We consider stiff initial-value problems for second-order differential equations of the special form y' = f(y). Stiff initial-value problem solvers are necessarily implicit, hence, we are faced with the problem of solving systems of implicit relations. This paper focuses on the construction and analysis of iterative solution methods which are effective in cases where the Jacobian of the righthand side of the differential equation can be split into a sum of matrices with a simple structure. These iterative methods consist of the modified Newton method and an iterative linear solver to deal with the linear Newton systems. The linear solver is based on the approximate factorization of the system matrix associated with the linear Newton systems...
In this paper we design higher order time integrators for systems of stiff ordinary differential equ...
AbstractThis paper proposes implicit multistep matrix methods for the numerical solution of stiff in...
We consider quadrature formulas of high order in time based on Radau-type, L-stable implicit Runge-K...
We consider stiff initial-value problems for second-order differential equations of the special form...
This article proposes a new approach to the construction of a linearization method based on the ite...
textabstractWe consider the systems of ordinary differential equations (ODEs) obtained by spatial di...
AbstractIn this paper a matrix separation of the variables method for solving initial-boundary value...
This article proposes a new approach to the construction of a linearization method based on the iter...
In this article, we combine operator-splitting methods of an iterative and non-iterative type to pro...
AbstractWe consider implicit integration methods for the numerical solution of stiff initial-value p...
AbstractIn this paper we design higher-order time integrators for systems of stiff ordinary differen...
In this article a new approach is proposed for constructing a domain decomposition method based on t...
Our purpose is the design of efficient methods for solving stiff and nonstiff initial value problem...
AbstractA new iterative method for the solution of linear systems, based upon a new splitting of the...
In this paper we consider time-decomposition methods and present interesting model problems as benc...
In this paper we design higher order time integrators for systems of stiff ordinary differential equ...
AbstractThis paper proposes implicit multistep matrix methods for the numerical solution of stiff in...
We consider quadrature formulas of high order in time based on Radau-type, L-stable implicit Runge-K...
We consider stiff initial-value problems for second-order differential equations of the special form...
This article proposes a new approach to the construction of a linearization method based on the ite...
textabstractWe consider the systems of ordinary differential equations (ODEs) obtained by spatial di...
AbstractIn this paper a matrix separation of the variables method for solving initial-boundary value...
This article proposes a new approach to the construction of a linearization method based on the iter...
In this article, we combine operator-splitting methods of an iterative and non-iterative type to pro...
AbstractWe consider implicit integration methods for the numerical solution of stiff initial-value p...
AbstractIn this paper we design higher-order time integrators for systems of stiff ordinary differen...
In this article a new approach is proposed for constructing a domain decomposition method based on t...
Our purpose is the design of efficient methods for solving stiff and nonstiff initial value problem...
AbstractA new iterative method for the solution of linear systems, based upon a new splitting of the...
In this paper we consider time-decomposition methods and present interesting model problems as benc...
In this paper we design higher order time integrators for systems of stiff ordinary differential equ...
AbstractThis paper proposes implicit multistep matrix methods for the numerical solution of stiff in...
We consider quadrature formulas of high order in time based on Radau-type, L-stable implicit Runge-K...