Evolutionary dynamics for bimatrix games: A Hamiltonian system?
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[1] Floris Takens,et al. Singularities of vector fields , 1974 .
[2] V. Arnold. Mathematical Methods of Classical Mechanics , 1974 .
[3] D. Saari,et al. Stable and Random Motions in Dynamical Systems , 1975 .
[4] J M Smith,et al. Evolution and the theory of games , 1976 .
[5] E. C. Zeeman,et al. Population dynamics from game theory , 1980 .
[6] R. Selten. A note on evolutionarily stable strategies in asymmetric animal conflicts. , 1980, Journal of Theoretical Biology.
[7] P. Schuster,et al. Coyness, philandering and stable strategies , 1981, Animal Behaviour.
[8] H. Broer,et al. Quasi periodic flow near a codimension one singularity of a divergence free vector field in dimension three , 1981 .
[9] Vladimir Igorevich Arnold,et al. Geometrical Methods in the Theory of Ordinary Differential Equations , 1983 .
[10] E. Akin,et al. Cevolutionary instability of mixed Nash solutions , 1983, Journal of mathematical biology.
[11] E. Akin,et al. Evolutionary dynamics of zero-sum games , 1984, Journal of mathematical biology.
[12] Josef Hofbauer,et al. The theory of evolution and dynamical systems , 1988 .
[13] A. N. Sharkovskiĭ. Dynamic systems and turbulence , 1989 .
[14] A. Perelomov. Integrable systems of classical mechanics and Lie algebras , 1989 .
[15] George Huitema,et al. Unfoldings and Bifurcations of Quasi-Periodic Tori , 1990 .
[16] L. Samuelson,et al. EVOLUTIONARY STABILITY IN SYMMETRIC GAMES , 1990 .
[17] Reinhard Selten,et al. Anticipatory Learning in Two-Person Games , 1991 .
[18] Reinhard Selten. Game equilibrium models , 1991 .
[19] L. Samuelson,et al. Evolutionary Stability in Asymmetric Games , 1992 .
[20] M. Plank. Hamiltonian structures for the n‐dimensional Lotka–Volterra equations , 1995 .