Unitarily invariant norm inequalities for operators

A. Niknam

Unitarily invariant norm inequalities for operators

Abstract

We present several operator and norm inequalities for Hilbert space operators. In particular, we prove that if A1,A2,...,An∈ B( H), then \[|||A1A2*+A2A3*+...+AnA1*|||≤|||Σi=1nAiAi*|||,\] for all unitarily invariant norms. We also show that if A1,A2,A3,A4 are projections in B( H), then &&|||(Σi=14(-1)i+1Ai)000|||&≤&|||(A1+|A3A1|) (A2+|A4A2|)(A3+|A1A3|)(A4+|A2A4|)||| for any unitarily invariant norm.

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