18 p.This paper investigates the presence of oscillating solutions in time-varying difference equations even in the case when there exist parametrical errors (i.e., errors in the sequences defining their coefficients) and/or unmodeled dynamics, namely, the current order is unknown and greater than the nominal known order. The formulation is related to the concepts of conjugacy, disconjugacy, positivity, and generalized zeros and general conditions of oscillation are obtained both over particular intervals and for the whole solution. Some results concerned with the presence of stable oscillations are also presented.Ministerio de Educación - Grant DPI 2006-0071
In past years mathematical models of natural occurrences were either entirely continuous or discrete...
AbstractIn this paper we study the oscillatory behavior, the boundedness of the solutions, and the g...
AbstractCriteria are given to determine the oscillatory property of solutions of the nonlinear diffe...
18 p.This paper investigates the presence of oscillating solutions in time-varying difference equati...
AbstractSome linear difference equations with periodic coefficients (not necessarily nonnegative) ar...
We review some theorems and mistakes in linearized oscillation results for difference equations with...
AbstractSufficient conditions are derived for all bounded solutions of a linear system of differenti...
Difference equations and differential equations have been a focus of interest, because there is a ve...
The study of oscillatory phenomena is an important part of the theory of differential equations. Osc...
AbstractIn this paper, we shall discuss oscillatory behavior of the solutions of difference equation...
AbstractThis paper is concerned with the oscillatory behavior of a linear difference system, either ...
summary:This paper is concerned with the oscillatory behavior of first-order nonlinear difference eq...
It is noteworthy to observe that a first-order linear ordinary differential equation without delay ...
summary:In this paper, by using an iterative scheme, we advance the main oscillation result of Zhang...
summary:Sufficient oscillation conditions involving $\limsup $ and $\liminf $ for first-order differ...
In past years mathematical models of natural occurrences were either entirely continuous or discrete...
AbstractIn this paper we study the oscillatory behavior, the boundedness of the solutions, and the g...
AbstractCriteria are given to determine the oscillatory property of solutions of the nonlinear diffe...
18 p.This paper investigates the presence of oscillating solutions in time-varying difference equati...
AbstractSome linear difference equations with periodic coefficients (not necessarily nonnegative) ar...
We review some theorems and mistakes in linearized oscillation results for difference equations with...
AbstractSufficient conditions are derived for all bounded solutions of a linear system of differenti...
Difference equations and differential equations have been a focus of interest, because there is a ve...
The study of oscillatory phenomena is an important part of the theory of differential equations. Osc...
AbstractIn this paper, we shall discuss oscillatory behavior of the solutions of difference equation...
AbstractThis paper is concerned with the oscillatory behavior of a linear difference system, either ...
summary:This paper is concerned with the oscillatory behavior of first-order nonlinear difference eq...
It is noteworthy to observe that a first-order linear ordinary differential equation without delay ...
summary:In this paper, by using an iterative scheme, we advance the main oscillation result of Zhang...
summary:Sufficient oscillation conditions involving $\limsup $ and $\liminf $ for first-order differ...
In past years mathematical models of natural occurrences were either entirely continuous or discrete...
AbstractIn this paper we study the oscillatory behavior, the boundedness of the solutions, and the g...
AbstractCriteria are given to determine the oscillatory property of solutions of the nonlinear diffe...