Dynamics of a Population Subject to Impulse Type Random Loss
Proceedings of the Latvian Academy of Sciences. Section B: Natural, Exact, and Applied Sciences
2017
Jevgeņijs Carkovs,
Kārlis Šadurskis
Presented the qualitative population growth analysis approach using the Pearl logistic population growth differential equation to instances of fast small random population size extractions. A probabilistic limit theorem based stochastic approximation algorithm for the qualitative analysis of the model on any finite time interval is proposed.
Keywords
population dynamics, stochastic equations, diffusion approximation
DOI
10.1515/prolas-2017-0050
Hyperlink
https://www.degruyter.com/view/j/prolas.2017.71.issue-4/prolas-2017-0050/prolas-2017-0050.xml
Carkovs, J., Šadurskis, K. Dynamics of a Population Subject to Impulse Type Random Loss. Proceedings of the Latvian Academy of Sciences. Section B: Natural, Exact, and Applied Sciences, 2017, Vol.71, No.4, pp.298-302. ISSN 1407-009X. Available from: doi:10.1515/prolas-2017-0050
Publication language
English (en)