본문 바로가기 주메뉴 바로가기
검색 검색영역닫기 검색 검색영역닫기 ENGLISH 메뉴 전체보기 메뉴 전체보기

논문

Dynamics of the Full Information Minority Game due to the Agent's Impact

https://doi.org/10.3938/jkps.62.377

  • 저자Woo-Sik Son (Young-Jai Park)
  • 학술지Journal of the Korean Physical Society 62
  • 등재유형
  • 게재일자(2013)


We propose the full information minority game (FIMG) in which agents perfectly recognize their impact on the market. For reflecting the impact of agents, we introduce an actual total action and an actual payoff which depend on the agent’s strategies. Unlike the perpetual fluctuating dynamics of the standard minority game, the dynamics of the FIMG settles into one of four steady states after a transient time. We classify steady states of the FIMG and analyze their characteristics. In most cases, the total payoff is maximized, and the total action settles into a periodic state. For measuring the degree of cooperation on the FIMG, we calculate a fraction of total payoff maximization and a mean relaxation time for the dynamics to settle into a steady state whose total payoff is maximized.


We propose the full information minority game (FIMG) in which agents perfectly recognize their impact on the market. For reflecting the impact of agents, we introduce an actual total action and an actual payoff which depend on the agent’s strategies. Unlike the perpetual fluctuating dynamics of the standard minority game, the dynamics of the FIMG settles into one of four steady states after a transient time. We classify steady states of the FIMG and analyze their characteristics. In most cases, the total payoff is maximized, and the total action settles into a periodic state. For measuring the degree of cooperation on the FIMG, we calculate a fraction of total payoff maximization and a mean relaxation time for the dynamics to settle into a steady state whose total payoff is maximized.

이 페이지에서 제공하는 정보에 대해 만족하십니까?