On the Classification of blow-up solutions of a singular Liouville equation on the disk

Abstract

We study the blow-up behavior of solutions to the singular Liouville equation \[ u+λ e u=4παδ0 B, u=0 ∂ B, \] where α>0, λ>0 and B⊂ R2 is the unit disk. Our main results give a complete classification of all blow-up solutions and determine the exact number of solutions to the above equation. More precisely, for fixed α>0 and λ∈(0,λα), the singular Liouville equation has exactly α+2 solutions (up to rotation): a unique minimal energy solution; a unique singular sequence blowing up at the origin; and for each 1 m α, a unique m-peak sequence whose blow-up points are the vertices of a regular m-gon centered at the origin. This result answers the questions raised in Bartolucci-Montefusco Bartolucci-Montefusco06 and Bartolucci Bartolucci10. We also prove the non-degeneracy of these solutions. Thus we provide a full description of the blow-up structure for the singular Liouville equation on the disk.

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