On (un)knots and dynamics in games
From MaRDI portal
Publication:1867023
DOI10.1016/S0899-8256(02)00009-XzbMath1029.91014MaRDI QIDQ1867023
Fabrizio Germano, Stefano De Michelis
Publication date: 2 April 2003
Published in: Games and Economic Behavior (Search for Journal in Brave)
Related Items (6)
Some results concerning the solution mappings of mixed variational inequality problems ⋮ A general structure theorem for the Nash equilibrium correspondence ⋮ A sandwich theorem for generic \(n \times n\) two person games ⋮ Slicing the Nash equilibrium manifold ⋮ DYNAMIC SELECTION IN NORMAL-FORM GAMES ⋮ Network formation and pairwise stability: a new oddness theorem
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Nonconvergence to unstable points in urn models and stochastic approximations
- Learning mixed equilibria
- Three problems in learning mixed-strategy Nash equilibria
- The theory of normal form games from the differentiable viewpoint
- Uniqueness of the index for Nash equilibria of two-player games
- Equivalence and invariance of the index and degree of Nash equilibria
- An evolutionary interpretation of mixed-strategy equilibria
- Adaptive dynamics in games played by heterogeneous populations
- Some consequences of the unknottedness of the Walras correspondence
- Mixed equilibria and dynamical systems arising from fictitious play in perturbed games
- A note on best response dynamics.
- On the indices of zeros of Nash fields
- Learning dynamics in games with stochastic perturbations
- Learning purified mixed equilibria
- On the Convergence of Fictitious Play
- A Bound on the Proportion of Pure Strategy Equilibria in Generic Games
- Stable Equilibria—A Reformulation
- On the Strategic Stability of Equilibria
- Evolutionary Selection in Normal-Form Games
- An exact sequence in differential topology
This page was built for publication: On (un)knots and dynamics in games
