AbstractThe theory of approximate solutions is lack of a development on the area of nonlinear differential equations on time scales. One of the difficulties for developing a theory of series solutions for the homogeneous equations on time scales is that a formula for the multiplication of two generalized polynomials is not easily found. In this paper we present the formula for the multiplicity of two generalized polynomials on time scales
AbstractBy employing an interesting modification of the familiar multiplying-factor technique, which...
In this paper we study curves parametrized by a time scale parameter, introduce line delta and nabla...
AbstractIn this work, we generalize existing ideas of the univariate case of the time scales calculu...
ABSTRACT. Much work paralleling the standard theory of linear differential equations has been done r...
The study of dynamic systems on time scales not only unifies continuous and discrete processes, but ...
AbstractWe present the exact formula for multiplication by a polynomial of degree one. The obtained ...
The successive terms in a uniformly valid multitime expansion of the solutions of constant coefficie...
AbstractWe propose two notions of multiplicity for the solutions (Puiseux series) of differential po...
AbstractThe aim of this paper is to show that dynamic equations on time scales can be treated in the...
Abstract. We are concerned with the representation of polynomials for nabla dynamic equations on tim...
The method of multiple scales is a global perturbation technique that has resulted to be very useful...
While all the approximate methods mentioned or others that exist, give some specific solutions to th...
We consider first and second order linear dynamic equations on a time scale. Such equations contain ...
International Conference on Computational Science and Its Applications - ICCSA 2005; 9 May 2005 thro...
Calculus on time scales was established in 1988 by Stefan Hilger. It includes both the classical der...
AbstractBy employing an interesting modification of the familiar multiplying-factor technique, which...
In this paper we study curves parametrized by a time scale parameter, introduce line delta and nabla...
AbstractIn this work, we generalize existing ideas of the univariate case of the time scales calculu...
ABSTRACT. Much work paralleling the standard theory of linear differential equations has been done r...
The study of dynamic systems on time scales not only unifies continuous and discrete processes, but ...
AbstractWe present the exact formula for multiplication by a polynomial of degree one. The obtained ...
The successive terms in a uniformly valid multitime expansion of the solutions of constant coefficie...
AbstractWe propose two notions of multiplicity for the solutions (Puiseux series) of differential po...
AbstractThe aim of this paper is to show that dynamic equations on time scales can be treated in the...
Abstract. We are concerned with the representation of polynomials for nabla dynamic equations on tim...
The method of multiple scales is a global perturbation technique that has resulted to be very useful...
While all the approximate methods mentioned or others that exist, give some specific solutions to th...
We consider first and second order linear dynamic equations on a time scale. Such equations contain ...
International Conference on Computational Science and Its Applications - ICCSA 2005; 9 May 2005 thro...
Calculus on time scales was established in 1988 by Stefan Hilger. It includes both the classical der...
AbstractBy employing an interesting modification of the familiar multiplying-factor technique, which...
In this paper we study curves parametrized by a time scale parameter, introduce line delta and nabla...
AbstractIn this work, we generalize existing ideas of the univariate case of the time scales calculu...