AbstractIn this article, we present new algorithms for the nonclassic Adomian polynomials, which are valuable for solving a wide range of nonlinear functional equations by the Adomian decomposition method, and introduce their symbolic implementation in MATHEMATICA. Beginning with Rach’s new definition of the Adomian polynomials, we derive the explicit expression for each class of the Adomian polynomials, e.g. Am=∑k=1mf(k)(u0)Zm,k for the Class II, III and IV Adomian polynomials, where the Zm,k are called the reduced polynomials. These expressions provide a basis for developing improved algorithmic approaches. By introducing the index vectors, the recurrence algorithms for the reduced polynomials are suitably deduced, which naturally lead to...
In this paper, a new formula for Adomian polynomials is introduced. Based on this new formula, error...
Abstract: In the present paper, we derive some families of polynomials. Some further results of thes...
International audienceWe study the complexity of computing one or several terms (not necessarily con...
AbstractIn this article, we present new algorithms for the nonclassic Adomian polynomials, which are...
In this paper, we introduce a new Algorithm for calculating Ado-mian polynomials and present some ex...
In this paper, we discuss two simple parametrization methods for calculating Adomian polynomials for...
Adomian Decomposition method is a well known device for solv-ing many functional equations such as d...
We will compare the standard Adomian decomposition method and the homotopy perturbation method appli...
AbstractIn this paper, we develop new numeric modified Adomian decomposition algorithms by using the...
AbstractZeilberger's algorithm provides a method to compute recurrence and differential equations fr...
AbstractIn this paper, we give new formulae which calculate easily the Adomian's polynomials used in...
AbstractRecent important generalizations by G. Adomian (“Stochastic Systems”, Academic Press 1983) h...
Abstract. In this paper we derive factorizations and representations of a polynomial analogue of an ...
This habilitation thesis deals with polynomial system solving through Gröbner bases computations. I...
AbstractIn this paper, we introduce a new algorithm for applying the Adomian decomposition method to...
In this paper, a new formula for Adomian polynomials is introduced. Based on this new formula, error...
Abstract: In the present paper, we derive some families of polynomials. Some further results of thes...
International audienceWe study the complexity of computing one or several terms (not necessarily con...
AbstractIn this article, we present new algorithms for the nonclassic Adomian polynomials, which are...
In this paper, we introduce a new Algorithm for calculating Ado-mian polynomials and present some ex...
In this paper, we discuss two simple parametrization methods for calculating Adomian polynomials for...
Adomian Decomposition method is a well known device for solv-ing many functional equations such as d...
We will compare the standard Adomian decomposition method and the homotopy perturbation method appli...
AbstractIn this paper, we develop new numeric modified Adomian decomposition algorithms by using the...
AbstractZeilberger's algorithm provides a method to compute recurrence and differential equations fr...
AbstractIn this paper, we give new formulae which calculate easily the Adomian's polynomials used in...
AbstractRecent important generalizations by G. Adomian (“Stochastic Systems”, Academic Press 1983) h...
Abstract. In this paper we derive factorizations and representations of a polynomial analogue of an ...
This habilitation thesis deals with polynomial system solving through Gröbner bases computations. I...
AbstractIn this paper, we introduce a new algorithm for applying the Adomian decomposition method to...
In this paper, a new formula for Adomian polynomials is introduced. Based on this new formula, error...
Abstract: In the present paper, we derive some families of polynomials. Some further results of thes...
International audienceWe study the complexity of computing one or several terms (not necessarily con...