Journal of the Ramanujan Mathematical Society

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Young’s Inequality in Operator Algebras


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1 Department of Mathematics and Statistics, University of Regina, Regina, Saskatchewan S4S 0A2, Canada
     

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Young’s inequality in two variables is formulated so as to apply to positive Hilbert space operators. The Young-type operator inequalities herein occur in the context of von Neumann algebras, and apply to the singular numbers, the spectral preorder, and traces of positive operators. As an application, a Young inequality relative to tracial states on unital C∗-algebras is obtained and, if the tracial state is faithful, the cases of equality are completely determined.
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  • Young’s Inequality in Operator Algebras

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Authors

Douglas R. Farenick
Department of Mathematics and Statistics, University of Regina, Regina, Saskatchewan S4S 0A2, Canada
S. Mahmoud Manjegani
Department of Mathematics and Statistics, University of Regina, Regina, Saskatchewan S4S 0A2, Canada

Abstract


Young’s inequality in two variables is formulated so as to apply to positive Hilbert space operators. The Young-type operator inequalities herein occur in the context of von Neumann algebras, and apply to the singular numbers, the spectral preorder, and traces of positive operators. As an application, a Young inequality relative to tracial states on unital C∗-algebras is obtained and, if the tracial state is faithful, the cases of equality are completely determined.