Add to ORKGIn this note we present a new Rosenbrock solver which is third-order accurate for nonlinear parabolic problems. Since Rosenbrock methods suffer from order reduction when they are applied to partial differential equations, additional order conditions have to be satisfied. Although these conditions have been known for a longer time, from the practical point of view only little has been done to construct new methods. Steinebach modified the well-known solver RODAS of Hairer and Wanner to preserve its classical order four for special problem classes including linear parabolic equations. His solver RODASP, however, drops down to order three for nonlinear parabolic problems. Our motivation here was to derive an efficient third-order Rosenbrock so...
AbstractOne class of methods for solving nonstiff ordinary differential equations is the so called e...
AbstractRecently, Parida and Gupta [P.K. Parida, D.K. Gupta, Recurrence relations for a Newton-like ...
The computation of stiff systems of ordinary differential equations requires highly stable processes...
textabstractIn this note we present a new Rosenbrock solver which is third--order accurate for nonli...
Abstract. In this note new Rosenbrock-methods for index 2 PDAEs are presented. These solvers are of ...
AbstractWe develop a class of generalized Rosenbrock-type schemes for second-order nonlinear systems...
Rosenbrock–Wanner methods for systems of stiff ordinary differential equations are well known since ...
In this work, we develop a new class of methods which have been created in order to numerically solv...
A new structure is proposed for Rosenbrock methods for solving stiff ordinary differential equations...
In this work we examine the viability of Rosenbrock-type time-stepping methods - specifically Rosenb...
In this report the Rosenbrock formulae are considered. These formulae are particularly suited for th...
We consider the Rosenbrock methods, namely a family of methods for Differential Algebraic Equations,...
In this work we present a new class of methods which have been developed in order to numerically sol...
We avoid as as much as possible the order reduction of Rosenbrock methods when they are applied to n...
This book discusses the development of the Rosenbrock—Wanner methods from the origins of the idea to...
AbstractOne class of methods for solving nonstiff ordinary differential equations is the so called e...
AbstractRecently, Parida and Gupta [P.K. Parida, D.K. Gupta, Recurrence relations for a Newton-like ...
The computation of stiff systems of ordinary differential equations requires highly stable processes...
textabstractIn this note we present a new Rosenbrock solver which is third--order accurate for nonli...
Abstract. In this note new Rosenbrock-methods for index 2 PDAEs are presented. These solvers are of ...
AbstractWe develop a class of generalized Rosenbrock-type schemes for second-order nonlinear systems...
Rosenbrock–Wanner methods for systems of stiff ordinary differential equations are well known since ...
In this work, we develop a new class of methods which have been created in order to numerically solv...
A new structure is proposed for Rosenbrock methods for solving stiff ordinary differential equations...
In this work we examine the viability of Rosenbrock-type time-stepping methods - specifically Rosenb...
In this report the Rosenbrock formulae are considered. These formulae are particularly suited for th...
We consider the Rosenbrock methods, namely a family of methods for Differential Algebraic Equations,...
In this work we present a new class of methods which have been developed in order to numerically sol...
We avoid as as much as possible the order reduction of Rosenbrock methods when they are applied to n...
This book discusses the development of the Rosenbrock—Wanner methods from the origins of the idea to...
AbstractOne class of methods for solving nonstiff ordinary differential equations is the so called e...
AbstractRecently, Parida and Gupta [P.K. Parida, D.K. Gupta, Recurrence relations for a Newton-like ...
The computation of stiff systems of ordinary differential equations requires highly stable processes...