PŘIBYLOVÁ, Lenka, Deeptajyoti SEN a Veronika ECLEROVÁ. Destabilization of a seasonal synchronization in a population model with a seasonally varying Allee effect. Applied Mathematics and Computation. Elsevier, 2024, roč. 462, February 2024, s. 1-15. ISSN 0096-3003. Dostupné z: https://dx.doi.org/10.1016/j.amc.2023.128331. |
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@article{2317018, author = {Přibylová, Lenka and Sen, Deeptajyoti and Eclerová, Veronika}, article_number = {February 2024}, doi = {http://dx.doi.org/10.1016/j.amc.2023.128331}, keywords = {Seasonality; Allee effect; Arnold tongue; Synchronization; Bifurcations; Chaos}, language = {eng}, issn = {0096-3003}, journal = {Applied Mathematics and Computation}, title = {Destabilization of a seasonal synchronization in a population model with a seasonally varying Allee effect}, url = {https://doi.org/10.1016/j.amc.2023.128331}, volume = {462}, year = {2024} }
TY - JOUR ID - 2317018 AU - Přibylová, Lenka - Sen, Deeptajyoti - Eclerová, Veronika PY - 2024 TI - Destabilization of a seasonal synchronization in a population model with a seasonally varying Allee effect JF - Applied Mathematics and Computation VL - 462 IS - February 2024 SP - 1-15 EP - 1-15 PB - Elsevier SN - 00963003 KW - Seasonality KW - Allee effect KW - Arnold tongue KW - Synchronization KW - Bifurcations KW - Chaos UR - https://doi.org/10.1016/j.amc.2023.128331 N2 - Climate change causing large seasonal fluctuations is likely to lead to an increase in the average threshold of the Allee effect as well as an increase in its seasonal variability. In this paper, we show that a seasonally synchronized predator-prey system can be strongly destabilized by these changes in the threshold of the Allee effect. The typical result first leads to two-year and multiyear cycles by the principle of period doubling on a folded Möbius strip, up to the emergence of a chaotic and hyper-chaotic attractor living close to the trivial equilibrium corresponding to the extinction of populations. Moreover, this instability of the ecosystem can be hidden for a long time and the transition to its basin of attraction can occur by external perturbation in a random and irreversible manner. We also reveal a double folding of the 1:1 synchronized cycle manifold inside the corresponding Arnold tongue and hysteresis similar to well-known Duffing oscillator. ER -
PŘIBYLOVÁ, Lenka, Deeptajyoti SEN a Veronika ECLEROVÁ. Destabilization of a seasonal synchronization in a population model with a seasonally varying Allee effect. \textit{Applied Mathematics and Computation}. Elsevier, 2024, roč.~462, February 2024, s.~1-15. ISSN~0096-3003. Dostupné z: https://dx.doi.org/10.1016/j.amc.2023.128331.
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