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Cogent Mathematics & Statistics Volume 5, 2018 - Issue 1
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Research Article

Hermite–Hadamard’s inequality and Cauchy-type mean operators for positive -semigroups

Gul I. Hina AslamPakistan Navy Engineering College, National University of Sciences and Technology, Karachi, Pakistan.Correspondence[email protected]
ORCID Iconhttps://orcid.org/0000-0003-4982-1558View further author information
ORCID Icon &
Matloob AnwarSchool of Natural Sciences, National University of Sciences and Technology, Islamabad, Pakistan.View further author information
|
Lishan LiuQufu Normal University, China.View further author information
(Reviewing Editor)
Article: 1446248 | Received 15 Jan 2018, Accepted 20 Feb 2018, Published online: 15 Mar 2018

References

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  • Aslam, G. I. H. , & Anwar, M. (2015a). Cauchy type means on one-parameter-group of operators. Journal of Mathematical Inequalities, 9(2), 631–639.
  • Aslam, G. I. H. , & Anwar, M. (2015b). About Jensen’s inequality and Cauchy’s type means for positive-semigroups. Journal of Semigroup Theory and Applications, Article 6 .
  • Bakry, D. (2004). Functional inequalities for Markov semigroups. Probability measures on groups (pp. 91–147). Mumbai: Tata Institute of Fundamental Research.
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  • Nagel, R. (Ed.). (1986). One-parameter semigroups of positive operators, Lecture notes in mathematics (Vol. 1184). Springer-Verlag.
  • Wang, F.-Y. (2005). Functional inequalities, Markov semigroups and spectral theory. Beijing: Science Press.
  • Wang, F.-Y. (2013). Harnack inequalities for stochastic partial differential equations. New York: Springer Heildleberg.

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