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Revision as of 18:52, 24 March 2012
In the sequel, a capital letter denotes a bounded linear operator on a Hilbert space . An operator is said to be positive (denoted by ) if for all .
The following Heinz–Kato–Furuta inequality can be considered as an extension of the Heinz–Kato inequality, since for the Heinz–Kato inequality is obtained from the Heinz–Kato–Furuta inequality.
The Heinz–Kato–Furuta inequality (1994; cf. [a2]): If and are positive operators such that and for all , then for all :
(a1) |
for all such that .
As generalizations of the Heinz–Kato–Furuta inequality, two determinant-type generalizations, expressed in terms of , and , can be obtained by using the Furuta inequality. It turns out that each of these two generalizations is equivalent to the Furuta inequality. Results similar to these determinant-type generalizations but under the conditions and , which are weaker than the original conditions and in the Heinz–Kato inequality, have also been obtained. A nice application of the Heinz–Kato–Furuta inequality is given in [a1].
Additional references can be found in Heinz inequality.
References
[a1] | M. Fujii, S. Izumino, R. Nakamoto, "Classes of operators determined by the Heinz–Kato–Furuta inequality and the Hölder–MacCarthy inequality" Nihonkai Math. J. , 5 (1994) pp. 61–67 |
[a2] | T. Furuta, "An extension of the Heinz–Kato theorem" Proc. Amer. Math. Soc. , 120 (1994) pp. 785–787 |
Heinz-Kato-Furuta inequality. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Heinz-Kato-Furuta_inequality&oldid=22563