Title of article
Random variation and concentration effects in PCR
Author/Authors
Jagers، نويسنده , , Peter and Klebaner، نويسنده , , Fima، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2003
Pages
6
From page
299
To page
304
Abstract
Even though the efficiency of the Polymerase chain reaction (PCR) reaction decreases, analyses are made in terms of Galton–Watson processes, or simple deterministic models with constant replication probability (efficiency). Recently, Schnell and Mendoza have suggested that the form of the efficiency, can be derived from enzyme kinetics. This results in the sequence of molecules numbers forming a stochastic process with the properties of a branching process with population size dependence, which is supercritical, but has a mean reproduction number that approaches one. Such processes display ultimate linear growth, after an initial exponential phase, as is the case in PCR. It is also shown that the resulting stochastic process for a large Michaelis–Menten constant behaves like the deterministic sequence xn arising by iterations of the function f(x)=x+x/(1+x).
Keywords
Branching process , PCR , Varying environment , Michaelis–Menten
Journal title
Journal of Theoretical Biology
Serial Year
2003
Journal title
Journal of Theoretical Biology
Record number
1535982
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