A β-Sturm Liouville problem associated with the general quantum operator

Abstract

Let \,I⊂eqR\, be an interval and \,β:\,I→\,I\, a strictly increasing and continuous function with a unique fixed point \,s0∈ I\, which satisfies \,(s0-t)(β(t)-t)≥ 0\, for all \,t∈ I, where the equality holds only when \,t=s0. The general quantum operator defined in 2015 by Hamza et al., \,Dβ[f](t):=f(β(t))-f(t)β(t)-t\, if \,t≠ s0\, and \,Dβ[f](s0):=f(s0)\, if \,t=s0, generalizes the Jackson \,q-operator \,Dq\, and also the Hahn \,(q,ω)-operator, \,Dq,ω. Regarding a β-Sturm Liouville eigenvalue problem associated with the above operator \,Dβ\,, we construct the β-Lagrange's identity, show that it is self-adjoint in \,Lβ2([a,b]), and exhibit some properties for the corresponding eigenvalues and eigenfunctions.

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