Multi-bump ground states of the fractional Gierer-Meinhardt system in R

Abstract

In this paper we study ground-states of the fractional Gierer-Meinhardt system on the line, namely the solutions of the problem equation* \arrayll (-)su+u-u2v=0, &in~R,\\ (-)sv+2sv-u2=0, &in~R,\\ u,v>0, u,v→0~&as~|x|→+∞. array. equation* We prove that given any positive integer k, there exists a solution to this problem for s∈[12,1) exhibiting exactly k bumps in its u-component, separated from each other at a distance O(1-2s4s) for s∈(12,1) and O(||12) for s=12 respectively, whenever is sufficiently small. These bumps resemble the shape of the unique solution of equation* (-)sU+U-U2=0, 0<U(y)→0~as~|y|→∞. equation*