Description
Kato's Type Inequalities for Bounded Linear Operators in Hilbert Spaces, 1st ed. 2019
SpringerBriefs in Mathematics Series
Author: Dragomir Silvestru Sever
Language: English126 p. · 15.5x23.5 cm · Paperback
Description
/li>Contents
/li>Comment
/li>
Presents recent research on Kato's inequality for the benefit of a large class of researchers working on operator inequalities
Provides complete proofs of the main results that will allow researchers to try and extend Kato's inequality for semi-inner products in Banach spaces
Shows clear applications for numerical radius and norm inequalities to give the readers the possibility to compare them with other similar results
Gives extensions of Kato's inequality for functions of operators that will allow scientists to look for extensions to more general functional calculus than the continuous functional calculus