Bubble classification of immersions at the boundary of the moduli space with 8π Willmore energy

Abstract

We study the asymptotic bubbling behavior of sequences of weak genus-p immersions with diverging conformal classes and limiting Willmore energy of 8π. After applying suitable M\"obius transformations, in a strong W2,2loc-limit, we obtain two round spheres at the largest scale and p+1 catenoids at the smallest scales. Moreover, we apply this classification to sequences of isoperimetrically, conformally and normalized-total-mean-curvature constrained Willmore minimizers when the constraints approach the boundary of the domain where minimizers exist, respectively.