Connectedness properties of small minimal clusters in Riemannian or Finsler manifolds
Abstract
We prove that in a compact Riemannian manifold, the m-minimal clusters of sufficiently small total volume are connected and with small diameter, while in a more general Finsler manifold they are done by at most m connected components of small diameter. We apply these results to calculate the asymptotic expansion of the multi-isoperimetric profile at the first nontrivial order, for small volumes.
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