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This article is cited in 4 scientific papers (total in 4 papers)
MATHEMATICS
Estimation of average time profit for stochastic structured population
Yu. V. Masterkova, L. I. Rodinaba a Vladimir State University, ul. Gor'kogo, 87, Vladimir, 600000,
Russia
b National University of Science and Technology MISIS, Leninskii
pr., 4, Moscow, 119049, Russia
Abstract:
We investigate models of dynamics of the exploited
population, given by the system with impulse influences, depending on random parametres.
The considered population is structured, that is either
consists of separate kinds $x_1, \ldots, x_n, $ or is divided on $n $ age groups.
In particular, it is possible to investigate the population of $n $ various
kinds of fishes between which there are competition relations for food or dwelling
places. We assume, that in the absence of harvesting the
population development is described by system of differential equations
$\dot x =f (x),$ and in time moments $kd, $ $d> 0$ are
taken some random share of a resource $ \omega (k),$ $k=1,2, \ldots,$
that leads to sharp (impulse) reduction of its quantity.
It is possible to control gathering process so that not to extract more than
it is necessary, if shares of an extracted resource for one or several kinds
appear big enough; it is necessary that the certain part of a resource has remained for the
purpose of increase in the size of following gathering.
We received the estimation of average time profit from the resource extraction,
executed with probability one, for the structured population in a case $n> 1.$
We described the way of extraction of a resource for a gathering mode in long-term
prospect at which some part of population necessary for its further restoration
constantly remains.
Keywords:
structured population, average time profit, optimal exploitation.
Received: 20.10.2020
Citation:
Yu. V. Masterkov, L. I. Rodina, “Estimation of average time profit for stochastic structured population”, Izv. IMI UdGU, 56 (2020), 41–49
Linking options:
https://www.mathnet.ru/eng/iimi401 https://www.mathnet.ru/eng/iimi/v56/p41
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Abstract page: | 341 | Full-text PDF : | 166 | References: | 26 |
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