Game Theory for Control of Optical NetworksOptical networks epitomize complex communication systems, and they comprise the Internet’s infrastructural backbone. The first of its kind, this book develops the mathematical framework needed from a control perspective to tackle various game-theoretical problems in optical networks. In doing so, it aims to help design control algorithms that optimally allocate the resources of these networks. With its fresh problem-solving approach, Game Theory in Optical Networks is a unique resource for researchers, practitioners, and graduate students in applied mathematics and systems/control engineering, as well as those in electrical and computer engineering. |
Contents
| 1 | |
| 8 | |
Game Theory in Optical Networks | 68 |
Robustness Delay Effects and Other Problems | 186 |
Supplementary Material | 228 |
List of Notations | 247 |
References | 251 |
| 258 | |
Other editions - View all
Common terms and phrases
action sets action space adjustable approach boundary-layer system channel algorithm channel input power channel OSNR channel powers Chap chapter color condition consider control algorithms convergence convex cost function coupled constraints defined Definition delay denote exists fiber links fixed-point solution game formulation Game Theory game-theoretic games with coupled given inner NE solution Lagrangian Lemma link algorithm link capacity constraint Lyapunov function m-player matrix game minimization mixed strategies mixed-strategy Nash equilibrium Nash game NE solution NE(G network topology nodes noise power notation optical amplifier optical fiber optical link optical networks optimization problem OSNR model output parameters partitioned Nash game payment function player power control proof Proposition pure strategies reaction function respect satisfies Sect signal power single-sink solution concept Springer Science+Business Media stability system matrix Theorem time-delay time-scale total power transmitted ui,l unique uopt vector form wavelength yi,l