Evolutionary Kaleidoscopes in the Prisoner's Dilemma
For deterministic update rules (synchronous lattice update, best player in neighborhood reproduces) and symmetrical initial configurations this can lead to fascinating spatio-temporal patterns. Such evolutionary kaleidoscopes are certainly only of limited scientific interest but they do have quite some entertainment value.
-
[math]\displaystyle{ t=0 }[/math]
-
[math]\displaystyle{ t=50 }[/math]
-
[math]\displaystyle{ t=100 }[/math]
-
[math]\displaystyle{ t=150 }[/math]
-
[math]\displaystyle{ t=200 }[/math]
-
[math]\displaystyle{ t=250 }[/math]
-
[math]\displaystyle{ t=300 }[/math]
-
[math]\displaystyle{ t=350 }[/math]
-
[math]\displaystyle{ t=400 }[/math]
-
[math]\displaystyle{ t=450 }[/math]
-
[math]\displaystyle{ t=500 }[/math]
-
[math]\displaystyle{ t=550 }[/math]
-
[math]\displaystyle{ t=600 }[/math]
-
[math]\displaystyle{ t=650 }[/math]
-
[math]\displaystyle{ t=700 }[/math]
-
[math]\displaystyle{ t=750 }[/math]
-
[math]\displaystyle{ t=800 }[/math]
-
[math]\displaystyle{ t=850 }[/math]
-
[math]\displaystyle{ t=900 }[/math]
-
[math]\displaystyle{ t=950 }[/math]