Your search keyword '"nonlinear poisson equation"' showing total 23 results

1. EXPLICIT AND EXACT SOLUTIONS FOR THE NONLINEAR POISSON EQUATION

Author

Yuan-Xi Xie

Subjects

Applied mathematics, Mathematics, Nonlinear poisson equation

Published

2021

2. Construction of an iterative method for solving a nonlinear elliptic equation based on a mixed finite element method

Author

Dossan Baigereyev, D.A. Omariyeva, and Nurlan Temirbekov

Subjects

a priori estimate, iterative method, Electronic computers. Computer science, TJ1-1570, nonlinear poisson equation, Mechanical engineering and machinery, QA75.5-76.95, mixed finite element method, brezzi-douglas-marini elements

Abstract

This article is devoted to the construction and study of the finite element method for solving a two-dimensional nonlinear equation of elliptic type. Equations of this type arise in solving many applied problems, including problems of the theory of multiphase filtering, the theory of semiconductor devices, and many others. The relevance of the study of this problem is associated with the need to develop effective parallel methods for solving this problem. To discretize the equation, a mixed finite element method with Brezzi-Douglas-Marini elements is used. The issue of the convergence of the finite element method is investigated. To linearize the equation, the Picard iterative method is constructed. Two classes of basis functions of finite elements are used in the paper. A comparative analysis of the effectiveness of several direct and iterative methods for solving the resulting system of linear algebraic equations is carried out, including the method based on the Bunch-Kaufman LDLt factorization, the method of minimal residuals, the symmetric LQ method, the stabilized biconjugate gradient method, and a number of other iterative Krylov subspace algorithms with preconditioners based on incomplete LU decomposition. The method has been tested on several model problems by comparing an approximate solution with a known exact solution. The results of the analysis of the method error in various norms depending on the diameter of the mesh are presented.

Published

2020

3. SINGLE-RANK QUASI-NEWTON METHODS FOR THE SOLUTION OF NONLINEAR SEMICONDUCTOR EQUATIONS

Author

Aboud, Fatima, Nachaoui, Abdeljalil, Laboratoire de Mathématiques Jean Leray (LMJL), Centre National de la Recherche Scientifique (CNRS)-Université de Nantes - UFR des Sciences et des Techniques (UN UFR ST), Université de Nantes (UN)-Université de Nantes (UN), and Fération de Recherche Mathématiques des Pays de Loire-FR CNRS 2962

Subjects

quasi-Newton methods, preconditioner, EN-method, nite difference method, CG-like methods, GMRES, numerical experiments, nonlinear Poisson equation, Semiconductor device, [MATH.MATH-NA]Mathematics [math]/Numerical Analysis [math.NA]

Abstract

International audience; This paper presents some of the author's experimental results in applying a family of iterative methods,the family of EN-like methods Eirola & Nevanlinna (1989), to equations obtained from the discretization of the nonlinear two dimensional Poisson equation occurring in semiconductor device modelling. It is shown that these iterative methods are efficient both in computation times and in storage requirements in comparison with other known methods.

Published

2020

4. A fast ADI algorithm for nonlinear Poisson equation in heterogeneous dielectric media

Author

Wufeng Tian

Subjects

Physics, Physics::Biological Physics, Quantitative Biology::Biomolecules, Applied Mathematics, Mathematical analysis, Solvation, FOS: Physical sciences, Numerical Analysis (math.NA), Dielectric, Computational Physics (physics.comp-ph), Theoretical Computer Science, Nonlinear poisson equation, Computational Mathematics, Nonlinear system, Alternating direction implicit method, Computational Theory and Mathematics, FOS: Mathematics, Mathematics - Numerical Analysis, Physics::Chemical Physics, Physics - Computational Physics

Abstract

Recently, a nonlinear Poisson equation has been introduced to model nonlinear and nonlocal hyperpolarization effects in electrostatic solute-solvent interaction for biomolecular solvation analysis. Due to a strong nonlinearity associated with the heterogeneous dielectric media, this Poisson model is difficult to solve numerically, particularly for large protein systems. A new pseudo-transient continuation approach is proposed in this paper to efficiently and stably solve the nonlinear Poisson equation. A Douglas type alternating direction implicit (ADI) method is developed for solving the pseudo-time dependent Poisson equation. Different approximations to the dielectric profile in heterogeneous media are considered in the standard finite difference discretization. The proposed ADI scheme is validated by considering benchmark examples with exact solutions and by solvation analysis of real biomolecules with various sizes. Numerical results are in good agreement with the theoretical prediction, experimental measurements, and those obtained from the boundary value problem approach. Since the time stability of the proposed ADI scheme can be maintained even using very large time increments, it is efficient for electrostatic analysis involving hyperpolarization effects.

Published

2018

5. Liouville theorem for the nonlinear Poisson equation on manifolds

Author

Li Ma and Ingo Witt

Subjects

Applied Mathematics, 010102 general mathematics, Mathematical analysis, Derivative, Riemannian manifold, Type (model theory), 01 natural sciences, Nonlinear poisson equation, Uniqueness theorem for Poisson's equation, Bounded function, 0103 physical sciences, Mathematics::Differential Geometry, 010307 mathematical physics, 0101 mathematics, Poisson's equation, Analysis, Ricci curvature, Mathematical physics, Mathematics

Abstract

In this note, we study a Modica type gradient estimate for smooth solutions to general non-linear Poisson equation Δ u − f ( u ) = 0 , in M n , u : M n → R where ( M , g ) is a complete Riemannian manifold with bounded geometry and non-negative Ricci curvature and f is the derivative of the non-negative smooth function F ( u ) on R. Then we use this gradient estimate to conclude a Liouville theorem.

Published

2014

6. A new method to deduce high-order compact difference schemes for two-dimensional Poisson equation

Author

Yinnian He, Xinlong Feng, and Shuying Zhai

Subjects

Computational Mathematics, Finite volume method, Applied Mathematics, Mathematical analysis, Partition (number theory), Integral formula, Successive parabolic interpolation, Poisson's equation, High order compact, Nonlinear poisson equation, Mathematics

Abstract

This paper introduces a novel method for deducing high-order compact difference schemes for the two-dimensional (2D) Poisson equation. Like finite volume method, a dual partition is introduced. Combining Simpson integral formula and parabolic interpolation, a family of fourth-order and sixth-order compact difference schemes are obtained based on three different types of dual partitions. Moreover, several new fourth-order compact schemes are gained and numerical experiments are shown two of them are much better than almost any other fourth-order schemes which have been presented in others’ work. The outline for the nonlinear Poisson equation is also given. Numerical experiments are presented to verify the feasibility of this new method and the high accuracy of these fourth-order and sixth-order compact difference schemes.

Published

2014

7. On the numerical solution of the linear and nonlinear Poisson equations seen as bi-dimensional inverse moment problems

Author

María Beatriz Pintarelli and Fernando Vericat

Subjects

NONLINEAR POISSON EQUATION, Matemáticas, Applied Mathematics, Mathematical analysis, Relaxation (iterative method), Inverse, Hausdorff moment problem, Poisson distribution, GENERALIZED MOMENT PROBLEM, Nonlinear poisson equation, Matemática Pura, Moment (mathematics), symbols.namesake, Nonlinear system, symbols, HAUSDORFF MOMENT PROBLEM, Analysis, CIENCIAS NATURALES Y EXACTAS, Mathematics, FREDHOL INTEGRAL EQUATIONS

Abstract

The numerical solution of the bi-dimensional nonlinear Poisson equations under Cauchy boundary conditions is considered. Using Green identity we show that this problem is equivalent to solve a bi-dimensional Fredholm integral equation of the first kind which can in turn be handled as a bi-dimensional generalized inverse moment problem. In the particular linear case the Helmholtz PDE is recovered and, within our scheme, the problem reduces to a bi-dimensional Hausdorff moment problem. In all the cases we find approximated solutions for the associated finite moment problems and bounds for the corresponding errors. Fil: Pintarelli, María Beatriz. Universidad Nacional de La Plata. Facultad de Ciencias Exactas. Departamento de Matemáticas; Argentina Fil: Vericat, Fernando. Consejo Nacional de Investigaciones Científicas y Técnicas. Centro Científico Tecnológico Conicet - La Plata. Instituto de Física de Líquidos y Sistemas Biológicos. Universidad Nacional de La Plata. Facultad de Ciencias Exactas. Instituto de Física de Líquidos y Sistemas Biológicos; Argentina. Universidad Nacional de La Plata. Facultad de Ingeniería; Argentina

Published

2016

8. Some Remarks on Energy inequalities for harmonic maps with potential

Author

Volker Branding

Subjects

Mathematics - Differential Geometry, General Mathematics, FOS: Physical sciences, Monotonic function, Curvature, 01 natural sciences, Nonlinear poisson equation, Mathematics - Analysis of PDEs, 0103 physical sciences, FOS: Mathematics, Monotonicity formulas, 0101 mathematics, Mathematical Physics, Mathematics, Harmonic maps with potential, 010102 general mathematics, Mathematical analysis, Harmonic map, Mathematical Physics (math-ph), Differential Geometry (math.DG), Liouville theorems, Gradient estimates, 58E20, 53C43, 35J61, 010307 mathematical physics, Mathematics::Differential Geometry, Energy (signal processing), Analysis of PDEs (math.AP)

Abstract

In this note we discuss how several results characterizing the qualitative behavior of solutions to the nonlinear Poisson equation can be generalized to harmonic maps with potential between complete Riemannian manifolds. This includes gradient estimates, monotonicity formulas, and Liouville theorems under curvature and energy assumptions.

Published

2016

9. On the problem of deformed spherical systems in Modified Newtonian Dynamics

Author

Chung Ming Ko

Subjects

Physics, Cosmology and Nongalactic Astrophysics (astro-ph.CO), Dark matter, FOS: Physical sciences, Astronomy and Astrophysics, General Relativity and Quantum Cosmology (gr-qc), 01 natural sciences, Interpolation function, Galaxy, General Relativity and Quantum Cosmology, Modified Newtonian dynamics, Newtonian dynamics, Nonlinear poisson equation, Classical mechanics, Gravitational field, Space and Planetary Science, 0103 physical sciences, Physics::Space Physics, Newtonian fluid, 010306 general physics, 010303 astronomy & astrophysics, Astrophysics - Cosmology and Nongalactic Astrophysics

Abstract

Based on Newtonian dynamics, observations show that the luminous masses of astrophysical objects that are the size of a galaxy or larger are not enough to generate the measured motions which they supposedly determine. This is typically attributed to the existence of dark matter, which possesses mass but does not radiate (or absorb radiation). Alternatively, the mismatch can be explained if the underlying dynamics is not Newtonian. Within this conceptual scheme, Modified Newtonian Dynamics (MOND) is a successful theoretical paradigm. MOND is usually expressed in terms of a nonlinear Poisson equation, which is difficult to analyse for arbitrary matter distributions. We study the MONDian gravitational field generated by slightly non-spherically symmetric mass distributions based on the fact that both Newtonian and MONDian fields are conservative (which we refer to as the compatibility condition). As the non-relativistic version of MOND has two different formulations (AQUAL and QuMOND) and the compatibility condition can be expressed in two ways, there are four approaches to the problem in total. The method involves solving a suitably defined linear deformation potential, which generally depends on the choice of MOND interpolation function. However, for some specific form of the deformation potential, the solution is independent of the interpolation function., 30 pages, 2 figures

Published

2016

10. Composite Lane-Emden Equation as a Nonlinear Poisson Equation

Author

Mohammad Mohammadi and N. Riazi

Subjects

Physics, Nonlinear system, Nonlinear Sciences::Exactly Solvable and Integrable Systems, Classical mechanics, Physics and Astronomy (miscellaneous), Electromagnetism, General Mathematics, Composite number, Lane–Emden equation, Charged particle, Mathematical physics, Nonlinear poisson equation

Abstract

After a quick review of the Lane-Emden equation and its properties, a composite of two different polytropes is introduced and some of the consequences are explored. The results are used to build a nonlinear electromagnetism with non-singular, solitonic solutions as charged particles.

Published

2011

11. On the norm of the hyperinterpolation operator on the unit disc and its use for the solution of the nonlinear Poisson equation

Author

Kendall Atkinson, Olaf Hansen, and David Chien

Subjects

Computational Mathematics, symbols.namesake, Applied Mathematics, General Mathematics, Numerical analysis, Discrete Poisson equation, Mathematical analysis, symbols, Poisson's equation, Galerkin method, Nonlinear poisson equation, Mathematics

Abstract

In this article, we study the properties of the hyperinterpolation operator on the unit disc D in ℝ 2 . We show how hyperinterpolation can be used in connection with the Kumar―Sloan method to approximate the solution of a nonlinear Poisson equation on the unit disc (discrete Galerkin method). A bound for the norm of the hyperinterpolation operator in the space C(D) is derived. Our results prove the convergence of the discrete Galerkin method in the maximum norm if the solution of the Poisson equation is in the class C 1,δ (D), δ > 0. Finally, we present numerical examples which show that the discrete Galerkin method converges faster than O(n ―k ), for every k ∈ N if the solution of the nonlinear Poisson equation is in C°°(D).

Published

2008

12. A discontinuous Poisson-Boltzmann equation with interfacial jump: homogenisation and residual error estimate

Author

Klemens, Fellner and Victor A, Kovtunenko

Subjects

homogenisation, 35B27, Original Articles, Electro-kinetic, interfacial jump, 35J60, oscillating coefficients, steady-state Poisson–Nernst–Planck system, Boltzmann statistics, 78A57, Robin condition, 82B24, nonlinear Poisson equation, error corrector

Abstract

A nonlinear Poisson–Boltzmann equation with inhomogeneous Robin type boundary conditions at the interface between two materials is investigated. The model describes the electrostatic potential generated by a vector of ion concentrations in a periodic multiphase medium with dilute solid particles. The key issue stems from interfacial jumps, which necessitate discontinuous solutions to the problem. Based on variational techniques, we derive the homogenisation of the discontinuous problem and establish a rigorous residual error estimate up to the first-order correction.

Published

2015

13. The Structure of Self‐gravitating Polytropic Systems withnaround 5

Author

George B. Rybicki and Mikhail V. Medvedev

Subjects

Physics, 010308 nuclear & particles physics, Molecular cloud, Astrophysics (astro-ph), Structure (category theory), FOS: Physical sciences, Duality (optimization), Astronomy and Astrophysics, Astrophysics::Cosmology and Extragalactic Astrophysics, Polytropic process, Astrophysics, 01 natural sciences, 7. Clean energy, Stability (probability), Nonlinear poisson equation, General Relativity and Quantum Cosmology, 13. Climate action, Space and Planetary Science, 0103 physical sciences, Astrophysics::Solar and Stellar Astrophysics, Astrophysics::Earth and Planetary Astrophysics, 010303 astronomy & astrophysics, Astrophysics::Galaxy Astrophysics, Mathematical physics

Abstract

We investigate the structure of self-gravitating polytropic stellar systems. We present a method which allows to obtain approximate analytical solutions, $\psi_{n+\epsilon}({\bf x})$, of the nonlinear Poisson equation with the polytropic index $n+\epsilon$, given the solution $\psi_n({\bf x})$ with the polytropic index n, for any positive or negative $\epsilon$ such that $|\epsilon|\ll1$. Application of this method to the spherically symmetric stellar polytropes with $n\simeq5$ yields the solutions which describe spatially bound systems if n5. A heuristic approximate expressions for the radial profiles are also presented. Due to the duality between stellar and gas polytropes, our results are valid for gaseous, self-gravitating polytropic systems (e.g., molecular clouds) with the index $\gamma\simeq 6/5$. Stability of such systems and observational consequences for both stellar and gaseous systems are discussed., Comment: LaTeX, emulateapj, 5 pages, 2 PS figures. ApJ,accepted version. Other works are at http://www.cita.utoronto.ca/~medvedev/

Published

2001

14. Zero-mass-electrons limits in hydrodynamic models for plasmas

Author

Yue-Jun Peng, T. Goudon, and Ansgar Jüngel

Subjects

Physics, Applied Mathematics, Zero (complex analysis), Plasma, Electron, Nonlinear poisson equation, Ion, Euler equations, symbols.namesake, Screened Poisson equation, Classical mechanics, Zero mass, Physics::Plasma Physics, symbols

Abstract

We study the zero-mass-electrons limits in the hydrodynamic models for plasmas consisting of electrons and ions. We prove, under suitable assumptions, that the evolution of the ions is governed by the Euler equations coupled with a nonlinear Poisson equation, as the mass of electrons tends to zero.

Published

1999

15. On existence and uniqueness of the equilibrium state for an improved Nernst--Planck--Poisson system

Author

Gajewski, Paul

Subjects

35J91, Nernst-Planck-Poisson equations, Equilibrium, Nonlinear Poisson equation, 76T30, 78A35

Abstract

This work deals with a model for a mixture of charged constituents introduced in [W. Dreyer et al. Overcoming the shortcomings of the Nernst-Planck model. emphPhys. Chem. Chem. Phys., 15:7075-7086, 2013]. The aim of this paper is to give a first existence and uniqueness result for the equilibrium situation. A main difference to earlier works is a momentum balance involving the gradient of pressure and the Lorenz force which persists in the stationary situation and gives rise to the dependence of the chemical potentials on the particle densities of every species.

Published

2014

16. Some Nonlinear Vortex Solutions

Author

Ghada Alobaidi, Roland Mallier, Michael C. Haslam, and Christopher J. Smith

Subjects

Physics, Article Subject, Applied Mathematics, lcsh:Mathematics, Motion (geometry), lcsh:QA1-939, Nonlinear poisson equation, Vortex, Physics::Fluid Dynamics, Nonlinear system, Classical mechanics, Inviscid flow, Compressibility, Analysis

Abstract

We consider the steady-state two-dimensional motion of an inviscid incompressible fluid which obeys a nonlinear Poisson equation. By seeking solutions of a specific form, we arrive at some interesting new nonlinear vortex solutions.

Published

2012

17. Alternating-direction method for a mildly nonlinear elliptic equation with nonlocal integral conditions

Author

Olga Štikonienė and Mifodijus Sapagovas

Subjects

Generalization, convergence of iterative method, Applied Mathematics, elliptic equation, finite-difference method, Mathematical analysis, lcsh:QA299.6-433, lcsh:Analysis, Integral equation, Domain (mathematical analysis), Nonlinear poisson equation, Nonlinear system, Elliptic curve, Elliptic equation, Nonlocal integral conditions, Finite-difference method, Alternating-direction method, Convergence of iterative method, nonlocal integral conditions, Boundary value problem, alternating-direction method, Analysis, Mathematics

Abstract

The present paper deals with a generalization of the alternating-direction implicit (ADI) method for the two-dimensional nonlinear Poisson equation in a rectangular domain with integral boundary condition in one coordinate direction. The analysis of results of computational experiments is presented.

Published

2011

18. Chromatic Aberration Reduction based on the Use of Nonlinear Poisson Equation

Author

Hee Kang and Moon Gi Kang

Subjects

Physics, Reduction (complexity), Mathematical analysis, Chromatic aberration, Nonlinear poisson equation

Published

2010

19. Trefftz-type Design Sensitivity Analysis for Nonlinear Poisson Equation

Author

Eisuke Kita, Keita Honda, Norio Kamiya, and Yoichi Ikeda

Subjects

Laplace's equation, symbols.namesake, Mathematical optimization, Screened Poisson equation, Uniqueness theorem for Poisson's equation, Discrete Poisson equation, symbols, Applied mathematics, General Medicine, Sensitivity (control systems), Poisson's equation, Nonlinear poisson equation, Mathematics

Published

2003

20. Further improved algorithm for the solution of the nonlinear Poisson equation in semiconductor devices

Author

G. J. L. Ouwerling

Subjects

Perspective (geometry), Improved algorithm, General Physics and Astronomy, Applied mathematics, Relaxation (iterative method), Semiconductor device, Poisson's equation, Mathematics, Nonlinear poisson equation

Abstract

This paper gives a concise overview of some existing methods for the solution of the nonlinear Poisson equation in semiconductors. A method for the solution of this equation was recently proposed in this journal by I. D. Mayergoyz [J. Appl. Phys. 59, 195 (1986)]. Soon afterwards, an improved version was described by W. Keller [J. Appl. Phys. 61, 5189 (1987)]. Both methods are classified within the perspective of the existing methods. Moreover, Keller’s method is further improved by the introduction of scaled variables and by using red‐black ordening to allow for overrelaxation. All advantages of the two methods are maintained. An illustrative example shows an improvement in solution speed of at least a factor of 5.6.

Published

1989

21. Role of Dislocations in the Electrical Conductivity of CdS

Author

A. R. Hutson

Subjects

Materials science, Condensed matter physics, Impurity, Electrical resistivity and conductivity, Piezoelectric polarization, General Physics and Astronomy, Conductivity, Anisotropy, Nonlinear poisson equation

Abstract

A large anisotropy in the electrical conductivity of CdS appearing below 30\ifmmode^\circ\else\textdegree\fi{}K is reported. This anisotropy casts serious doubt on the customary view that impurity hopping supplies the low-temperature conductivity. We present a new model for this conductivity based upon the electronic screening of the piezoelectric polarization around dislocations. Numerical solutions of the highly nonlinear Poisson equation quantitatively justify this model.

Published

1981

22. Role of Traps in a Steady‐State Space Charge

Author

Louis Gold

Subjects

Trap (computing), Classical mechanics, Steady state, Series (mathematics), Chemistry, General Physics and Astronomy, Charge density, Charge (physics), Allowance (engineering), Mechanics, Space charge, Nonlinear poisson equation

Abstract

Allowance for traps in certain space‐charge environments produces changes in the mathematical formalism which make it difficult to determine spatial variations in potential and the negative‐positive charge distribution. The trap‐free model for the blocking electrode can be extended into this realm by appropriate accommodation of the equations of continuity for specified kinetics of the trap system. The tendency of traps seems to be a moderation of the spatial fall‐off of potential with more gradual build‐up and decay of the charge densities. The nonlinear Poisson equation has been solved analytically by the development of powerful series methods, demonstrating that machine integration can be avoided.

Published

1965

23. On the Existence of Classical Solutions to an Elliptic Free Boundary Problem

Author

Thomas J. Mahar and B.A. Fleishman

Subjects

Monotone polygon, Uniqueness theorem for Poisson's equation, Scheme (mathematics), Mathematical analysis, Free boundary problem, Existence theorem, Constructive, Elliptic boundary value problem, Nonlinear poisson equation, Mathematics

Abstract

An existence theorem is proved for a two-dimensional free boundary problem for a nonlinear Poisson equation. The method is constructive, employing a monotone iterative scheme, and it provides classical solutions.

Published

1978