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Stochastic fictitious play with continuous action sets
Continuous action space games are ubiquitous in economics. However, whilst learning dynamics in normal form games with finite action sets are now well studied, it is not until recently that their continuous action space counterparts have been examined. We extend stochastic fictitious play to the con...
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| Published in: | Journal of economic theory 2014-07, Vol.152, p.179-213 |
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| Main Authors: | , |
| Format: | Article |
| Language: | English |
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| cited_by | cdi_FETCH-LOGICAL-c465t-78983ce64097748b0279eacaad0ef1a8b068cebaea05b506d98d4cdbe4d030bd3 |
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| cites | cdi_FETCH-LOGICAL-c465t-78983ce64097748b0279eacaad0ef1a8b068cebaea05b506d98d4cdbe4d030bd3 |
| container_end_page | 213 |
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| container_start_page | 179 |
| container_title | Journal of economic theory |
| container_volume | 152 |
| creator | Perkins, S. Leslie, D.S. |
| description | Continuous action space games are ubiquitous in economics. However, whilst learning dynamics in normal form games with finite action sets are now well studied, it is not until recently that their continuous action space counterparts have been examined. We extend stochastic fictitious play to the continuous action space framework. In normal form games with finite action sets the limiting behaviour of a discrete time learning process is often studied using its continuous time counterpart via stochastic approximation. In this paper we study stochastic fictitious play in games with continuous action spaces using the same method. This requires the asymptotic pseudo-trajectory approach to stochastic approximation to be extended to Banach spaces. In particular the limiting behaviour of stochastic fictitious play is studied using the associated smooth best response dynamics on the space of finite signed measures. Using this approach, stochastic fictitious play is shown to converge to an equilibrium point in two-player zero-sum games and a stochastic fictitious play-like process is shown to converge to an equilibrium in negative definite single population games. |
| doi_str_mv | 10.1016/j.jet.2014.04.008 |
| format | article |
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| ispartof | Journal of economic theory, 2014-07, Vol.152, p.179-213 |
| issn | 0022-0531 1095-7235 |
| language | eng |
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| source | International Bibliography of the Social Sciences (IBSS); Elsevier |
| subjects | Abstract stochastic approximation Approximation Asymptotic methods Banach spaces Continuous action set games Convergence Economic dynamics Economic theory Equilibrium Game theory Learning in games Stochastic fictitious play Stochastic models Stochastic processes Studies |
| title | Stochastic fictitious play with continuous action sets |
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