Large m asymptotics for minimal partitions of the Dirichlet eigenvalue

Abstract

In this paper, we study large m asymptotics of the l1 minimal m-partition problem for Dirichlet eigenvalue. For any smooth domain ∈ Rn such that ||=1, we prove that the limit m→∞lm1()=c0 exists, and the constant c0 is independent of the shape of . Here lm1() denotes the minimal value of the normalized sum of the first Laplacian eigenvalues for any m-partition of .