The article investigates a second-order nonlinear difference equation of Emden-Fowler type Δ2u(k)±kαum(k)=0,{\Delta }^{2}u\left(k)\pm {k}^{\alpha }{u}^{m}\left(k)=0, where kk is the independent variable with values k=k0,k0+1,…k={k}_{0},{k}_{0}+1,\ldots \hspace{0.33em}, u:{k0,k0+1,…}→Ru:\left\{{k}_{0},{k}_{0}+1,\ldots \hspace{0.33em}\right\}\to {\mathbb{R}} is the dependent variable, k0{k}_{0} is a fixed integer, and Δ2u(k){\Delta }^{2}u\left(k) is its second-order forward difference. New conditions with respect to parameters α∈R\alpha \in {\mathbb{R}} and m∈Rm\in {\mathbb{R}}, m≠1m\ne 1, are found such that the equation admits a solution asymptotically represented by a power function that is asymptotically equivalent to the exact solution o...
We study the difference equation xn+1=α−xn/xn−1, n∈ℕ0, where α∈ℝ and where x−1 and x0 are so chosen ...
The present paper considers a discrete Emden-Fowler-type equation. It is proved that there exists at...
We study the difference equation xn+1 = α − xn/xn−1, n ∈ N0, where α ∈ R and where x−1 and x0 are so...
This contribution is devoted to the investigation of the asymptotic behavior of the solution of a sp...
V literatuře je často studována Emden--Fowlerova nelineární diferenciální rovnice druhého řádu $$ y'...
The paper derives an asymptotic formula describing the long-time behaviour of a solutionof a nonline...
AbstractThe asymptotic behavior of the solutions of the second-order difference equation Δ2x(n) = ƒ(...
In this dissertation, differential equations of the fourth order, difference equation of second orde...
AbstractIt is known that if ∑∞j |pj| < ∞ then the Emden-Fowler difference equation (A) Δ2yn−1 = pnyγ...
We study the higher order difference equations of the following form \[ \Delta^m x_n=a_nf(x_{\sigma...
summary:Asymptotic properties of the solutions of the second order nonlinear difference equation (wi...
summary:We study oscillatory properties of solutions of the Emden-Fowler type differential equation ...
We describe the asymptotic behaviour and the stability properties of the solutions to the nonlinear ...
AbstractSome new results are obtained for the asymptotic behavior of the following second-order nonl...
AbstractFor second-order linear and nonlinear difference equations some qualitative properties of so...
We study the difference equation xn+1=α−xn/xn−1, n∈ℕ0, where α∈ℝ and where x−1 and x0 are so chosen ...
The present paper considers a discrete Emden-Fowler-type equation. It is proved that there exists at...
We study the difference equation xn+1 = α − xn/xn−1, n ∈ N0, where α ∈ R and where x−1 and x0 are so...
This contribution is devoted to the investigation of the asymptotic behavior of the solution of a sp...
V literatuře je často studována Emden--Fowlerova nelineární diferenciální rovnice druhého řádu $$ y'...
The paper derives an asymptotic formula describing the long-time behaviour of a solutionof a nonline...
AbstractThe asymptotic behavior of the solutions of the second-order difference equation Δ2x(n) = ƒ(...
In this dissertation, differential equations of the fourth order, difference equation of second orde...
AbstractIt is known that if ∑∞j |pj| < ∞ then the Emden-Fowler difference equation (A) Δ2yn−1 = pnyγ...
We study the higher order difference equations of the following form \[ \Delta^m x_n=a_nf(x_{\sigma...
summary:Asymptotic properties of the solutions of the second order nonlinear difference equation (wi...
summary:We study oscillatory properties of solutions of the Emden-Fowler type differential equation ...
We describe the asymptotic behaviour and the stability properties of the solutions to the nonlinear ...
AbstractSome new results are obtained for the asymptotic behavior of the following second-order nonl...
AbstractFor second-order linear and nonlinear difference equations some qualitative properties of so...
We study the difference equation xn+1=α−xn/xn−1, n∈ℕ0, where α∈ℝ and where x−1 and x0 are so chosen ...
The present paper considers a discrete Emden-Fowler-type equation. It is proved that there exists at...
We study the difference equation xn+1 = α − xn/xn−1, n ∈ N0, where α ∈ R and where x−1 and x0 are so...