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Displaying 41 – 60 of 94

The index of isolated critical points and solutions of elliptic equations in the plane

G. Alessandrini, R. Magnanini (1992)

Annali della Scuola Normale Superiore di Pisa - Classe di Scienze

The inverse problem for elliptic equations from Dirichlet to Neumann map in multiply connected domains.

Wen, Guochun, Xu, Zuoliang, Yang, Fengmin (2009)

Boundary Value Problems [electronic only]

The $L^{p}$ -Helmholtz projection in finite cylinders

Tobias Nau (2015)

Czechoslovak Mathematical Journal

In this article we prove for $1 < p < \infty$ the existence of the $L^{p}$ -Helmholtz projection in finite cylinders $Ω$ . More precisely, $Ω$ is considered to be given as the Cartesian product of a cube and a bounded domain $V$ having $C^{1}$ -boundary. Adapting an approach of Farwig (2003), operator-valued Fourier series are used to solve a related partial periodic weak Neumann problem. By reflection techniques the weak Neumann problem in $Ω$ is solved, which implies existence and a representation of the $L^{p}$ -Helmholtz projection as...

The Lane-Emden Function and Nonlinear Eigenvalues Problems

Ould Ahmed Izid Bih Isselkou (2009)

Annales de la faculté des sciences de Toulouse Mathématiques

We consider a semilinear elliptic eigenvalues problem on a ball of $ℜ^{n}$ and show that all the eigenfunctions and eigenvalues, can be obtained from the Lane-Emden function.

The L.P.D.E.M., a mixed finite difference method for elliptic problems.

M. Jai, G. Bayada, M. Chambat (1992)

Numerische Mathematik

The maximum principle for equations with composite coefficients.

Lieberman, Gary M. (2000)

Electronic Journal of Differential Equations (EJDE) [electronic only]

The mortar element method for three dimensional finite elements

F. Ben Belgacem, Y. Maday (1997)

ESAIM: Mathematical Modelling and Numerical Analysis - Modélisation Mathématique et Analyse Numérique

The Mortar method in the wavelet context

Silvia Bertoluzza, Valérie Perrier (2001)

ESAIM: Mathematical Modelling and Numerical Analysis - Modélisation Mathématique et Analyse Numérique

This paper deals with the use of wavelets in the framework of the Mortar method. We first review in an abstract framework the theory of the mortar method for non conforming domain decomposition, and point out some basic assumptions under which stability and convergence of such method can be proven. We study the application of the mortar method in the biorthogonal wavelet framework. In particular we define suitable multiplier spaces for imposing weak continuity. Unlike in the classical mortar method,...

The Mortar Method in the Wavelet Context

Silvia Bertoluzza, Valérie Perrier (2010)

ESAIM: Mathematical Modelling and Numerical Analysis

The Neumann problem for elliptic equations with non-smooth coefficients.

Carlos E. Kenig, Jill Pipher (1993)

Inventiones mathematicae

The Neumann problem for some degenerate elliptic equations

Albo Carlos Cavalheiro (2006)

Applications of Mathematics

In the paper we study the equation $L u = f$ , where $L$ is a degenerate elliptic operator, with Neumann boundary condition in a bounded open set $Ω$ . We prove existence and uniqueness of solutions in the space $H (Ω)$ for the Neumann problem.

The Neumann problem for the 2-D Helmholtz equation in a domain, bounded by closed and open curves.

Krutitskii, P.A. (1998)

International Journal of Mathematics and Mathematical Sciences

The Neumann problem for the Laplace equation on general domains

Dagmar Medková (2007)

Czechoslovak Mathematical Journal

The solution of the weak Neumann problem for the Laplace equation with a distribution as a boundary condition is studied on a general open set $G$ in the Euclidean space. It is shown that the solution of the problem is the sum of a constant and the Newtonian potential corresponding to a distribution with finite energy supported on $\partial G$ . If we look for a solution of the problem in this form we get a bounded linear operator. Under mild assumptions on $G$ a necessary and sufficient condition for the solvability...

The Neumann-Dirichlet Domain Decomposition Method with Inexact Solvers on the Subdomains.

Christoph Börgers (1987)

Numerische Mathematik

The nonexistence of a weak solution of Dirichlet's problem for the functional of minimal surface on nonconvex domains

Vladimír Souček (1971)

Commentationes Mathematicae Universitatis Carolinae

The nonlinear Neumann problem and sharp weighted Sobolev inequalities

J. Chabrowski, P. M. Girão (2001)

Colloquium Mathematicae

We prove sharp inequalities in weighted Sobolev spaces. Our approach is based on the blow-up technique applied to some nonlinear Neumann problems.

The non-uniqueness of the limit solutions of the scalar Chern-Simons equations with signed measures

Adilson Eduardo Presoto (2021)

Mathematica Bohemica

We investigate the effect of admitting signed measures as a datum at the scalar Chern-Simons equation $- Δ u + e^{u} (e^{u} - 1) = μ in Ω$ with the Dirichlet boundary condition. Approximating $μ$ by a sequence ${(μ_{n})}_{n \in ℕ}$ of $L^{1}$ functions or finite signed measures such that this equation has a solution $u_{n}$ for each $n \in ℕ$ , we are interested in establishing the convergence of the sequence ${(u_{n})}_{n \in ℕ}$ to a function $u^{#}$ and describing the form of the measure which appears on the right-hand side of the scalar Chern-Simons equation solved by $u^{#}$ .

The numerical solution of large finite element systems by explicit preconditioning semi-direct methods

Elias A. Lipitakis, George A. Gravvanis (1991)

Δελτίο της Ελληνικής Μαθηματικής Εταιρίας

The Oblique Derivative Problem. I.

Bengt Winzell (1977)

Mathematische Annalen

The optimization of the stationary heat equation with a variable right-hand side

Ctirad Matyska (1986)

Aplikace matematiky

Solving the stationary heat equation we optimize the temperature on part of the boundary of the domain under investigation. First the Poisson equation is solved; both the Neumann condition on part of the boundary and the Newton condition on the rest are prescribed, the distribution of the heat sources being variable. In the second case, the heat equation also contains a convective term, the distribution of heat sources is specified and the Neumann condition is variable on part of the boundary.

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