Singular value and unitarily invariant norm inequalities for sums and products of operators

被引:2
作者
Zhao, Jianguo [1 ]
机构
[1] Yangtze Normal Univ, Sch Math & Stat, Chongqing 408100, Peoples R China
来源
ADVANCES IN OPERATOR THEORY | 2021年 / 6卷 / 04期
关键词
Singular value; Concave functions; Unitarily invariant norms; Schatten p-norms; Commutator; Positive operators; Compact operators; COMMUTATORS;
D O I
10.1007/s43036-021-00160-3
中图分类号
O1 [数学];
学科分类号
0701 ; 070101 ;
摘要
In this note, we mainly investigate singular value and unitarily invariant norm inequalities for sums and products of operators. First, we present singular value inequality for the quantity AX+YB : let A, B, X and Y is an element of B(H) such that both A and B are positive operators. Then sj(((AX+YB) circle plus 0) <= s(j) (((K + M) circle plus (L-1 + N)), for j=1,2, ..., where K=1/2A+1/2A(1/2)vertical bar X*vertical bar(2)A(1/2) L-1=1/2B+1/2B(1/2)|Y|B-2(1/2) M=1/2|B-1/2(X+Y)*A(1/2) and N=1/2|A(1/2)(X+Y)B-1/2|. In addition, based on the above singular value inequality, we establish a unitarily invariant norm inequality for concave functions. These results generalize inequalities obtained by Audeh directly. Finally, we present another more general singular value inequality for Sigma(m)(i=1) Ai*Xi*Bi s(j) (Sigma(m)(i=1)A(i)*X-i*Bi circle plus 0) <= s(j) ((Sigma(m)(i=1)A(i)*f(i)(2)(|X-i|)A(i) circle plus (Sigma Bi-m(i=1)*gi2(|Xi*|)Bi)) j=1,2, where Ai Xi is an element of B(H) such that Ai B{i} (i=1,2, ... ,m are compact operators and (i=1,2, ... ,m are 2m nonnegative continuous functions on [0,+infinity) (i=1,2, ...mi=1,2,... ,m for t is an element of[0,+infinity).
引用
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页数:14
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