This article investigates fractional Opial-type inequalities within the framework of conformable calculus. The results are established using conformable fractional analogues of Hölder's inequality, the integration by parts formula, and the chain rule. Several classical integral Opial-type inequalities are derived as special cases of the main results, demonstrating the generality and applicability of the proposed approach. Notably, the paper highlights a structural symmetry between the new inequalities and those previously established in the literature.
Al-Shehri et al. (Thu,) studied this question.