Rusakov, A.V.; Tikhonov, D.A.; Nurieva, N.I.; Medvinsky, A.B. Emergent Spatial–Temporal Patterns in a Ring of Locally Coupled Population Oscillators. Mathematics2023, 11, 4970.
Rusakov, A.V.; Tikhonov, D.A.; Nurieva, N.I.; Medvinsky, A.B. Emergent Spatial–Temporal Patterns in a Ring of Locally Coupled Population Oscillators. Mathematics 2023, 11, 4970.
Rusakov, A.V.; Tikhonov, D.A.; Nurieva, N.I.; Medvinsky, A.B. Emergent Spatial–Temporal Patterns in a Ring of Locally Coupled Population Oscillators. Mathematics2023, 11, 4970.
Rusakov, A.V.; Tikhonov, D.A.; Nurieva, N.I.; Medvinsky, A.B. Emergent Spatial–Temporal Patterns in a Ring of Locally Coupled Population Oscillators. Mathematics 2023, 11, 4970.
Abstract
A closed chain of oscillators can be considered as a model of ring-shaped ecosystems, such as atolls or coastal zones of inland reservoirs. As an oscillator model, we use the logistic map that often referred to as an archetypical example of how complex dynamics can arise from very simple nonlinear equations. We investigate the influence of the model parameters both on the nature of oscillations in the oscillator ring and on the spatial structures that arise in this case. Namely, we demonstrate a variety of emerging spatial structures depending on the initial conditions.
Computer Science and Mathematics, Mathematical and Computational Biology
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