We implement a relatively new analytic iterative technique to get approximate solutions of differential algebraic equations system based on generalized Taylor series formula. The solution methodology is based on generating the residual power series expansion solution in the form of a rapidly convergent series with easily computable components. The residual power series method (RPSM) can be used as an alternative scheme to obtain analytical approximate solution of different types of differential algebraic equations system applied in mathematics. Simulations and test problems were analyzed to demonstrate the procedure and confirm the performance of the proposed method, as well as to show its potentiality, generality, viability, and simplicity...
The Taylor series method is one of the earliest analytic-numeric algorithms for approximate solution...
ton Method. In this talk we present a Modified Power Series Method for the solvabil-ity of a class o...
It is known that the mathematical model of many processes in our life is represented by differential...
This paper proposes power series method (PSM) in order to find solutions for singular partial differ...
In this unit solutions of linear differential equations by power series are discussed. Power series ...
The aim of the present analysis is to apply a relatively recent method, the residual-power series me...
This work presents new implementation of an iterative method proposed by Temimi and Ansari namely (T...
In this article, an attractive numeric–analytic algorithm, called the fractional residual power seri...
In this work, a powerful iterative method called residual power series method is introduced to obtai...
In this article a new approach in solving time fractional partial differential equations (TFPDEs) is...
The authors have developed a Taylor series method for solving numerically an initial-value problem d...
A method for obtaining numerical solutions to initial value problems by implementing a generalized m...
The development of numeric-analytic solutions and the construction of fractional-order mathematical ...
AbstractDifferential algebraic equations arise in many applications. In this paper, the homotopy per...
International audienceThis paper describes a generic Taylor series based continuation method, the so...
The Taylor series method is one of the earliest analytic-numeric algorithms for approximate solution...
ton Method. In this talk we present a Modified Power Series Method for the solvabil-ity of a class o...
It is known that the mathematical model of many processes in our life is represented by differential...
This paper proposes power series method (PSM) in order to find solutions for singular partial differ...
In this unit solutions of linear differential equations by power series are discussed. Power series ...
The aim of the present analysis is to apply a relatively recent method, the residual-power series me...
This work presents new implementation of an iterative method proposed by Temimi and Ansari namely (T...
In this article, an attractive numeric–analytic algorithm, called the fractional residual power seri...
In this work, a powerful iterative method called residual power series method is introduced to obtai...
In this article a new approach in solving time fractional partial differential equations (TFPDEs) is...
The authors have developed a Taylor series method for solving numerically an initial-value problem d...
A method for obtaining numerical solutions to initial value problems by implementing a generalized m...
The development of numeric-analytic solutions and the construction of fractional-order mathematical ...
AbstractDifferential algebraic equations arise in many applications. In this paper, the homotopy per...
International audienceThis paper describes a generic Taylor series based continuation method, the so...
The Taylor series method is one of the earliest analytic-numeric algorithms for approximate solution...
ton Method. In this talk we present a Modified Power Series Method for the solvabil-ity of a class o...
It is known that the mathematical model of many processes in our life is represented by differential...