AbstractConsider the higher-order linear difference equation where m ≥ 1 is an odd integer, and {pn} is a sequence of nonnegative real numbers. We obtain several new sufficient conditions for the oscillation of all solutions of equation (*). Examples which dwell upon the importance of our results are also included
AbstractConsider the difference equation xn+1 − xn + pnxn−k = 0, where {pn} is a sequence of nonnega...
AbstractThe authors consider second-order difference equations of the type where α > 0 is the ratio...
Abstract. Consider the second order difference equation of the form ∆2(yn−1−pyn−1−k)+qnf(yn−ℓ) = 0,...
AbstractThe paper contain some new criteria for the oscillation of higher-order linear difference eq...
AbstractThe authors discuss the relation of the oscillation of the following two difference equation...
In this paper, some necessary and sufficient conditions for the oscillation of the higher order part...
In this paper, we shall consider higher order nonlinear delay difference equation of the type ∆mxn +...
AbstractIn this paper we consider the second order nonlinear difference equation[formula]where Δyn=y...
AbstractWe shall establish some new criteria for the oscillation of all solutions of higher-order di...
We consider the linear difference equation ∆ m xn + δanxn+1 =0 where m ≥ 2, δ = ±1 and{an} is a posi...
AbstractIn this paper, we obtain some sufficient conditions for the oscillation of all solutions of ...
Abstract. In this paper we shall present some new oscillation criteria for dierence equations of the...
AbstractIn this paper, we study the oscillatory and asymptotic behaviour of solutions of higher orde...
AbstractThe following difference equation with deviating arguments: is considered, where Δu(k) = u(...
AbstractIn this work, we shall consider higher order nonlinear neutral delay difference equation of ...
AbstractConsider the difference equation xn+1 − xn + pnxn−k = 0, where {pn} is a sequence of nonnega...
AbstractThe authors consider second-order difference equations of the type where α > 0 is the ratio...
Abstract. Consider the second order difference equation of the form ∆2(yn−1−pyn−1−k)+qnf(yn−ℓ) = 0,...
AbstractThe paper contain some new criteria for the oscillation of higher-order linear difference eq...
AbstractThe authors discuss the relation of the oscillation of the following two difference equation...
In this paper, some necessary and sufficient conditions for the oscillation of the higher order part...
In this paper, we shall consider higher order nonlinear delay difference equation of the type ∆mxn +...
AbstractIn this paper we consider the second order nonlinear difference equation[formula]where Δyn=y...
AbstractWe shall establish some new criteria for the oscillation of all solutions of higher-order di...
We consider the linear difference equation ∆ m xn + δanxn+1 =0 where m ≥ 2, δ = ±1 and{an} is a posi...
AbstractIn this paper, we obtain some sufficient conditions for the oscillation of all solutions of ...
Abstract. In this paper we shall present some new oscillation criteria for dierence equations of the...
AbstractIn this paper, we study the oscillatory and asymptotic behaviour of solutions of higher orde...
AbstractThe following difference equation with deviating arguments: is considered, where Δu(k) = u(...
AbstractIn this work, we shall consider higher order nonlinear neutral delay difference equation of ...
AbstractConsider the difference equation xn+1 − xn + pnxn−k = 0, where {pn} is a sequence of nonnega...
AbstractThe authors consider second-order difference equations of the type where α > 0 is the ratio...
Abstract. Consider the second order difference equation of the form ∆2(yn−1−pyn−1−k)+qnf(yn−ℓ) = 0,...
DOI
Add to ORKG