Transcript ppt
Al-Imam Mohammad Ibn Saud University
CS433
Modeling and Simulation
Lecture 07 – Part 02
Birth-Death Process
http://10.2.230.10:4040/akoubaa/cs433/
29 Nov 2008
Dr. Anis Koubâa
Birth-Death Chain
2
The birth-death process is a special case of Continuous-time
Markov process where the states represent the current size of a
population and where the transitions are limited to births and
deaths.
Birth-death processes have many application in demography,
queueing theory, or in biology, for example to study the evolution
of bacteria.
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Birth-Death Chain
3
A pure birth process is a birth-death process where μi = 0 for all i≥0
A pure death process is a birth-death process where λi = 0 for all i≥0
A (homogeneous) Poisson process is a pure birth process where λi = λ for all
A M/M/1 queue is a birth-death process used to describe customers in an
infinite queue.
3
Birth-Death Chain
4
λ0
0
μ1
λ1
λi-1
1
μi
Find the steady state probabilities
Similarly to the previous example,
λi
i
0
0
0
1 1
1
1
Q
0
2
2 2
And we solve
πQ 0
and
i 1
i 0
μi+1
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Example
5
The solution is obtained
0 0 11 0
0
1 0
1
0 0 1 1 1 2 2 0
In general
0 1
2
1 2
j 1 j 1 j j j j 1 j 1 0
0
j 1
Making the sum equal to 1
...
0
j 1
0 1
1
...
j
1
1
j
0 ... j
0
1 ... j 1
Solution exists if
0 ... j 1
S 1
j 1 1 ... j
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End of Chapter