Cheeger cuts and Robin spectral minimal partitions of metric graphs

Abstract

We study partition problems based on two ostensibly different kinds of energy functionals defined on k-partitions of metric graphs: Cheeger-type functionals whose minimisers are the k-Cheeger cuts of the graph, and the corresponding values are the k-Cheeger constants of the graph; and functionals built using the first eigenvalue of the Laplacian with positive, i.e. absorbing, Robin (delta) vertex conditions at the boundary of the partition elements. We prove existence of minimising k-partitions, k ≥ 2, for both these functionals. We also show that, for each k ≥ 2, as the Robin parameter α 0, up to a renormalisation the spectral minimal Robin energy converges to the k-Cheeger constant. Moreover, up to a subsequence, the Robin spectral minimal k-partitions converge in a natural sense to a k-Cheeger cut of the graph. Finally, we show that as α ∞ there is convergence in a similar sense to the corresponding Dirichlet minimal energy and partitions. It is strongly expected that similar results hold on general (smooth, bounded) Euclidean domains and manifolds.

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