This paper is a continuation of [3] in which some inequalities for the Schatten p-norm were considered. The purpose of the present paper is to improve some inequalities in [3] as well as to give more inequalities in the same spirit.Let H be a separable, infinite dimensional complex Hilbert space, and let B(H) denote the algebra of all bounded linear operators acting on H. Let K(H) denote the closed two-sided ideal of compact operators on H. For any compact operator A, let |A| = (A*A)1⁄2 and s1(A), s2(A),... be the eigenvalues of |A| in decreasing order and repeated according to multiplicity. A compact operator A is said to be in the Schatten p-class Cp(1 ≤ p < ∞), if Σ s1(A)p < ∞. The Schatten p-norm of A is defined by ∥A∥p = (Σ si(A)p)1/p. This norm makes Cp into a Banach space. Hence C1 is the trace class and C2 is the Hilbert-Schmidt class. It is reasonable to let C∞ denote the ideal of compact operators K(H), and ∥.∥∞ stand for the usual operator norm.
Kittaneh, Fuad. Inequalities for the Schatten p-norm II. Glasgow mathematical journal, Tome 29 (1987) no. 1, pp. 99-104. doi: 10.1017/S0017089500006716
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author = {Kittaneh, Fuad},
title = {Inequalities for the {Schatten} p-norm {II}},
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pages = {99--104},
year = {1987},
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doi = {10.1017/S0017089500006716},
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AU - Kittaneh, Fuad
TI - Inequalities for the Schatten p-norm II
JO - Glasgow mathematical journal
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DO - 10.1017/S0017089500006716
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