Paper Info
Title
The Sequential Price Of Anarchy For Atomic Congestion Games
Abstract
In situations without central coordination, the price of anarchy relates the quality of any Nash equilibrium to the quality of a global optimum. Instead of assuming that all players choose their actions simultaneously, we consider games where players choose their actions sequentially. The sequential price of anarchy, recently introduced by Paes Leme, Syrgkanis, and Tardos [13], relates the quality of any subgame perfect equilibrium to the quality of a global optimum. The effect of sequential decision making on the quality of equilibria, depends on the specific game under consideration. We analyze the sequential price of anarchy for atomic congestion games with affine cost functions. We derive several lower and upper bounds, showing that sequential decisions mitigate the worst case outcomes known for the classical price of anarchy [2,5]. Next to tight bounds on the sequential price of anarchy, a methodological contribution of our work is, among other things, a "factor revealing" linear programming approach we use to solve the case of three players.
Year
Venue
Field
2014
WEB AND INTERNET ECONOMICS
Mathematical economics,Congestion game,Mathematical optimization,Price of stability,Computer science,Subgame perfect equilibrium,Game theory,Price of anarchy,Sequential game,Nash equilibrium,Game tree
DocType
Volume
ISSN
Conference
8877
0302-9743
Citations 
PageRank 
References 
3
0.46
9
Authors
2
Name
Order
Citations
PageRank
Jasper de Jong1123.10
Marc Uetz245643.99