The replicator equation on graphs Export

@article{citeulike:831614, abstract = {We study evolutionary games on graphs. Each player is represented by a vertex of the graph. The edges denote who meets whom. A player can use any one of n strategies. Players obtain a payoff from interaction with all their immediate neighbors. We consider three different update rules, called 'birth–death', 'death–birth' and 'imitation'. A fourth update rule, 'pairwise comparison', is shown to be equivalent to birth–death updating in our model. We use pair approximation to describe the evolutionary game dynamics on regular graphs of degree k . In the limit of weak selection, we can derive a differential equation which describes how the average frequency of each strategy on the graph changes over time. Remarkably, this equation is a replicator equation with a transformed payoff matrix. Therefore, moving a game from a well-mixed population (the complete graph) onto a regular graph simply results in a transformation of the payoff matrix. The new payoff matrix is the sum of the original payoff matrix plus another matrix, which describes the local competition of strategies. We discuss the application of our theory to four particular examples, the Prisoner's Dilemma, the Snow-Drift game, a coordination game and the Rock–Scissors–Paper game.}, author = {Ohtsuki, Hisashi and Nowak, Martin A.}, citeulike-article-id = {831614}, citeulike-linkout-0 = {http://dx.doi.org/10.1016/j.jtbi.2006.06.004}, citeulike-linkout-1 = {http://linkinghub.elsevier.com/retrieve/pii/S0022519306002426}, citeulike-linkout-2 = {http://www.sciencedirect.com/science/article/B6WMD-4K5RBK6-4/2/addf5d3965598e478f6c2b3d49749361}, day = {7}, doi = {10.1016/j.jtbi.2006.06.004}, issn = {00225193}, journal = {Journal of Theoretical Biology}, keywords = {game, graph, replicator}, month = {November}, number = {7}, pages = {86--97}, posted-at = {2009-01-19 09:45:15}, priority = {2}, title = {The replicator equation on graphs}, url = {http://dx.doi.org/10.1016/j.jtbi.2006.06.004}, volume = {243}, year = {2006} }

TY - JOUR ID - citeulike:831614 L3 - citeulike-article-id:831614 N2 - We study evolutionary games on graphs. Each player is represented by a vertex of the graph. The edges denote who meets whom. A player can use any one of n strategies. Players obtain a payoff from interaction with all their immediate neighbors. We consider three different update rules, called ‘birth–death’, ‘death–birth’ and ‘imitation’. A fourth update rule, ‘pairwise comparison’, is shown to be equivalent to birth–death updating in our model. We use pair approximation to describe the evolutionary game dynamics on regular graphs of degree k . In the limit of weak selection, we can derive a differential equation which describes how the average frequency of each strategy on the graph changes over time. Remarkably, this equation is a replicator equation with a transformed payoff matrix. Therefore, moving a game from a well-mixed population (the complete graph) onto a regular graph simply results in a transformation of the payoff matrix. The new payoff matrix is the sum of the original payoff matrix plus another matrix, which describes the local competition of strategies. We discuss the application of our theory to four particular examples, the Prisoner's Dilemma, the Snow-Drift game, a coordination game and the Rock–Scissors–Paper game. IS - 7 JF - Journal of Theoretical Biology SN - 00225193 EP - 97 TI - The replicator equation on graphs VL - 243 SP - 86 KW - game KW - graph KW - replicator AU - Ohtsuki, Hisashi AU - Nowak, Martin PY - 2006/11/07/ UR - http://dx.doi.org/10.1016/j.jtbi.2006.06.004 ER -