Abstract In this paper we have derived the fractional integral inequalities by defining exponentially ( s , m ) $(s,m)$ -convex functions. These inequalities provide upper bounds, boundedness, continuity, and Hadamard type inequality for fractional integrals containing an extended Mittag-Leffler function. The results about fractional integral operators for s-convex, m-convex, ( s , m ) $(s,m)$ -convex, exponentially convex, exponentially s-convex, and convex functions are direct consequences of presented results.
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