A new study on Simpson's type inequalities via generalized convexity with application
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Abstract
Convexity plays a crucial role in the development of fractional integral inequalities. A large number of fractional integral inequalities are obtained by use of convexity methods and attributes. In this paper, we use generalized the convex functions to derive new Simpson's inequalities. Additionally, several novel connected findings of Simpson's inequality for concave functions
are generated. Also included in the design are several new applications to specifc real number methods.
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