AbstractWe present an explicit monotone scheme for solving boundary value problems for fully nonlinear elliptic equations. We replace the discretized elliptic problems by their parabolic versions, with initial data being either super- or subsolution. For sufficiently fine meshes we obtain monotone iterations, for which convergence can often be proved
We develop monotone iterative technique for a system of semilinear elliptic boundary value problems ...
AbstractMonotone methods in conjuction with upper and lower solutions have proved to be extremely po...
THE present note ProDoses monotonic schemes. uniformly convergent at a rate 0(h2), for a non-selfadj...
AbstractWe present an explicit monotone scheme for solving boundary value problems for fully nonline...
AbstractThis paper is concerned with the computational algorithms for finite difference solutions of...
AbstractWe develop an explicit method allowing efficient computation of solutions of nonlinear bound...
AbstractIn this paper a monotone iteration technique for generating uniform bounds of the solution o...
AbstractMotivated by the application to some degenerate elliptic problems (here, degenerate means no...
We numerically solving semilinear elliptic problems with the method of upper and lower solutions. In...
Abstract. The monotone iteration scheme is a constructive method for solving a wide class of semilin...
We develop monotone iterative technique for a system of semilinear elliptic boundary value problems ...
We develop monotone iterative technique for a system of semilinear elliptic boundary value problems ...
We present numerical methods for solving a coupled system of nonlinear elliptic problems, where reac...
In this work, after a theoretical explanation of the monotone iteration method, there are presented ...
AbstractThis paper discusses from the computational point of view the convergence and error bounds o...
We develop monotone iterative technique for a system of semilinear elliptic boundary value problems ...
AbstractMonotone methods in conjuction with upper and lower solutions have proved to be extremely po...
THE present note ProDoses monotonic schemes. uniformly convergent at a rate 0(h2), for a non-selfadj...
AbstractWe present an explicit monotone scheme for solving boundary value problems for fully nonline...
AbstractThis paper is concerned with the computational algorithms for finite difference solutions of...
AbstractWe develop an explicit method allowing efficient computation of solutions of nonlinear bound...
AbstractIn this paper a monotone iteration technique for generating uniform bounds of the solution o...
AbstractMotivated by the application to some degenerate elliptic problems (here, degenerate means no...
We numerically solving semilinear elliptic problems with the method of upper and lower solutions. In...
Abstract. The monotone iteration scheme is a constructive method for solving a wide class of semilin...
We develop monotone iterative technique for a system of semilinear elliptic boundary value problems ...
We develop monotone iterative technique for a system of semilinear elliptic boundary value problems ...
We present numerical methods for solving a coupled system of nonlinear elliptic problems, where reac...
In this work, after a theoretical explanation of the monotone iteration method, there are presented ...
AbstractThis paper discusses from the computational point of view the convergence and error bounds o...
We develop monotone iterative technique for a system of semilinear elliptic boundary value problems ...
AbstractMonotone methods in conjuction with upper and lower solutions have proved to be extremely po...
THE present note ProDoses monotonic schemes. uniformly convergent at a rate 0(h2), for a non-selfadj...