Partial Blow-up Phenomena in the SU(3) Toda System on Riemann Surfaces

Abstract

This work studies the partial blow-up phenomena for the SU(3) Toda system on compact Riemann surfaces with smooth boundary. We consider the following coupled Liouville system with Neumann boundary conditions: -g u1 = 21( V1 eu1∫ V1 eu1 \, dvg - 1 ||g) - 2( V2 eu2∫ V2 eu2 \, dvg - 1||g) in \, and -g u2 = 22( V2 eu2∫ V2 eu2 \, dvg - 1||g) - 1( V1 eu1∫ V1 eu1 \, dvg - 1||g) in \, with boundary conditions ∂_g u1 = ∂_g u2 = 0 on \, ∂ , where (, g) is a compact Riemann surface with the interior and smooth boundary ∂, i is a non-negative parameter and Vi is a smooth positive function for i=1,2. We construct a family of blow-up solutions via the Lyapunov-Schmidt reduction and variational methods, wherein one component remains uniformly bounded from above, while the other exhibits partial blow-ups at a prescribed number of points, both in the interior and on the boundary. This construction is based on the existence of a non-degeneracy solution of a so-called shadow system. Moreover, we establish the existence of partial blow-up solutions in three cases: (i) for any 2>0 sufficiently small; (ii) for generic V1, V2 and any 2∈ (0,2π); (iii) for generic V1, V2, the Euler characteristic ()<1 and any 2∈ (2π,+∞) 2π N+.