On the method of fictitious domains for a fourth order quasilinear elliptic equation. (Sur la méthode des domaines fictifs pour une équation elliptique quasilinéaire du quatrième ordre.)
On the numerical approximation of first-order Hamilton-Jacobi equations
Some methods for the numerical approximation of time-dependent and steady first-order Hamilton-Jacobi equations are reviewed. Most of the discussion focuses on conformal triangular-type meshes, but we show how to extend this to the most general meshes. We review some first-order monotone schemes and also high-order ones specially dedicated to steady problems.
On the numerical performance of a sharp a posteriori error estimator for some nonlinear elliptic problems
Karátson and Korotov developed a sharp upper global a posteriori error estimator for a large class of nonlinear problems of elliptic type, see J. Karátson, S. Korotov (2009). The goal of this paper is to check its numerical performance, and to demonstrate the efficiency and accuracy of this estimator on the base of quasilinear elliptic equations of the second order. The focus will be on the technical and numerical aspects and on the components of the error estimation, especially on the adequate...
On the Numerical Solution of the Equation ....-(....) = f and Its Discretizations, I.
On the relationship between difference and projection-difference methods
On the representation of functions and finite difference operators on adaptive dyadic grids.
On the Structure of Error Estimates for Finite-Difference Methods.
On the worst-case convergence of MR and CG for symmetric positive definite tridiagonal Toeplitz matrices.
One iterative method concerning the solution of Dirichlet's problem
Optimal grids for anisotropic problems.