Title :
The Kullback–Leibler Divergence and Nonnegative Matrices
Author :
Boche, Holger ; Stanczak, Slawomir
Author_Institution :
Fraunhofer German-Sino Lab for Mobile Commun., Berlin
Abstract :
This correspondence establishes an interesting connection between the Kullback-Leibler divergence and the Perron root of nonnegative irreducible matrices. In the second part of the correspondence, we apply these results to the power control problem in wireless communications networks to show a fundamental tradeoff between fairness and efficiency. A power vector is said to be efficient if it maximizes the overall network efficiency expressed in terms of an aggregate network utility function parameterized by some weight vector. For two widely used examples of utility functions, the correspondence identifies the unique weight vector for which a power vector is both efficient and max-min fair in the sense that each communication link has the same quality-of-service. These results also give rise to new saddle point characterizations of the Perron root
Keywords :
matrix algebra; power control; quality of service; radio networks; telecommunication control; utility theory; Kullback-Leibler divergence; Perron root; communication link; network efficiency maximization; network utility function; nonnegative irreducible matrix; power control problem; power vector; quality-of-service; saddle point characterization; wireless communications network; Aggregates; Crosstalk; Information theory; Interference; Mobile communication; Power control; Probability; Quality of service; Utility programs; Wireless communication; Fairness; Kullback–Leibler divergence; Perron root; nonnegative matrices; power control;
Journal_Title :
Information Theory, IEEE Transactions on
DOI :
10.1109/TIT.2006.885488
