Mass concentration of minimizers for L2-subcritical Kirchhoff energy functional in bounded domains

Abstract

We are concerned with L2-constraint minimizers for the Kirchhoff functional Eb(u)=∫|∇ u|2dx+b2(∫|∇ u|2dx)2+∫ V(x)u2dx-β2∫|u|4dx, where b>0, β>0 and V(x) is a trapping potential in a bounded domain of R2. As is well known that minimizers exist for any b>0 and β>0, while the minimizers do not exist for b=0 and β≥β*, where β*=∫ R2|Q|2dx and Q is the unique positive solution of - u+u-u3=0 in R2. In this paper, we show that for β=β*, the energy converges to 0, but for β>β*, the minimal energy will diverge to -∞ as b0. Further, we give the refined limit behaviors and energy estimates of minimizers as b0 for β=β* or β>β*. For both cases, we obtain that the mass of minimizers concentrates either at an inner point or near the boundary of , depending on whether V(x) attains its flattest global minimum at an inner point of or not. Meanwhile, we find an interesting phenomenon that the blow-up rate when the minimizers concentrate near the boundary of is faster than concentration at an interior point if β=β*, but the blow-up rates remain consistent if β>β*.

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