q-difference equations associated with the Rubin's q-difference operator $\partial_{q}$
Abstract
The aim of this paper is to prove the existence and uniqueness of solutions of the following - Cauchy problem of second order linear -difference problem associated with the Rubin's - difference operator in a neighborhood of zero \begin{equation} \left\{ \begin{array}{cc} q\,a_0(x)\, \partial_q^2y(qx)\, +\ ,a_1(x)\,\partial_qy(x)\, + \,a_2(x)y(x) &\; = \;b(x),\quad \hbox{if is odd;}\\ q\,a_0(x) \partial_q^2y(qx)\, + \,q\,a_1(x)\partial_qy(qx)\, + \,a_2(x)y(x)&\; = \;b(x),\quad \hbox{if is even,} \end{array} \right. \end{equation} with the initial conditions \begin{equation} \partial_{q}^{i-1}y(0)= b_{i};\quad b_{i} \in{\mathbb{C}},\; i=1,2 \end{equation} where , , and are defined, continuous at zero and bounded on an interval containing zero such that for all . Then, as application of the main results, we study the second order homogenous linear - difference equations as well as the -Wronskian associated with the Rubin's -difference operator . Finally, we construct a fundamental set of solutions for the second order linear homogeneous -difference equations in the cases when the coefficients are constants and for all .
Cite
@article{arxiv.2001.10901,
title = {q-difference equations associated with the Rubin's q-difference operator $\partial_{q}$},
author = {Meniar Haddad and Marwa Mastouri},
journal= {arXiv preprint arXiv:2001.10901},
year = {2020}
}
Comments
23 pages