Jackson's theorem (queueing theory)

This template must be substituted. Replace {{Requested move ...}} with {{subst:Requested move ...}}. Jackson's Theorem is the first significant development in the theory of networks of queues. It assumes an open queueing network of single-server queues with the following characteristics:

M = # of queues in the system, not counting queue 0 which represents the outside world
$\mu _{i}$ = service rate at queue $i$
$\lambda _{i}$ = total rate at which jobs arrive at queue $j$
$\forall i,1\leq i\leq M:\rho _{i}=$ utilization of the service at queue $i={\frac {\lambda _{i}}{\mu _{i}}}<1$
$n_{i}(t)$ =# of jobs in queue i at time t
$n(t)=(n_{1}(t),n_{2}(t),...,n_{M}(t))^{T}$ = the system state at time t
$P(k_{1},k_{2},...,k_{M},t)=Pr(n(t)=k_{1},k_{2},...,k_{M})^{T})$
$P(k_{1},k_{2},...,k_{M})=\lim _{t\to \infty }P(k_{1},k_{2},...,k_{M},t)$
Arrivals from the outside world are Poisson. All queues have exponential service time distributions.

Production form of Jackson's Network

$P(k_{1},k_{2},...,k_{M})=\prod _{i=1\to M}[({\frac {\lambda _{i}}{\mu _{i}}})^{k_{i}}(1-{\frac {\lambda _{i}}{\mu _{i}}})]=\prod _{i=1\to M}[(1-\rho _{i})\rho _{i}^{k_{i}}]$
(where $\rho _{i}={\frac {\lambda _{i}}{\mu _{i}}}$ )

External links

Sinclair, B. (2005, June 9). Jackson's Theorem. Connexions

Jackson's theorem (queueing theory)

Production form of Jackson's Network

See also

External links