Instability mechanisms of repelling peak solutions in a multi-variable activator-inhibitor system

Edgar Knobloch, Arik Yochelis

نتاج البحث: نشر في مجلةمقالةمراجعة النظراء

ملخص

We study the linear stability properties of spatially localized single- and multi-peak states generated in a subcritical Turing bifurcation in the Meinhardt model of branching. In one spatial dimension, these states are organized in a foliated snaking structure owing to peak-peak repulsion but are shown to be all linearly unstable, with the number of unstable modes increasing with the number of peaks present. Despite this, in two spatial dimensions, direct numerical simulations reveal the presence of stable single- and multi-spot states whose properties depend on the repulsion from nearby spots as well as the shape of the domain and the boundary conditions imposed thereon. Front propagation is shown to trigger the growth of new spots while destabilizing others. The results indicate that multi-variable models may support new types of behavior that are absent from typical two-variable models.

اللغة الأصليةإنجليزيّة أمريكيّة
رقم المقال123129
دوريةChaos
مستوى الصوت32
رقم الإصدار12
المعرِّفات الرقمية للأشياء
حالة النشرنُشِر - 1 ديسمبر 2022

All Science Journal Classification (ASJC) codes

  • !!Applied Mathematics
  • !!Statistical and Nonlinear Physics
  • !!General Physics and Astronomy
  • !!Mathematical Physics

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