Simpson's Second-Type Inequalities for Co-Ordinated Convex Functions and Applications for Cubature Formulas

Inequality theory has attracted considerable attention from scientists because it can be used in many fields. In particular, Hermite-Hadamard and Simpson inequalities based on convex functions have become a cornerstone in pure and applied mathematics. We deal with Simpson's second-type inequalities based on coordinated convex functions in this work. In this paper, we first introduce Simpson's second-type integral inequalities for two-variable functions whose second-order partial derivatives in modulus are convex on the coordinates. In addition, similar results are acquired by considering that powers of the absolute value of second-order partial derivatives of these two-variable functions are convex on the coordinates. Finally, some applications for Simpson's 3/8 cubature formula are given.

Anahtar Kelimeler

Coordinated Convex Functions, Simpson's Type Inequality

Kaynak

Fractal and Fractional

WoS Q Değeri

Q1

Scopus Q Değeri

Q1

Cilt

6

Sayı

1

Bağlantı

https://doi.org/10.3390/fractalfract6010033
https://hdl.handle.net/11772/20164

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WoS İndeksli Yayınlar Koleksiyonu
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Simpson's Second-Type Inequalities for Co-Ordinated Convex Functions and Applications for Cubature Formulas

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Yazarlar

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Araştırma projeleri

Organizasyon Birimleri

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