The concepts of stability regions, A- and A(α)-stability - albeit based on scalar models - turned out to be essential for the identification of implicit methods suitable for the integration of stiff ODEs. However, for multistep methods, knowledge of the stability region provides no information on the quantitative stability behavior of the scheme. In this paper we fill this gap for the important class of Backward Differentiation Formulas (BDF). Quantitative stability bounds are derived which are uniformly valid in the stability region of the method. Our analysis is based on a study of the separation of the characteristic roots and a special similarity decomposition of the associated companion matrix
A new family of block methods, namely block backward differentiation alpha-formulas (BBDF-) are deve...
Abstract: In this paper we present details of a new class of hybrid methods which are based on backw...
Review of implicit methods of integrating system of stiff ordinary differential equations is present...
Tyt. z nagłówka.Bibliografia s. 226.Dostępny również w formie drukowanej.ABSTRACT: The concepts of s...
This paper focuses on the stability regions of numerical methods and to demonstrate its suitability ...
In this research, a singly diagonally implicit block backward differentiation formulas (SDIBBDF) for...
AbstractA model is presented for stability for an extension of linear multistep methods for stiff or...
In this research, a singly diagonally implicit block backward differentiation formulas (SDIBBDF) for...
Abstract This paper focuses on obtaining stability regions of numerical meth-ods for ordinary differ...
Some Block Backward Differentiation Formulas (BDFs) capable of generating solutions to Stiff initial...
In this paper, we focus on the stability region of the variable step size of 3-point block backward ...
AbstractTime-dependent partial differential equations are often treated by semidiscretization and th...
AbstractIn this paper the A0-stability of interpolatory, variable coefficient and fixed leading coef...
In this paper, a technique for finding A(α) - stability interval for the Block Backward Differentiat...
This paper focuses on derivation of a 2-point block extended backward differentiation formula (BEBDF...
A new family of block methods, namely block backward differentiation alpha-formulas (BBDF-) are deve...
Abstract: In this paper we present details of a new class of hybrid methods which are based on backw...
Review of implicit methods of integrating system of stiff ordinary differential equations is present...
Tyt. z nagłówka.Bibliografia s. 226.Dostępny również w formie drukowanej.ABSTRACT: The concepts of s...
This paper focuses on the stability regions of numerical methods and to demonstrate its suitability ...
In this research, a singly diagonally implicit block backward differentiation formulas (SDIBBDF) for...
AbstractA model is presented for stability for an extension of linear multistep methods for stiff or...
In this research, a singly diagonally implicit block backward differentiation formulas (SDIBBDF) for...
Abstract This paper focuses on obtaining stability regions of numerical meth-ods for ordinary differ...
Some Block Backward Differentiation Formulas (BDFs) capable of generating solutions to Stiff initial...
In this paper, we focus on the stability region of the variable step size of 3-point block backward ...
AbstractTime-dependent partial differential equations are often treated by semidiscretization and th...
AbstractIn this paper the A0-stability of interpolatory, variable coefficient and fixed leading coef...
In this paper, a technique for finding A(α) - stability interval for the Block Backward Differentiat...
This paper focuses on derivation of a 2-point block extended backward differentiation formula (BEBDF...
A new family of block methods, namely block backward differentiation alpha-formulas (BBDF-) are deve...
Abstract: In this paper we present details of a new class of hybrid methods which are based on backw...
Review of implicit methods of integrating system of stiff ordinary differential equations is present...