Notes on Krasnoselskii-type fixed-point theorems and their application to fractional hybrid differential problems

Abstract

In this paper we prove a new version of Kransoselskii's fixed-point theorem under a (, θ, )-weak contraction condition. The theoretical result is applied to prove the existence of a solution of the following fractional hybrid differential equation involving the Riemann-Liouville differential and integral operators orders of 0<α<1 and β>0: equation \arrayll Dα[x(t)-f(t, x(t))]=g(t, x(t), Iβ(x(t))), \,\,\, a.e. \,\,\, t∈ J,\,\, β>0,\\ x(t0)=x0, array . equation where Dα is the Riemann-Liouville fractional derivative order of α, Iβ is Riemann-Liouville fractional integral operator order of β>0, J=[t0, t0+a], for some fixed t0∈ R, a>0 and the functions f:J× R→ R and g:J× R× R→ R satisfy certain conditions. An example is also furnished to illustrate the hypotheses and the abstract result of this paper.