Further properties of accretive matrices

Shigeru Furuichi; Hamid Reza Moradi; Mohammad Sababheh

doi:10.54330/afm.146278

Kirjoittajat

Shigeru Furuichi Nihon University, College of Humanities and Sciences, Department of Information Science, and Saveetha School of Engineering, SIMATS, Department of Mathematics
Hamid Reza Moradi Islamic Azad University, Mashhad Branch, Department of Mathematics
Mohammad Sababheh Princess Sumaya University for Technology, Department of Basic Sciences

DOI: https://doi.org/10.54330/afm.146278

Avainsanat:

Accretive matrix, operator monotone function, Choi–Davis inequality, mean of accretive matrices, operator matrix related to accretive matrices, entropy

Abstrakti

To better understand the algebra \(\mathcal{M}_n\) of all \(n\times n\) complex matrices, we explore the class of accretive matrices. This class has received renowned attention in recent years due to its role in complementing those results known for positive definite matrices. Among many results, we present order-preserving results, Choi–Davis-type inequalities, mean-convex inequalities, sub-multiplicative results for the real part, and new bounds of the absolute value of accretive matrices. These results will be compared with the existing literature. In the end, we quickly pass through related entropy results for accretive matrices.

Further properties of accretive matrices

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