The Effect of Seasonal harvesting on a Stage-Structured Discrete Model with Birth Pulses

In this paper, we propose an exploited single-species discrete population model with stage structure for the dynamics in a fish population for which births occur in a single pulse once per time period. Using the stroboscopic map, we obtain an exact cycle of the system, and obtain the threshold conditions for its stability. Bifurcation diagrams are constructed with the birth rate (or harvesting effort) as the bifurcation parameter, and these are observed to display complex dynamic behaviors, including chaotic bands with period windows, pitchfork and tangent bifurcation, nonunique dynamics (meaning that several attractors or attractor and chaos coexist), basins of attraction and attractor crisis. This suggests that birth pulse provides a natural period or cyclicity that makes the dynamical behaviors more complex. Moreover, we show that the timing of harvesting has a strong impact on the persistence of the fish population, on the volume of mature fish stock and on the maximum annual-sustainable yield. An int...

[1]  A. Hastings,et al.  Persistence of Transients in Spatially Structured Ecological Models , 1994, Science.

[2]  A. Nicholson An outline of the dynamics of animal populations. , 1954 .

[3]  R. M. Nisbet,et al.  THE SYSTEMATIC FORMULATION OF TRACTABLE SINGLE-SPECIES POPULATION MODELS , 1983 .

[4]  A Hastings,et al.  Delays in recruitment at different trophic levels: Effects on stability , 1984, Journal of mathematical biology.

[5]  Lansun Chen,et al.  Quasiperiodic Solutions and Chaos in a Periodically Forced Predator-prey Model with Age Structure for predator , 2003, Int. J. Bifurc. Chaos.

[6]  Lansun Chen,et al.  Dynamic complexities in a single-species discrete population model with stage structure and birth pulses , 2005 .

[7]  Bing Liu,et al.  The Effects of Impulsive Toxicant Input on a Population in a Polluted Environment , 2003 .

[8]  Robert J. Small,et al.  Predation and hunting mortality of ruffed grouse in central Wisconsin , 1991 .

[9]  Leon O. Chua,et al.  Time-Delayed impulsive Control of Chaotic Hybrid Systems , 2004, Int. J. Bifurc. Chaos.

[10]  Graham W. Smith,et al.  Hunting and mallard survival, 1979-88 , 1992 .

[11]  Graham W. Smith,et al.  Hunting and Mallard Survival: A Reply , 1994 .

[12]  Raffaella Pavani,et al.  On the Structure of the Solutions of a Two-Parameter Family of Three-Dimensional Ordinary Differential Equations , 2003, Int. J. Bifurc. Chaos.

[13]  Sanyi Tang,et al.  The effect of seasonal harvesting on stage-structured population models , 2004, Journal of mathematical biology.

[14]  Xiao-Song Yang,et al.  Chaotic Attractor in a Simple Hybrid System , 2002, Int. J. Bifurc. Chaos.

[15]  L. Ellison,et al.  Shooting and compensatory mortality in tetraonids , 1991 .

[16]  R M May,et al.  Biological Populations with Nonoverlapping Generations: Stable Points, Stable Cycles, and Chaos , 1974, Science.

[17]  J. Yorke,et al.  Crises, sudden changes in chaotic attractors, and transient chaos , 1983 .

[18]  A Hastings,et al.  Intermittency and transient chaos from simple frequency-dependent selection , 1995, Proceedings of the Royal Society of London. Series B: Biological Sciences.

[19]  H. I. Freedman,et al.  A time-delay model of single-species growth with stage structure. , 1990, Mathematical biosciences.

[20]  R. May,et al.  Bifurcations and Dynamic Complexity in Simple Ecological Models , 1976, The American Naturalist.

[21]  John L. Roseberry,et al.  Bobwhite Population Responses to Exploitation: Real and Simulated , 1979 .

[22]  Eric T. Funasaki,et al.  Invasion and Chaos in a Periodically Pulsed Mass-Action Chemostat , 1993 .