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Linear and Multilinear Algebra Volume 67, 2019 - Issue 9
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Original Articles

Operator refinements of Schwarz inequality in inner product spaces

Silvestru Sever DragomirMathematics, College of Engineering & Science, Victoria University, Melbourne, Australia.;DST-NRF Centre of Excellence in the Mathematical and Statistical Sciences, School of Computer Science & Applied Mathematics, University of the Witwatersrand, Johannesburg, South Africa.Correspondence[email protected]
Pages 1839-1855 | Received 04 Dec 2017, Accepted 29 Apr 2018, Published online: 03 Jun 2018

References

  • Walker SG. A self-improvement to the Cauchy--Schwarz inequality. Stat Probab Lett. 2017;122:86–89.
  • Dragomir SS. Improving Schwarz inequality in inner product spaces. RGMIA Res Rep Coll. 20;2017. Preprint. Art. See also. Available from: http://arxiv.org/abs/1709.02029
  • Dragomir SS. A survey on Cauchy--Bunyakovsky--Schwarz type discrete inequalities. J Inequal Pure Appl Math. 2003;4(3). 142 p. Article 63 [Online]. Available from; https://www.emis.de/journals/JIPAM/article301.html?sid=301
  • Dragomir SS. Discrete inequalities of the Cauchy--Bunyakovsky--Schwarz type. Hauppauge (NY): Nova Science Publishers Inc; 2004. x+225 p. ISBN: 1-59454-049-7.
  • Choi D. A generalization of the Cauchy--Schwarz inequality. J Math Inequal. 2016;10(4):1009–1012.
  • Han Y. Refinements of the Cauchy--Schwarz inequality for τ-measurable operators. J Math Inequal. 2016;10(4):919–931.
  • Omey E. On Xiang’s observations concerning the Cauchy--Schwarz inequality. Amer Math Monthly. 2015;122(7):696–698.
  • Pinelis I. On the Hölder and Cauchy--Schwarz inequalities. Amer Math Monthly. 2015;122(6):593–595.
  • Tuo L. Generalizations of Cauchy--Schwarz inequality in unitary spaces. J Inequal Appl. 2015;2015:201. 6 p.
  • Dragomir SS, Mond B. On the superadditivity and monotonicity of Schwarz’s inequality in inner product spaces. Contrib Macedonian Acad Sci Arts. 1994;15(2):5–22.
  • Dragomir SS. Advances in inequalities of the Schwarz, Triangle and Heisenberg type in inner product spaces. New York (NY): Nova Science Publishers Inc.; 2007. xii+243 p. ISBN: 978-1-59454-903-8; 1-59454-903-6.
  • Dragomir SS. Advances in inequalities of the Schwarz, Grüss and Bessel type in inner product spaces. Hauppauge (NY): Nova Science Publishers Inc.; 2005. viii+249 p. ISBN: 1-59454-202-3.

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