AbstractIn several pieces of the most effective mathematical software for non-stiff and mildly stiff initial value problems in ordinary differential equations, the classical Adams methods are implemented in a particular mode. One reason for the choice of mode is sometimes explained in terms of the associated scaled absolute stability regions for the methods. In this note it is shown that the same choice of mode remains appropriate from this point of view when certain families of generalized Adams-type methods are considered
Because of the wide variety of differential equations, there seems to be no numerical method which w...
AbstractA multistep method with matricial coefficients is developed. It can be used to solve stiff i...
In this paper, Adams explicit and implicit formulas are obtained in a simple way and a relationship ...
AbstractIn several pieces of the most effective mathematical software for non-stiff and mildly stiff...
AbstractNonlinear optimization and root-finding procedures were used to locate Adams-type methods wi...
AbstractStiffly stable Adams type methods of order 4, 5 and 6 and stepnumber 6, 7 and 9, respectivel...
AbstractIn this paper, the two-parameter family of order four, step-number five, Adams-type methods ...
AbstractThe results of a study dealing with the location of stable corrector methods for the numeric...
AbstractThis paper presents two low-order, A0-stable Adams-type correctors. The correctors have bett...
Generalized Adams methods of order 3, 5, 7 and 9 are used to find numerical solutions of initial val...
The aim of this paper is to compare the relative accuracies between predictor-corrector methods, Ada...
AbstractThe question of the existence of A0-stable Adams-type correctors is addressed in this paper....
AbstractAdams predictor–corrector methods are among the most widely used algorithms for solving init...
AbstractA theory is developed that explains the stepsize patterns observed when standard predictor-c...
In this work we present explicit Adams-type multi-step methods with extended stability intervals, wh...
Because of the wide variety of differential equations, there seems to be no numerical method which w...
AbstractA multistep method with matricial coefficients is developed. It can be used to solve stiff i...
In this paper, Adams explicit and implicit formulas are obtained in a simple way and a relationship ...
AbstractIn several pieces of the most effective mathematical software for non-stiff and mildly stiff...
AbstractNonlinear optimization and root-finding procedures were used to locate Adams-type methods wi...
AbstractStiffly stable Adams type methods of order 4, 5 and 6 and stepnumber 6, 7 and 9, respectivel...
AbstractIn this paper, the two-parameter family of order four, step-number five, Adams-type methods ...
AbstractThe results of a study dealing with the location of stable corrector methods for the numeric...
AbstractThis paper presents two low-order, A0-stable Adams-type correctors. The correctors have bett...
Generalized Adams methods of order 3, 5, 7 and 9 are used to find numerical solutions of initial val...
The aim of this paper is to compare the relative accuracies between predictor-corrector methods, Ada...
AbstractThe question of the existence of A0-stable Adams-type correctors is addressed in this paper....
AbstractAdams predictor–corrector methods are among the most widely used algorithms for solving init...
AbstractA theory is developed that explains the stepsize patterns observed when standard predictor-c...
In this work we present explicit Adams-type multi-step methods with extended stability intervals, wh...
Because of the wide variety of differential equations, there seems to be no numerical method which w...
AbstractA multistep method with matricial coefficients is developed. It can be used to solve stiff i...
In this paper, Adams explicit and implicit formulas are obtained in a simple way and a relationship ...