Affine Toda system of A and Ct type: compactness and affine Weyl group

Abstract

The local mass is a fundamental quantized information that characterizes the blow-up solution to the Toda system and has a profound relationship with its underlying algebraic structure. In Lin-Yang-Zhong-2020, it was observed that the associated Weyl group can be employed to represent this information for the An, Bn, Cn and G2 type Toda systems. The relationship between the local mass of blow-up solution and the corresponding affine Weyl group is further explored for some affine B type Toda systems in Cui-Wei-Yang-Zhang-2022, where the possible local masses are explicitly expressed in terms of 8 types. The current work presents a comprehensive study of the general affine A and Ct type Toda systems with arbitrary rank. At each stage of the blow-up process (via scaling), we can employ certain elements (known as "set chains") in the corresponding affine Weyl group to measure the variation of local mass. Consequently, we obtain the a priori estimate of the affine A and Ct type Toda systems with arbitrary number of singularities.