Gulati, et al. Dragomir and J. Roumeliotis, Some Ostrowski type inequalities for time differentiable mappings and applications, Demonstratio Mathematica, 32 2 , pp. Cristescu, Hadamard type inequalities for convolution of h convex functions. Tiberiu Popoviciu Semin. Convexity 8 , 3— KSIAM 3 1 , KSIAM5 1 , Dragomir, Ostrowski type inequalities for isotonic linear functionals, J. Dragomir, An inequality improving the first Hermite-Hadamard inequality for convex functions defined on linear spaces and applications for semi-inner products.

Pure Appl.

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Dragomir, An inequality improving the first Hermite-Hadamard inequality for convex functions defined on linear spaces and applications for semi-inner products, J. Dragomir, An inequality improving the second Hermite-Hadamard inequality for convex functions defined on linear spaces and applications for semi-inner products, J. Dragomir, An Ostrowski like inequality for convex functions and applications, Revista Math. Complutense, 16 2 , — Springer Briefs in Mathematics. Springer, New York, ISBN: Dragomir, P.

Cerone, J. Roumeliotis and S. Romanie, 42 90 4, — Dragomir and S. Fitzpatrick, The Hadamard inequalities for s-convex functions in the second sense. Demonstratio Math. Fitzpatrick, The Jensen inequality for s-Breckner convex functions in linear spaces. Dragomir and B. Indian J. Dragomir and C. Dragomir, C. Dragomir, J. Persson, Some inequalities of Hadamard type, Soochow J. Dragomir and Th.

Godunova and V. Levin, Inequalities for functions of a broad class that contains convex, monotone and some other forms of functions. Russian Numerical mathematics and mathematical physics Russian , —, , Moskov. Hudzik and L. Maligranda, Some remarks on s-convex functions, Aeq. Kikianty and S. Kirmaci, M.

Latif, On some inequalities for h-convex functions, Int. Ruse , 4 no. Canada, 12 no.

Cerone andS. Dragomir , Midpoint-type rules from an inequalities point of view, Ed.

## Operator Inequalities of Ostrowski and Trapezoidal Type | Silvestru Sever Dragomir | Springer

Gulati, et al. Cerone , S. Dragomir and J. Roumeliotis , Some Ostrowski type inequalities for n-time differentiable mappings and applications, Demonstratio Mathematica, 32 2 , pp. Cristescu, Hadamard type inequalities for convolution of h-convex functions. Tiberiu Popoviciu Semin. Convexity 8, pp. Dragomir , Refinements of the Hermite-Hadamard integral inequality for log-convex functions, Austral.

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KSIAM, 3 1 , pp. Dragomir , Ostrowski type inequalities for isotonic linear functionals, J. Dragomir, An inequality improving the first Hermite-Hadamard inequality for convex functions defined on linear spaces and applications for semi-inner products. Pure Appl. Dragomir, An inequality improving the first Hermite-Hadamard inequality for convex functions defined on linear spaces and applications for semi-inner products, J.

Pure and Appl. Dragomir, An inequality improving the second HermiteHadamard inequality for convex functions defined on linear spaces and applications for semi-inner products, J.

## Norm inequalities of Čebyšev type for power series in Banach algebras

Dragomir, An Ostrowski like inequality for convex functions and applications, Revista Math. Complutense, 16 2 , pp. Springer Briefs in Mathematics. Springer, New York, Dragomir , P. Cerone , J. Roumeliotis and S. Romanie, 42 90 4 , pp. Dragomir and S. Fitzpatrick, The Hadamard inequalities for sconvex functions in the second sense. Demonstratio Math. Dragomir andS. Fitzpatrick ,The Jensen inequality for s-Breckner convex functions in linear spaces.

Dragomir and B.

Dragomir and C. Dragomir , J.

## Norm inequalities of Čebyšev type for power series in Banach algebras

Persson, Some inequalities of Hadamard type. Soochow J. Dragomir and Th. Anz Ungar. In Hungarian.

- PDF Operator Inequalities of the Jensen, Čebyšev and Grüss Type (SpringerBriefs in Mathematics).
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Gill, C. Pearce andJ. Godunova and V. Levin, Inequalities for functions of a broad class that contains convex, monotone and some other forms of functions. Russian Numerical mathematics and mathematical physics Russian , , , Moskov. Hudzik and L. Maligranda, Some remarks on s-convex functions. Aequationes Math. Kikianty and S. Mathematical Inequalities Applications, Volume 13, Number 1, pp.

Kirmaci, M. Latif, On some inequalities for h-convex functions. Ruse 4, No.