In this work we present explicit Adams-type multi-step methods with extended stability intervals, which are analogous to the stabilised Chebyshev Runge – Kutta methods. It is proved that for any k ≥ 1 there exists an explicit k-step Adams-type method of order one with stability interval of length 2k. The first order methods have remarkably simple expressions for their coefficients and error constant. A damped modification of these methods is derived. In the general case, to construct a k-step method of order p it is necessary to solve a constrained optimisation problem in which the objective function and p constraints are second degree polynomials in k variables. We calculate higher-order methods up to order six numerically and perform some...
AbstractAdams predictor–corrector methods are among the most widely used algorithms for solving init...
A special class of fc-step Runge-Kutta methods is investigated which is generated by (non-linear) Ch...
An algorithm is developed to determine coefficients of the stability polynomials such that the expli...
AbstractNonlinear optimization and root-finding procedures were used to locate Adams-type methods wi...
AbstractIn this paper, the two-parameter family of order four, step-number five, Adams-type methods ...
AbstractStiffly stable Adams type methods of order 4, 5 and 6 and stepnumber 6, 7 and 9, respectivel...
AbstractWe describe the construction of explicit two-step Runge–Kutta methods of order p and stage o...
We describe the search for A-stable and algebraically stable two-step Runge Kutta methods of order p...
AbstractThis paper investigates a family of explicit two-step, two-stage Runge—Kutta methods in whic...
The Publisher's final version can be found by following the DOI link.In this paper, three families o...
AbstractTo overcome the “order barrier” imposed by A-stability on linear multistep methods (LMMs), U...
We investigate algebraic stability of two-step Runge-Kutta (TSRK) methods and of the new class of tw...
In this paper we present a family of explicit formulas for the numerical solution of differential eq...
ABSTRACT: In this paper, efficient AdamsBashforth Runge-Kutta (ABRK) method are constructed.This is ...
Adams-Moulton methods for k = 2 and k = 3 were constructed together with their c...
AbstractAdams predictor–corrector methods are among the most widely used algorithms for solving init...
A special class of fc-step Runge-Kutta methods is investigated which is generated by (non-linear) Ch...
An algorithm is developed to determine coefficients of the stability polynomials such that the expli...
AbstractNonlinear optimization and root-finding procedures were used to locate Adams-type methods wi...
AbstractIn this paper, the two-parameter family of order four, step-number five, Adams-type methods ...
AbstractStiffly stable Adams type methods of order 4, 5 and 6 and stepnumber 6, 7 and 9, respectivel...
AbstractWe describe the construction of explicit two-step Runge–Kutta methods of order p and stage o...
We describe the search for A-stable and algebraically stable two-step Runge Kutta methods of order p...
AbstractThis paper investigates a family of explicit two-step, two-stage Runge—Kutta methods in whic...
The Publisher's final version can be found by following the DOI link.In this paper, three families o...
AbstractTo overcome the “order barrier” imposed by A-stability on linear multistep methods (LMMs), U...
We investigate algebraic stability of two-step Runge-Kutta (TSRK) methods and of the new class of tw...
In this paper we present a family of explicit formulas for the numerical solution of differential eq...
ABSTRACT: In this paper, efficient AdamsBashforth Runge-Kutta (ABRK) method are constructed.This is ...
Adams-Moulton methods for k = 2 and k = 3 were constructed together with their c...
AbstractAdams predictor–corrector methods are among the most widely used algorithms for solving init...
A special class of fc-step Runge-Kutta methods is investigated which is generated by (non-linear) Ch...
An algorithm is developed to determine coefficients of the stability polynomials such that the expli...