Spectrum sharing for unlicensed bands

We study a spectrum sharing problem in an unlicensed band where multiple systems coexist and interfere with each other. Due to asymmetries and selfish system behavior, unfair and inefficient situations may arise. We investigate whether efficiency and fairness can be obtained with self-enforcing spectrum sharing rules. These rules have the advantage of not requiring a central authority that verifies compliance to the protocol. Any self-enforcing protocol must correspond to an equilibrium of a game. We first analyze the possible outcomes of a one shot game, and observe that in many cases an inefficient solution results. However, systems often coexist for long periods and a repeated game is more appropriate to model their interaction. In this repeated game the possibility of building reputations and applying punishments allows for a larger set of self-enforcing outcomes. When this set includes the optimal operating point, efficient, fair, and incentive compatible spectrum sharing becomes possible. We present examples that illustrate that in many cases the performance loss due to selfish behavior is small. We also prove that our results are tight and quantify the best achievable performance in a non-cooperative scenario

[1]  Wei Yu,et al.  Distributed multiuser power control for digital subscriber lines , 2002, IEEE J. Sel. Areas Commun..

[2]  Daniel Pérez Palomar,et al.  Power Control By Geometric Programming , 2007, IEEE Transactions on Wireless Communications.

[3]  Michael L. Honig,et al.  Distributed interference compensation for wireless networks , 2006, IEEE Journal on Selected Areas in Communications.

[4]  Drew Fudenberg,et al.  The Folk Theorem in Repeated Games with Discounting or with Incomplete Information , 1986 .

[5]  Raul H. Etkin,et al.  Metric Multidimensional scaling as a convex optimization problem , .

[6]  Spectrum sharing for unlicensed bands , 2005 .

[7]  Wei Yu,et al.  Dual methods for nonconvex spectrum optimization of multicarrier systems , 2006, IEEE Transactions on Communications.

[8]  J. Friedman A Non-cooperative Equilibrium for Supergames , 1971 .

[9]  Philip D. Plowright,et al.  Convexity , 2019, Optimization for Chemical and Biochemical Engineering.

[10]  Zhi-Quan Luo,et al.  Analysis of Iterative Waterfilling Algorithm for Multiuser Power Control in Digital Subscriber Lines , 2006, EURASIP J. Adv. Signal Process..

[11]  Te Sun Han,et al.  A new achievable rate region for the interference channel , 1981, IEEE Trans. Inf. Theory.

[12]  Edward C. van der Meulen,et al.  Some Reflections On The Interference Channel , 1994 .

[13]  Frank Kelly,et al.  Rate control for communication networks: shadow prices, proportional fairness and stability , 1998, J. Oper. Res. Soc..

[14]  S. T. Chung,et al.  A game-theoretic approach to power allocation in frequency-selective gaussian interference channels , 2003, IEEE International Symposium on Information Theory, 2003. Proceedings..

[15]  Wei Yu,et al.  Dual optimization methods for multiuser orthogonal frequency division multiplex systems , 2004, IEEE Global Telecommunications Conference, 2004. GLOBECOM '04..

[16]  Anant Sahai,et al.  Some Fundamental Limits on Cognitive Radio , 2004 .

[17]  Stephen B. Wicker,et al.  Game theory and the design of self-configuring, adaptive wireless networks , 2001, IEEE Commun. Mag..

[18]  C. R. Baker,et al.  Information Capacity of Channels with Partially Unknown Noise. I. Finite-Dimensional Channels , 1996, SIAM J. Appl. Math..

[19]  James W. Friedman,et al.  Oligopoly and the theory of games , 1977 .

[20]  Otilia Popescu,et al.  Signal space partitioning versus simultaneous water filling for mutually interfering systems , 2004, IEEE Global Telecommunications Conference, 2004. GLOBECOM '04..

[21]  D. A. Bell,et al.  Information Theory and Reliable Communication , 1969 .

[22]  N. Clemens,et al.  Intelligent power allocation strategies in an unlicensed spectrum , 2005, First IEEE International Symposium on New Frontiers in Dynamic Spectrum Access Networks, 2005. DySPAN 2005..