Diffusion-induced blowup solutions for the shadow limit model of a singular Gierer-Meinhardt system

Abstract

In the current paper, we provide a thorough investigation of the blowing up behaviour induced via diffusion of the solution of the following non local problem equation* \arrayrcl ∂t u &=& u - u + up (\,-\!\!∫ ur dr )γ × (0,T), \\[0.2cm] ∂ u ∂ & = & 0 on = ∂ × (0,T),\\ u(0) & = & u0, array . equation* where is a bounded domain in RN with smooth boundary ∂ ; such problem is derived as the shadow limit of a singular Gierer-Meinhardt system, cf. KSN17, NKMI2018. Under the Turing type condition rp-1 < N2, γ r p-1, we construct a solution which blows up in finite time and only at an interior point x0 of , i.e. u(x0, t) (θ*)-1p-1 [ (T-t)-1p-1 ], where θ* := t T (\,-\!\!∫ ur dr )- γ and = (p-1)-1p-1. More precisely, we also give a description on the final asymptotic profile at the blowup point u(x,T) ( θ* )-1p-1 [ (p-1)28p |x-x0|2 ||x-x0|| ] -1p-1 as x 0, and thus we unveil the form of the Turing patterns occurring in that case due to driven-diffusion instability. The applied technique for the construction of the preceding blowing up solution mainly relies on the approach developed in MZnon97 and DZM3AS19.