False diffusion

In probability theory, a transition rate matrix (also known as an intensity matrix^[1][2] or infinitesimal generator matrix^[3]) is an array of numbers describing the rate a continuous time Markov chain moves between states.

In a transition rate matrix Q (sometimes written A^[4]) element q_ij (for i ≠ j) denotes the rate departing from i and arriving in state j. Diagonal elements q_ii are defined such that

${\displaystyle q_{ii}=-\sum _{j\ne i}{q}_{ij}.}$

and therefore the rows of the matrix sum to zero.

Definition

A Q matrix (q_ij) satisfies the following conditions^[5]

1. 0 ≤ -q_ii ≤ ∞
2. 0 ≤ q_ij for all i ≠ j
3. ${\displaystyle \sum _j{q}_{ij}=0}$ for all i.

Example

An M/M/1 queue, a model which counts the number of jobs in a queueing system with arrivals at rate λ and services at rate μ, has transition rate matrix

${\displaystyle Q=\left(\begin{array}{cc}-\lambda & \lambda \\ \mu & -(\mu +\lambda )& \lambda \\ & \mu & -(\mu +\lambda )& \lambda \\ & & \mu & -(\mu +\lambda )& \lambda & \\ & & & & \ddots \end{array}\right).}$

References

43 year old Petroleum Engineer Harry from Deep River, usually spends time with hobbies and interests like renting movies, property developers in singapore new condominium and vehicle racing. Constantly enjoys going to destinations like Camino Real de Tierra Adentro.

Template:Probability-stub