q-difference equations associated with the Rubin's q-difference operator ∂q

Abstract

The aim of this paper is to prove the existence and uniqueness of solutions of the following q- Cauchy problem of second order linear q-difference problem associated with the Rubin's q- difference operator ∂q in a neighborhood of zero equation \ arraycc q\,a0(x)\, ∂q2y(qx)\, +\ ,a1(x)\,∂qy(x)\, + \,a2(x)y(x) &\; = \;b(x), if y is odd;\\ q\,a0(x) ∂q2y(qx)\, + \,q\,a1(x)∂qy(qx)\, + \,a2(x)y(x)&\; = \;b(x), if y is even, array . equation with the initial conditions equation ∂qi-1y(0)= bi; bi ∈C,\; i=1,2 equation where ai, i=0,1,2, and b are defined, continuous at zero and bounded on an interval I containing zero such that a0(x)≠ 0 for all x∈ I. Then, as application of the main results, we study the second order homogenous linear q- difference equations as well as the q-Wronskian associated with the Rubin's q-difference operator ∂q. Finally, we construct a fundamental set of solutions for the second order linear homogeneous q-difference equations in the cases when the coefficients are constants and a1(x)=0 for all x∈ I.