AbstractThe first application of approximate factorization in the numerical solution of time-dependent partial differential equations (PDEs) can be traced back to the celebrated papers of Peaceman and Rachford and of Douglas of 1955. For linear problems, the Peaceman–Rachford–Douglas method can be derived from the Crank–Nicolson method by the approximate factorization of the system matrix in the linear system to be solved. This factorization is based on a splitting of the system matrix. In the numerical solution of time-dependent PDEs we often encounter linear systems whose system matrix has a complicated structure, but can be split into a sum of matrices with a simple structure. In such cases, it is attractive to replace the system matrix ...
We consider stiff initial-value problems for second-order differential equations of the special form...
In this article, a general framework for solving system of ordinary differential equations by implem...
AbstractSince the fundamental paper of Moser (1966), it has been understood analytically that regula...
AbstractThe first application of approximate factorization in the numerical solution of time-depende...
and their applications. SMC is sponsored by the Netherlands Organization for Scientific Research (NW...
textabstractWe consider the systems of ordinary differential equations (ODEs) obtained by spatial di...
AbstractIn this paper continuous numerical solutions expressed in terms of matrix exponentials are c...
Abstract: This report contains lecture notes used for the 2016 edition of the Rome-Moscow ...
AbstractThis paper is concerned with the time integration of semi-discretized, multi-dimensional PDE...
The analytical solutions for linear, one-dimensional, time-dependent partial differential equations ...
A numerical time integration algorithm that combines the high accuracy of the precise time integrati...
The numerical solution of time-dependent ordinary and partial differential equations presents a numb...
The numerical solution of time-dependent ordinary and partial differential equations presents a numb...
In this chapter, we give a brief overview of a particular class of preconditioners known as incomple...
The demand of many scientific areas for the usage of fractional partial differential equations (FPDE...
We consider stiff initial-value problems for second-order differential equations of the special form...
In this article, a general framework for solving system of ordinary differential equations by implem...
AbstractSince the fundamental paper of Moser (1966), it has been understood analytically that regula...
AbstractThe first application of approximate factorization in the numerical solution of time-depende...
and their applications. SMC is sponsored by the Netherlands Organization for Scientific Research (NW...
textabstractWe consider the systems of ordinary differential equations (ODEs) obtained by spatial di...
AbstractIn this paper continuous numerical solutions expressed in terms of matrix exponentials are c...
Abstract: This report contains lecture notes used for the 2016 edition of the Rome-Moscow ...
AbstractThis paper is concerned with the time integration of semi-discretized, multi-dimensional PDE...
The analytical solutions for linear, one-dimensional, time-dependent partial differential equations ...
A numerical time integration algorithm that combines the high accuracy of the precise time integrati...
The numerical solution of time-dependent ordinary and partial differential equations presents a numb...
The numerical solution of time-dependent ordinary and partial differential equations presents a numb...
In this chapter, we give a brief overview of a particular class of preconditioners known as incomple...
The demand of many scientific areas for the usage of fractional partial differential equations (FPDE...
We consider stiff initial-value problems for second-order differential equations of the special form...
In this article, a general framework for solving system of ordinary differential equations by implem...
AbstractSince the fundamental paper of Moser (1966), it has been understood analytically that regula...