Munir, A.Qayyum, A.Budak, H.Qaisar, S.Ali, U.Supadi, S. S.2025-10-112025-10-1120251823-8343https://doi.org/10.47836/mjms.19.1.02https://hdl.handle.net/20.500.12684/21491Convexity plays a crucial role in mathematical analysis, offering profound insights into the behavior of functions and geometric shapes. Fractional integral operators generalize the classical concept of integration to non-integer orders. In this paper, we establish a new identity by using the Caputo-Fabrizio fractional integral operator. Then by using this new identity, we obtain the corrected dual Simpson's type inequalities for s-convex functions. By employing the wellknown integral inequalities such as the H & ouml;lder's inequality and power-mean inequality, we obtain new error estimates. Furthermore, we discuss the applications to some special means and quadrature formula.en10.47836/mjms.19.1.02info:eu-repo/semantics/closedAccesscorrected dual-Simpson's type inequalitys- convex functionfractional integralsH & ouml;lder's inequalitypower-mean inequality.Article19117332-s2.0-105014113695WOS:001471423300002Q3N/A