Kelly's lemma

Template:Short description In probability theory, Kelly's lemma states that for a stationary continuous-time Markov chain, a process defined as the time-reversed process has the same stationary distribution as the forward-time process.^[1] The theorem is named after Frank Kelly.^[2][3][4][5]

For a continuous time Markov chain with state space S and transition-rate matrix Q (with elements q_ij) if we can find a set of non-negative numbers q'_ij and a positive measure π that satisfy the following conditions:^[1]

${\displaystyle \begin{array}{cc}\sum _{j\in S}{q}_{ij}& =\sum _{j\in S}q{\text{'}}_{ij}\mathrm{\forall }i\in S\\ {\pi }_i{q}_{ij}& ={\pi }_j{q}_{j^{\prime }i}\mathrm{\forall }i,j\in S,\end{array}}$

then q'_ij are the rates for the reversed process and π is proportional to the stationary distribution for both processes.

Given the assumptions made on the q_ij and π we have

${\displaystyle \sum _{i\in S}{\pi }_i{q}_{ij}=\sum _{i\in S}{\pi }_{j}q{\text{'}}_{ji}={\pi }_j\sum _{i\in S}q{\text{'}}_{ji}={\pi }_j\sum _{i\in S}{q}_{ji}={\pi }_j,}$

so the global balance equations are satisfied and the measure π is proportional to the stationary distribution of the original process. By symmetry, the same argument shows that π is also proportional to the stationary distribution of the reversed process.

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