On the geometric structures in evolutionary games on square and triangular lattices [article]

Evgeni Burovski, Aleksandr Malyutin, Lev Shchur
2018 arXiv   pre-print
We study a model of a spatial evolutionary game, based on the Prisoner's dilemma for two regular arrangements of players, on a square lattice and on a triangular lattice. We analyze steady state distributions of players which evolve from irregular, random initial configurations. We find significant differences between the square and triangular lattice, and we characterize the geometric structures which emerge on the triangular lattice.
arXiv:1811.08784v1 fatcat:laagla3h6bbsxcleajjwfkhwli