u subject to inhomogeneous Robin boundary conditions. The convergence analysis of the method is given in the case of u satisfying Dirichlet boundary conditions. A matrix decomposition algorithm is developed for the solution of the collocation problem in the case the coefficient κ(x,y) is a constant. This algorithm is then used in conjunction with the preconditioned conjugate gradient method for the solution of the spectral collocation problem with the variable coefficient κ(x,y). 36 3 203 227 Cited By :7

Published

2004

12. Matrix decomposition algorithms for modified spline collocation for Helmholtz problems

Author

Bialecki, B., Fairweather, G., Karageorghis, Andreas, and Karageorghis, Andreas [0000-0002-8399-6880]

Subjects

Helmholtz problems, Helmholtz equation, Spline collocation, Superconvergences, Convergence rates, Unit square, Matrix algebra, Polynomials, Superconvergence, Matrix decomposition, Boundary value problems, Modified spline collocation, Collocation method, Convergence of numerical methods, Orthogonal collocation, Boundary value problem, Mathematics, Fast Fourier transforms, Dirichlet problem, Boundary conditions, Tensor products, Applied Mathematics, Mathematical analysis, Approximation theory, Fourier transforms, Computational Mathematics, Tensor product, Piecewise linear techniques, Matrix decomposition algorithms, Algorithms

Abstract

We consider the solution of various boundary value problems for the Helmholtz equation in the unit square using a nodal cubic spline collocation method and modifications of it which produce optimal (fourth-) order approximations. For the solution of the collocation equations, we formulate matrix decomposition algorithms, fast direct methods which employ fast Fourier transforms and require O(N2 log N) operations on an N × N uniform partition of the unit square. A computational study confirms the published analysis for the Dirichlet problem and indicates that similar results hold for Neumann, mixed, and periodic boundary conditions. The numerical results also exhibit superconvergence phenomena not reported in earlier studies. 24 5 1733 1753 Cited By :9

Published

2003

13. A legendre spectral collocation method for the biharmonic Dirichlet problem

Author

Bialecki, B., Karageorghis, Andreas, and Karageorghis, Andreas [0000-0002-8399-6880]

Subjects

Preconditioned conjugate gradient method, Schur complement, Biharmonic Dirichlet problem, Spectral collocation

Abstract

A Legendre spectral collocation method is presented for the solution of the biharmonic Dirichlet problem on a square. The solution and its Laplacian are approximated using the set of basis functions suggested by Shen, which are linear combinations of Legendre polynomials. A Schur complement approach is used to reduce the resulting linear system to one involving the approximation of the Laplacian of the solution on the two vertical sides of the square. The Schur complement system is solved by a preconditioned conjugate gradient method. The total cost of the algorithm is O(N3). Numerical results demonstrate the spectral convergence of the method. 34 3 637 662 Cited By :10

Published

2000