Minimax Team Decision Problems
Author
Summary, in English
We consider the problem of distributed decision making
in a quadratic game between a "team" of players
and nature. Each player has limited information that
could be different from the other players in the team.
We show that if there is a solution to the minimax
team problem, then the linear policies are optimal, and
we show how to find the linear optimal solution by
solving a linear matrix inequality. The result
is used to solve the distributed H infinity
control problem. It shows that the information
structure restricted to exchange information
with neighbours only, is enough to obtain a
linear optimal feedback law.
in a quadratic game between a "team" of players
and nature. Each player has limited information that
could be different from the other players in the team.
We show that if there is a solution to the minimax
team problem, then the linear policies are optimal, and
we show how to find the linear optimal solution by
solving a linear matrix inequality. The result
is used to solve the distributed H infinity
control problem. It shows that the information
structure restricted to exchange information
with neighbours only, is enough to obtain a
linear optimal feedback law.
Department/s
Publishing year
2007
Language
English
Pages
4333-4338
Full text
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Document type
Conference paper
Topic
- Control Engineering
Keywords
- Multiplayer minimax quadratic games
- distributed control
- H infinity
Conference name
American Control Conference, 2007
Conference date
2007-07-11 - 2007-07-13
Conference place
New York, NY, United States
Status
Published