schur multiplier norm of product of matrices
نویسندگان
چکیده
for a ∈ mn, the schur multiplier of a is defined as s a(x) =a ◦ x for all x ∈ mn and the spectral norm of s a can be stateas ∥s a∥ = supx,0 ∥a ∥x ◦x ∥ ∥. the other norm on s a can be definedas ∥s a∥ω = supx,0 ω(ω s( ax (x ) )) = supx,0 ωω (a (x ◦x ) ), where ω(a) standsfor the numerical radius of a. in this paper, we focus on therelation between the norm of schur multiplier of product of matrices and the product of norm of those matrices. this relation isproved for schur product and geometric product and some applications are given. also we show that there is no such relationfor operator product of matrices. furthermore, for positive definite matrices a and b with ∥s a∥ω ⩽ 1 and ∥s b∥ω ⩽ 1, we showthat a♯b = n(i − z)1/2c(i + z)1/2, for some contraction c andhermitian contraction z.
منابع مشابه
Schur product of matrices and numerical radius (range) preserving maps
Let F (A) be the numerical range or the numerical radius of a square matrix A. Denote by A◦B the Schur product of two matrices A and B. Characterizations are given for mappings on square matrices satisfying F (A ◦ B) = F (φ(A) ◦ φ(B)) for all matrices A and B. Analogous results are obtained for mappings on Hermitian matrices. 2000 Mathematics Subject Classification. 15A04, 15A18, 15A60
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عنوان ژورنال:
wavelet and linear algebraناشر: vali-e-asr university of rafsanjan
ISSN 2383-1936
دوره 2
شماره 1 2015
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