Difference between revisions of "Deep Distributed Q Network Partial Observability"
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| − | It is possible to design a Partially Observable Markov Decision Process which calculates the decision making processes of two agents. A multi-agent reinforcement learning procedure calculates the decision process. For example if you want to calculate the probability for the decision of a person you introduce a random choice of one of the two roles or agents. This introduction is called the Harsanyi transformation. Two Partially Observable Markov Decision Processes are compatible if any policy for one of the agents is a policy for the other. | + | It is possible to design a Partially Observable Markov Decision Process which calculates the decision making processes of two agents. A multi-agent reinforcement learning procedure calculates the decision process. For example if you want to calculate the probability for the decision of a person you introduce a random choice of one of the two roles or agents. This introduction is called the Harsanyi transformation. Two Partially Observable Markov Decision Processes are compatible if any policy for one of the agents is a policy for the other. [http://www.amazon.com/Zahra-M.M.A.-Sadiq/e/B071HGHXBD Zahra M.M.A. Sadiq] |
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Revision as of 19:24, 5 July 2020
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- Architectures
- Deep Decentralized Multi-task Multi-Agent Reinforcement Learning under Partial Observability | ArXiv
- Deep Multiagent Reinforcement Learning for Partially Observable Parameterized Environments | Peter Stone
- Reinforcement Learning in Partially Observable Multiagent Settings: Monte Carlo Exploring Policies with PAC Bounds
- Monte Carlo
It is possible to design a Partially Observable Markov Decision Process which calculates the decision making processes of two agents. A multi-agent reinforcement learning procedure calculates the decision process. For example if you want to calculate the probability for the decision of a person you introduce a random choice of one of the two roles or agents. This introduction is called the Harsanyi transformation. Two Partially Observable Markov Decision Processes are compatible if any policy for one of the agents is a policy for the other. Zahra M.M.A. Sadiq
