Blow-up Solutions for General Toda Systems on Riemann Surfaces

Abstract

In this paper, we study general Toda systems with homogeneous Neumann boundary conditions on Riemann surfaces. Assuming the surface satisfies the ``k-symmetric'' condition, we construct a family of bubbling solutions using singular perturbation methods, where the concentration rates of different components occur in distinct orders. In particular, we establish the existence of asymmetric blow-up solutions for the SU(3) Toda system. Furthermore, the blow-up points are precisely located at the ``k-symmetric'' centers of the surface. Keywords: Toda system, Neumann boundary condition, Blow-up solutions, k-symmetry, Finite-dimensional reduction