Variational methods for fractional q-Sturm--Liouville Problems

Abstract

In this paper, we formulate a regular q-fractional Sturm--Liouville problem (qFSLP) which includes the left-sided Riemann--Liouville and the right-sided Caputo q-fractional derivatives of the same order α, α∈ (0,1). We introduce the essential q-fractional variational analysis needed in proving the existence of a countable set of real eigenvalues and associated orthogonal eigenfunctions for the regular qFSLP when α>1/2 associated with the boundary condition y(0)=y(a)=0. A criteria for the first eigenvalue is proved. Examples are included. These results are a generalization of the integer regular q-Sturm--Liouville problem introduced by Annaby and Mansour in [1].