Migda, Janusz Asymptotic behavior of solutions of nonlinear difference equations. (English) Zbl 1080.39501 Math. Bohem. 129, No. 4, 349-359 (2004). Summary: The nonlinear difference equation \[ x_{n+1}-x_n=a_n\varphi _n(x_{\sigma (n)})+b_n, \tag{\(\text{E}\)} \] where \((a_n), (b_n)\) are real sequences, \(\varphi _n\: \mathbb R\rightarrow \mathbb R\), \((\sigma (n))\) is a sequence of integers and \(\displaystyle\lim _{n\rightarrow \infty }\sigma (n)=\infty \), is investigated. Sufficient conditions for the existence of solutions of this equation asymptotically equivalent to the solutions of the equation \(y_{n+1}-y_n=b_n\) are given. Sufficient conditions under which for every real constant there exists a solution of equation (E) convergent to this constant are also obtained. Cited in 5 Documents MSC: 39A10 Additive difference equations Keywords:difference equation; asymptotic behavior PDFBibTeX XMLCite \textit{J. Migda}, Math. Bohem. 129, No. 4, 349--359 (2004; Zbl 1080.39501) Full Text: EuDML EMIS