Traffic equations queueing theory , a discipline within the mathematical theory of probability , traffic equations arrival rate of traffic, allowing the arrival rates at individual nodes to be determined . Mitrani notes "if the network is stable , the traffic equations are valid and can be solved."In a Jackson network, the mean arrival rate at each node i in the network is given by the sum of external arrivals, and internal arrivals from each of the other nodes on the network. If external arrivals at node i have rate, and the routing matrix is P , the traffic equations are, there is a unique solution of unknowns to this equation, so the mean arrival rates at each of the nodes can be determined given knowledge of the external arrival rates and the matrix P . The matrix I − P is surely non-singular as otherwise in the long run the network would become empty.In a Gordon–Newell network there are no external arrivals, so the traffic equations take the form
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