Estimates of bubbling solutions of SU(3) Toda systems at critical parameters-Part 1

Abstract

For regular SU(3) Toda systems defined on Riemann surface, we initiate the study of bubbling solutions if parameters (1k,2k) are both tending to critical positions: (1k,2k) (4π, 4π N) or (4π N, 4π) (N>0 is an integer). We prove that there are at most three formations of bubbling profiles, and for each formation we identify leading terms of 1k-4π and 2k-4π N, locations of blowup points and comparison of bubbling heights with sharp precision. The results of this article will be used as substantial tools for a number of degree counting theorems, critical point at infinity theory in the future.