Finite total curvature and soap bubbles with almost constant higher-order mean curvature

Abstract

Given n ≥ 2 and k ∈ \2, … , n\ , we study the asymptotic behaviour of sequences of bounded C2-domains of finite total curvature in Rn+1 converging in volume and perimeter, and with the k -th mean curvature functions converging in L1 to a constant. Under natural mean convexity hypothesis, and assuming an L∞ -control on the mean curvature outside a set of vanishing area, we prove that finite unions of mutually tangent balls are the only possible limits. This is the first result where such a uniqueness is proved without assuming uniform bounds on the exterior or interior touching balls.