Add to ORKGBoundary value problems has an important role in many applied areas. We investigate the common numerical methods and the Carleman linearization method for boundary value problems. We present numerical simulations as well
Boundary Value Methods (BVMs) would seem to be suitable candidates for the solution of nonlinear...
AbstractThis paper describes a technique for the solution of non-linear boundary value problems in o...
Boundary value methods are linear multistep methods used with a fixed number of initial and final c...
Many problems in aeronautics can be described in terms of nonlinear systems of equations. Carleman d...
The boundary value problem for the Carleman system of equations is considered. The problem is invest...
This thesis investigates the viability of two boundary element methods for solving steady state prob...
AbstractA usual way to approximate the solution of initial value problems for ordinary differential ...
AbstractIn this article some numerical methods of rational collocation for linear boundary value pro...
Based on the Tikhonov regularization method, we explicitly construct a Carleman function in an ill-p...
Abstract: In this paper, Numerical Methods for solving ordinary differential equations, beginning wi...
The negative stationary solutions of the boundary value problem for the Carleman system of equations...
Abstract. Many numerical methods for the approximation ofordinary differential equations (ODEs) are ...
In this book, we study theoretical and practical aspects of computing methods for mathematical model...
AbstractThe non-linear autonomous of differential equations ẋi=∑jaijxj+∑j,kbijkxjxk(ẋi=dxi/dt, i, ...
Boundary Value Methods (BVMs) would seem to be suitable candidates for the solution of nonlinear Bou...
Boundary Value Methods (BVMs) would seem to be suitable candidates for the solution of nonlinear...
AbstractThis paper describes a technique for the solution of non-linear boundary value problems in o...
Boundary value methods are linear multistep methods used with a fixed number of initial and final c...
Many problems in aeronautics can be described in terms of nonlinear systems of equations. Carleman d...
The boundary value problem for the Carleman system of equations is considered. The problem is invest...
This thesis investigates the viability of two boundary element methods for solving steady state prob...
AbstractA usual way to approximate the solution of initial value problems for ordinary differential ...
AbstractIn this article some numerical methods of rational collocation for linear boundary value pro...
Based on the Tikhonov regularization method, we explicitly construct a Carleman function in an ill-p...
Abstract: In this paper, Numerical Methods for solving ordinary differential equations, beginning wi...
The negative stationary solutions of the boundary value problem for the Carleman system of equations...
Abstract. Many numerical methods for the approximation ofordinary differential equations (ODEs) are ...
In this book, we study theoretical and practical aspects of computing methods for mathematical model...
AbstractThe non-linear autonomous of differential equations ẋi=∑jaijxj+∑j,kbijkxjxk(ẋi=dxi/dt, i, ...
Boundary Value Methods (BVMs) would seem to be suitable candidates for the solution of nonlinear Bou...
Boundary Value Methods (BVMs) would seem to be suitable candidates for the solution of nonlinear...
AbstractThis paper describes a technique for the solution of non-linear boundary value problems in o...
Boundary value methods are linear multistep methods used with a fixed number of initial and final c...