[1]

New Integral Inequalities via the Katugampola Fractional Integrals for Functions Whose Second Derivatives Are Strongly ηConvex


2019 


[2]

Some new inequalities involving the Katugampola fractional integrals for strongly convex functions


2019 


[3]

Some HermiteHadamard type integral inequalities whose ntimes differentiable functions are slogarithmically convex functions


2019 


[4]

NEW INTEGRAL INEQUALITIES FOR r− CONVEX FUNCTION


2018 


[5]

On generalized HermiteHadamard type inequalities for three times differentiable QuasiConvex mappings


2018 


[6]

Integral Inequalities of Hermite–Hadamard Type for Extended sConvex Functions and Applications


Mathematics,
2018 


[7]

Integral inequalities of hermitehadamard type and their applications


2017 


[8]

HERMITE–HADAMARD TYPE INEQUALITIES FOR FRACTIONAL INTEGRALS


2017 


[9]

On Some New Hadamard Type Inequalities for CoOrdinated (Convex Functions


International Journal of Mathematics Trends and Technology,
2016 


[10]

Inequalities of Simpson type for functions whose third derivatives are extended sconvex functions and applications to means


2015 


[11]

Inequalities of Simpson Type for Functions Whose Third Derivatives Are Extended sConvex Functions and Applications to Means.


Journal of Computational Analysis & Applications,
2015 


[12]

s对数凸函数的 HermiteHadamard 型积分不等式


数学物理学报,
2015 


[13]

Some integral inequalities in terms of supremum norms of ntime differentiable functions


Appl. Math,
2014 


[14]

Generalized HermiteHadamard type integral inequalities for functions whose 3rd derivatives are sconvex


Tbilisi Mathematical Journal,
2014 


[15]

GENERALIZED HERMITE HADAMARD TYPE INTEGRAL INEQUALITIES FOR FUNCTIONS WHOSE 3RD DERIVATIVES ARE S CONVEX


MZ SARIKAYA, H BUDAK  rgmia.org,
2014 


[16]

INTEGRAL INEQUALITIES OF HERMITEHADAMARD TYPE FOR


AIP JI, TYU ZHANG, F QI,
2014 


[17]

On new inequalities of HermiteHadamard type for functions whose third derivative absolute values are quasiconvex with applications


Journal of the Egyptian Mathematical Society,
2014 


[18]

屬於 Q (I) 函數的一些積分不等式的研究


淡江大學數學學系碩士班學位論文,
2014 


[19]

On new inequalities of HermiteHadamard type for generalized convex functions


Italian journal of pure and applied mathematics,
2014 


[20]

Some HermiteHadamard type inequalities for geometrically quasiconvex functions


Proceedings Mathematical Sciences,
2014 


[21]

Some Hermite–Hadamard type inequalities for geometrically quasiconvex functions


Proceedings  Mathematical Sciences,
2014 


[22]

HermiteHadamard type inequalities for geometricarithmetically sconvex functions


Commun. Korean Math. Soc,
2014 


[23]

HermiteHadamard Type Inequalities for Functions whose Third Derivatives are Convex and sConvex


Applied Mathematical Sciences,
2014 


[24]

Generalizations on Some HermiteHadamard Type Inequalities for Differentiable Convex Functions with Applications to Weighted Means


The Scientific World Journal,
2014 


[25]

HermiteHadamard type inequalities via preinvexity and prequasiinvexity


arXiv preprint arXiv:1301.3447,
2013 


[26]

Some inequalities of HermiteHadamard type for GAconvex functions with applications to means


Le Matematiche,
2013 


[27]

Some inequalities of HermiteHadamard type for hconvex functions


Advances in Inequalities and Applications,
2013 


[28]

Some HermiteHadamardlike Type Inequalities for Logarithmically Convex Functions


Int. Journal of Math. Analysis,
2013 


[29]

HermiteHadamard type inequalities of functions whose derivatives of $ n $th order are $(\ alpha, m) $convex


arXiv preprint arXiv:1308.2948,
2013 


[30]

Integral inequalities of HermiteHadamard type for functions whose third derivatives are convex


Journal of Inequalities and Applications?,
2013 


[31]

New Integral Inequalities of the Type of HermiteHadamard Through Quasi Convexity


Journal of Mathematics (ISSN 10162526),
2013 


[32]

Some integral inequalities of HermiteHadamard type for extended (s, m)convex functions


Transylv. J. Math. Mechanics,
2013 


[33]

HermiteHadamard type inequalities for functions whose derivatives are of convexities


Nonlinear Functional Anlaysis and Applications,
2013 


[34]

Simpson type integral inequalities in which the power of the absolute value of the first derivative of the integrand is spreinvex


Facta Univ., Ser. Math. Inform,
2013 


[35]

Some integral inequalities of Simpson type for GA"convex functions


Georgian Math. J.,
2013 


[36]

New integral inequalities of the type of Hermite–Hadamard through quasi convexity


2013 


[37]

Integral inequalities of HermiteHadamard type for $(\alpha, m) $GAconvex functions


2013 


[38]

Some integral inequalities of Simpson type for GAɛconvex functions


Georgian Mathematical Journal,
2013 


[39]

Some integral inequalities of HermiteHadamard type for slogarithmically convex functions


Acta Mathematica Scientia (Chinese Edition), To appear,
2013 


[40]

Some Generalized Inequalities of HermiteHadamard Type for (α, m)GeometricArithmetically Convex Functions


Applied Mathematical Sciences,
2013 


[41]

HermiteHadamard type integral inequalities for functions whose first derivatives are of convexity


arXiv preprint arXiv:1305.5933,
2013 


[42]

Some integral inequalities of HermiteHadamard type for functions whose derivatives of th order are convex


2013 


[43]

Some integral inequalities of Simpson type for GAconvex functions


2013 


[44]

Some HermiteHadamard type inequalities for ntime differentiable convex functions


Journal of Inequalities and Applications,
2012 


[45]

Some inequalities of HermiteHadamard type for functions whose 3rd derivatives are Pconvex


Applied Mathematics,
2012 


[46]

Some HermiteHadamard type inequalities for ntime differentiableconvex functions


Journal of Inequalities and Applications,
2012 


[47]

Some HermiteHadamard type inequalities for ntime differentiable (α, m)convex functions


Journal of Inequalities and Applications,
2012 


[48]

On HermiteHadamard type inequalities for (α, m)convex functions


International Journal of Open Problems in Computer Science and Mathematics,
2012 


[49]

Integral Inequalities for functions whose 3rd derivatives belong to Q (I)


arXiv preprint arXiv:1212.1420,
2012 

