AbstractA new class of methods, for solving stiff systems, which avoids the exactness of the Jacobian matrix is introduced. The order conditions for methods of order p ⩽ 5 are given. The linear stability properties for such methods are analysed; numerical testing are also included
AbstractOne class of methods for solving nonstiff ordinary differential equations is the so called e...
AbstractStiffly stable Adams type methods of order 4, 5 and 6 and stepnumber 6, 7 and 9, respectivel...
A new three and five step block linear methods based on the Adams family for the direct solution of ...
AbstractA new class of methods, for solving stiff systems, which avoids the exactness of the Jacobia...
AbstractImplicit methods are the natural choice for solving stiff systems of ODEs. Rosenbrock method...
AbstractThe computation of stiff systems of ordinary differential equations requires highly stable p...
AbstractA model is presented for stability for an extension of linear multistep methods for stiff or...
AbstractThe paper deals with certain boundedness properties of Runge-Kutta-Rosenbrock methods when a...
Rosenbrock–Wanner methods for systems of stiff ordinary differential equations are well known since ...
AbstractPopular methods for the integration of a stiff initial-value problem for a system of ordinar...
The computation of stiff systems of ordinary differential equations requires highly stable processes...
This paper studies Rosenbrock methods when they are applied to stiff differential equations containi...
AbstractWe consider modifications of Newton's method for solving a nonlinear system F(x) = 0 where F...
AbstractWe develop a class of generalized Rosenbrock-type schemes for second-order nonlinear systems...
Here we present a class of W-methods for stiff ODEs based on some special approximations of the Jaco...
AbstractOne class of methods for solving nonstiff ordinary differential equations is the so called e...
AbstractStiffly stable Adams type methods of order 4, 5 and 6 and stepnumber 6, 7 and 9, respectivel...
A new three and five step block linear methods based on the Adams family for the direct solution of ...
AbstractA new class of methods, for solving stiff systems, which avoids the exactness of the Jacobia...
AbstractImplicit methods are the natural choice for solving stiff systems of ODEs. Rosenbrock method...
AbstractThe computation of stiff systems of ordinary differential equations requires highly stable p...
AbstractA model is presented for stability for an extension of linear multistep methods for stiff or...
AbstractThe paper deals with certain boundedness properties of Runge-Kutta-Rosenbrock methods when a...
Rosenbrock–Wanner methods for systems of stiff ordinary differential equations are well known since ...
AbstractPopular methods for the integration of a stiff initial-value problem for a system of ordinar...
The computation of stiff systems of ordinary differential equations requires highly stable processes...
This paper studies Rosenbrock methods when they are applied to stiff differential equations containi...
AbstractWe consider modifications of Newton's method for solving a nonlinear system F(x) = 0 where F...
AbstractWe develop a class of generalized Rosenbrock-type schemes for second-order nonlinear systems...
Here we present a class of W-methods for stiff ODEs based on some special approximations of the Jaco...
AbstractOne class of methods for solving nonstiff ordinary differential equations is the so called e...
AbstractStiffly stable Adams type methods of order 4, 5 and 6 and stepnumber 6, 7 and 9, respectivel...
A new three and five step block linear methods based on the Adams family for the direct solution of ...
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