Template:WebNotes/BlockSimMarkov Discrete Diagram: Difference between revisions
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A Markov chain diagram is the graphical representation of a system that can be in various states, including the possible transitions between those states. Each state block represents a state, while each transition line represents a fixed probability (discrete Markov) or constant transition rate (continuous Markov) to move from one state to another. | A Markov chain diagram is the graphical representation of a system that can be in various states, including the possible transitions between those states. Each state block represents a state, while each transition line represents a fixed probability (discrete Markov) or constant transition rate (continuous Markov) to move from one state to another. | ||
Revision as of 15:47, 31 March 2015
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| Analytical Fault Tree Diagram |
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A Markov chain diagram is the graphical representation of a system that can be in various states, including the possible transitions between those states. Each state block represents a state, while each transition line represents a fixed probability (discrete Markov) or constant transition rate (continuous Markov) to move from one state to another. In discrete Markov diagrams, the system moves from state to state in steps. These steps are not necessarily time-based; although they can represent a fixed period of time, they can also represent distance or any other measurement. At each step, there is a fixed probability of the system transitioning to another state. |
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