Seth Kermausuor

Alabama State University

H-index: 9

North America-United States

About Seth Kermausuor

Seth Kermausuor, With an exceptional h-index of 9 and a recent h-index of 7 (since 2020), a distinguished researcher at Alabama State University, specializes in the field of Analysis, Mathematical Inequalities, Time Scales, Fractional Calculus.

His recent articles reflect a diverse array of research interests and contributions to the field:

A PARAMETER-BASED OSTROWSKI TYPE INEQUALITY FOR FUNCTIONS WHOSE DERIVATIVES BELONGS TO Lp ([a, b]) INVOLVING MULTIPLE POINTS

New Simpson’s type inequalities via (α1, m1)-(α2, m2)-preinvexity on the coordinates in both the first and second sense

Ostrowski Type Inequalities for Conformable Fractional Calculus via a Parameter

New Fractional Integral Inequalities via k-Atangana–Baleanu Fractional Integral Operators

New midpoint and trapezoidal-type inequalities for prequasiinvex functions via generalized fractional integrals

Analysis of a fractional-order COVID-19 epidemic model with lockdown

Hermite–Hadamard Type Inequalities for Coordinated Quasi-Convex Functions via Generalized Fractional Integrals

New integral inequalities of Hermite–Hadamard type via the Katugampola fractional integrals for strongly -quasiconvex functions

Seth Kermausuor Information

University	Alabama State University
Position	___
Citations(all)	249
Citations(since 2020)	225
Cited By	110
hIndex(all)	9
hIndex(since 2020)	7
i10Index(all)	9
i10Index(since 2020)	7
Email	Access Email
University Profile Page	Alabama State University
Google Scholar	View Google Scholar Profile

Seth Kermausuor Skills & Research Interests

Analysis

Mathematical Inequalities

Time Scales

Fractional Calculus

Top articles of Seth Kermausuor

Title	Journal	Author(s)	Publication Date
A PARAMETER-BASED OSTROWSKI TYPE INEQUALITY FOR FUNCTIONS WHOSE DERIVATIVES BELONGS TO Lp ([a, b]) INVOLVING MULTIPLE POINTS	Kragujevac Journal of Mathematics	SETH KERMAUSUOR	2023/5/1
New Simpson’s type inequalities via (α1, m1)-(α2, m2)-preinvexity on the coordinates in both the first and second sense	Open Journal of Mathematical Sciences	Seth Kermausuor	2023
Ostrowski Type Inequalities for Conformable Fractional Calculus via a Parameter		Miguel Vivas-Cortez Seth Kermausuor Juan E Nápoles Valdés	2023/10/17
New Fractional Integral Inequalities via k-Atangana–Baleanu Fractional Integral Operators	Fractal and Fractional	Seth Kermausuor Eze R Nwaeze	2023/10/8
New midpoint and trapezoidal-type inequalities for prequasiinvex functions via generalized fractional integrals	Stud. Univ. Babes-Bolyai Math	Seth Kermausuor Eze R Nwaeze	2022/12/1
Analysis of a fractional-order COVID-19 epidemic model with lockdown	Vaccines	Dawit Denu Seth Kermausuor	2022/10/22
Hermite–Hadamard Type Inequalities for Coordinated Quasi-Convex Functions via Generalized Fractional Integrals		Miguel Vivas-Cortez Seth Kermausuor Juan E Nápoles Valdés	2022/5/11
New integral inequalities of Hermite–Hadamard type via the Katugampola fractional integrals for strongly -quasiconvex functions	The Journal of Analysis	Seth Kermausuor Eze R Nwaeze	2021/9
A note on some new Hermite--Hadamard type inequalities for functions whose th derivatives are strongly -convex	International Journal of Nonlinear Analysis and Applications	Seth Kermausuor Eze R Nwaeze	2021/5/1
New Hermite-Hadamard type inequalities for m and (α, m)-convex functions on the coordinates via generalized fractional integrals	Proyecciones (Antofagasta)	Seth Kermausuor	2021
Caputo–Fabrizio fractional Hermite–Hadamard type and associated results for strongly convex functions	The Journal of Analysis	Eze R Nwaeze Seth Kermausuor	2021
Simpson’s type inequalities via the Katugampola fractional integrals for s-convex functions	Kragujevac journal of mathematics	SETH Kermausuor	2021/12/1
Strongly -convex functions with nonnegative modulus	Journal of Inequalities and Applications	Ana M Tameru Eze R Nwaeze Seth Kermausuor	2020/6/12
Algumas desigualdades úteis e o teste da segunda derivada	Professor de Matemática On Line	KERMAUSUOR KWESSI DE SOUZA	2020
OSTROWSKI–GRÜSS TYPE INEQUALITIES AND A 2D OSTROWSKI TYPE INEQUALITY ON TIME SCALES INVOLVING A COMBINATION OF∆-INTEGRAL MEANS	J. Math	SETH Kermausuor ER Nwaeze	2020
Generalized Ostrowski-type inequalities for s-convex functions on the coordinates via fractional integrals	Fractional Differ. Calc	SETH Kermausuor	2020/12/1