This article focuses only on one specialized aspect of the subject. Please help improve this article by adding general information and discuss at the talk page.(June 2023)
Typically, differential equations describing the i-th moment will depend on the (i + 1)-st moment. To use moment closure, a level is chosen past which all cumulants are set to zero. This leaves a resulting closed system of equations which can be solved for the moments.[1] The approximation is particularly useful in models with a very large state space, such as stochastic population models.[1]
History
The moment closure approximation was first used by Goodman[2] and Whittle[3][4] who set all third and higher-order cumulants to be zero, approximating the population distribution with a normal distribution.[1]
In 2006, Singh and Hespanha proposed a closure which approximates the population distribution as a log-normal distribution to describe biochemical reactions.[5]
^Whittle, P. (1957). "On the Use of the Normal Approximation in the Treatment of Stochastic Processes". Journal of the Royal Statistical Society. 19 (2): 268–281. JSTOR2983819.
^Matis, J. H.; Kiffe, T. R. (1996). "On Approximating the Moments of the Equilibrium Distribution of a Stochastic Logistic Model". Biometrics. 52 (3): 980–991. doi:10.2307/2533059. JSTOR2533059.
^Marion, G.; Renshaw, E.; Gibson, G. (1998). "Stochastic effects in a model of nematode infection in ruminants". Mathematical Medicine and Biology. 15 (2): 97. doi:10.1093/imammb/15.2.97.
^Baytaş, Bekir; Bojowald, Martin; Crowe, Sean (2018-12-17). "Canonical tunneling time in ionization experiments". Physical Review A. 98 (6). American Physical Society (APS): 063417. arXiv:1810.12804. doi:10.1103/physreva.98.063417. ISSN2469-9926.
Further reading
Socha, Lesław (2008). "Moment Equations for Nonlinear Stochastic Dynamic Systems". Linearization Methods for Stochastic Dynamic Systems. Berlin: Springer. pp. 85–102. doi:10.1007/978-3-540-72997-6_4. ISBN978-3-540-72996-9.
