A New Determinant Inequality of Positive Semi-Definite Matrices
Jun Fang, and Hongbin Li
TL;DR
This paper introduces a novel determinant inequality for positive semi-definite matrices, providing a new mathematical tool for solving optimization problems in wireless communication system design.
Contribution
The paper presents a new determinant inequality for positive semi-definite matrices, expanding the mathematical toolkit for related optimization challenges.
Findings
Discovered and proved a new determinant inequality.
Applied the inequality to optimize wireless communication system design.
Enhanced methods for solving related optimization problems.
Abstract
A new determinant inequality of positive semidefinite matrices is discovered and proved by us. This new inequality is useful for attacking and solving a variety of optimization problems arising from the design of wireless communication systems.
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Taxonomy
Topicsgraph theory and CDMA systems · Matrix Theory and Algorithms · Mathematical Inequalities and Applications