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Abstract
The authors prove two local attractivity and asymptotic stability results for a hybrid functional nonlinear fractional integral equation under weak Lipschitz and compactness type conditions. It is shown that comparable solutions of the equation are uniformly locally ultimately attractive and asymptotically stable on unbounded intervals of the real line. Their proofs rely on a recent measure theoretic fixed point theorem of Dhage.
Notes
No potential conflict of interest was reported by the authors.