COMPARISONS OF HEINZ OPERATOR MEANS WITH DIFFERENT PARAMETERS
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Published:
Feb 28, 2019
Keywords:
Heinz means positive operator unitarily invariant norm inequality monotonicity principle
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Abstract
This article aims to present new comparisons of Heinz operator means with different parameters by the help of appropriate scalar comparisons and the monotonicity principle for bounded self-adjoint Hilbert space operators. In particular, for any positive operators, we establish the inequality
where satisfying
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How to Cite
Burqan, A. A. A.-J. (2019). COMPARISONS OF HEINZ OPERATOR MEANS WITH DIFFERENT PARAMETERS. Malaysian Journal of Science, 38(Sp 1), 33–42. https://doi.org/10.22452/mjs.sp2019no1.3
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ICMSS2018 (Published)
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References
Bhatia R. and Davis C. (1993). More matrix forms of the arithmetic-geometric mean inequality. SIAM Journal on Matrix Analysis and Applications 14: 132-136.
Bhatia R. (2006). Interpolating the arithmetic-geometric mean inequality and its operator version. Linear Algebra and its Applications 413: 355-363.
Kittaneh F. (2010). On the convexity of the Heinz means. Integral Equations and Operator Theory 68: 519-527.
Kittaneh F., Krnić M., LovriÄević N. and PeÄarić J. (2012). Improved arithmetic-geometric and Heinz means inequalities for Hilbert space operators. Publicationes Mathematicae Debrecen 80: 465-478.
Kittaneh F.and Krnić M. (2013). Refined Heinz operator inequalities. Linear and Multilinear Algebra 61: 1148-1157.
Kittaneh F. and Manasrah Y. (2010). Improved young and Heinz inequalities for matrices. Journal of Mathematical Analysis and Applications 361: 262-269.
Kittaneh F. and Manasrah Y. (2011). Reverse Young and Heinz inequalities for matrices. Linear and Multilinear Algebra 59: 1031-1037.
PeÄarić J. , Furuta T., Mićić Hot J. and Seo Y. ( 2005). Mond-PeÄarić Method in Operator Inequalities. Inequalities for bounded selfadjoint operators on a Hilbert space. Monographs in Inequalities, 1. Zagreb: Element.
Zhan X. (1998). Inequalities for unitarily invariant norms. SIAM Journal on Matrix Analysis and Applications 20: 466-470.
Bhatia R. (2006). Interpolating the arithmetic-geometric mean inequality and its operator version. Linear Algebra and its Applications 413: 355-363.
Kittaneh F. (2010). On the convexity of the Heinz means. Integral Equations and Operator Theory 68: 519-527.
Kittaneh F., Krnić M., LovriÄević N. and PeÄarić J. (2012). Improved arithmetic-geometric and Heinz means inequalities for Hilbert space operators. Publicationes Mathematicae Debrecen 80: 465-478.
Kittaneh F.and Krnić M. (2013). Refined Heinz operator inequalities. Linear and Multilinear Algebra 61: 1148-1157.
Kittaneh F. and Manasrah Y. (2010). Improved young and Heinz inequalities for matrices. Journal of Mathematical Analysis and Applications 361: 262-269.
Kittaneh F. and Manasrah Y. (2011). Reverse Young and Heinz inequalities for matrices. Linear and Multilinear Algebra 59: 1031-1037.
PeÄarić J. , Furuta T., Mićić Hot J. and Seo Y. ( 2005). Mond-PeÄarić Method in Operator Inequalities. Inequalities for bounded selfadjoint operators on a Hilbert space. Monographs in Inequalities, 1. Zagreb: Element.
Zhan X. (1998). Inequalities for unitarily invariant norms. SIAM Journal on Matrix Analysis and Applications 20: 466-470.