Singular Value Inequalities for Compact Normal Operators

Wasim Audeh
2013 Advances in Linear Algebra and Matrix Theory  
We give singular value inequality to compact normal operators, which states that if A is compact normal operator on a complex separable Hilbert space, where 1 2 A A iA   is the cartesian decomposition of A , then  Several inequalities will be proved.
doi:10.4236/alamt.2013.34007 fatcat:j4w7tgzpenbwfkpufyulwspqje