A fixed-point approach for decaying solutions of difference equations
Abstract
A boundary value problem associated to the difference equation with advanced argument \begin{equation} \label{*}\Delta\bigl (a_{n}\Phi(\Delta x_{n})\bigr)+b_{n}\Phi(x_{n+p} )=0,\ \ n\geq1 \tag{} \end{equation} is presented, where sgn is a positive integer and the sequences are positive. We deal with a particular type of decaying solutions of (\ref{*}), that is the so-called intermediate solutions (see below for the definition) . In particular, we prove the existence of these type of solutions for (\ref{*}) by reducing it to a suitable boundary value problem associated to a difference equation without deviating argument. Our approach is based on a fixed point result for difference equations, which originates from existing ones stated in the continuous case. Some examples and suggestions for future researches complete the paper.
Cite
@article{arxiv.2011.12033,
title = {A fixed-point approach for decaying solutions of difference equations},
author = {Zuzana Došlá and Mauro Marini and Serena Matucci},
journal= {arXiv preprint arXiv:2011.12033},
year = {2025}
}
Comments
accepted for publication on Philosophical Transactions of the Royal Society A. Issue: Topological degree and fixed point theories in differential and difference equations Editors: Maria Patrizia Pera and Marco Spadini