Article ID Journal Published Year Pages File Type
9498160 Linear Algebra and its Applications 2005 8 Pages PDF
Abstract
Let A be a complex n × n matrix. We find lower bounds for its numerical radius r(A)=max{|x∗Ax|∣x∈Cn,x∗x=1}. First we choose x satisfying x∗x = 1 and compute ∣x∗Ax∣. We also improve the simple bound so obtained. Second, we applyr(A)=maxλzA+z¯A∗2z∈C,|z|=1where λ denotes the largest eigenvalue.
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Physical Sciences and Engineering Mathematics Algebra and Number Theory
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Lower bounds for the numerical radius
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