Minimal partitions for $p$-norms of eigenvalues

Bonnaillie‐Noël, Virginie; Bogosel, Beniamin

doi:10.4171/ifb/399

Cited by 8 publications

(15 citation statements)

References 28 publications

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“…In particular, the optimal partition is never the equipartition except for p = ∞ (which we recall corresponds to a ∞ = 0), and the cut point v 0 , as a function of p, moves smoothly and monotonically from its location at p = 1 towards the central vertex as p → ∞. This mirrors very much the numerically observed behaviour of the (conjectured) optimal partitions on domains in [BBN18].…”

Section: Dependence Of the Optimal Partitions On The Parameterssupporting

confidence: 69%

“…But (7.1) is a direct consequence of the Hölder inequality, using the definition (4.1) of Λ N p (P). We continue discussing the dependence of optimal partitions and energies on p. To begin with, let us present a concrete example illustrating how the optimal partition, say in the simplest case for L D 2,p , can depend nontrivially on p. On domains, relatively little seems to be known, and most of the work to date seems to have been of (largely) numerical nature; see in particular [BBN18]. Our example, in addition to establishing that L D 2,p and the corresponding optimal partitions can, in fact, depend on p, should also demonstrate how in the case of metric graphs it seems possible to prove more properties (such as monotonicity of the deformation in p) analytically.…”

Section: Dependence Of the Optimal Partitions On The Parametersmentioning

confidence: 99%

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A theory of spectral partitions of metric graphs

Kennedy¹,

Kurasov²,

Léna³

et al. 2020

Preprint

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We introduce an abstract framework for the study of clustering in metric graphs: after suitably metrising the space of graph partitions, we restrict Laplacians to the clusters thus arising and use their spectral gaps to define several notions of partition energies; this is the graph counterpart of the well-known theory of spectral minimal partitions on planar domains and includes the setting in [Band et al, Comm. Math. Phys. 311 (2012), 815-838] as a special case. We focus on the existence of optimisers for a large class of functionals defined on such partitions, but also study their qualitative properties, including stability, regularity, and parameter dependence. We also discuss in detail their interplay with the theory of nodal partitions. Unlike in the case of domains, the one-dimensional setting of metric graphs allows for explicit computation and analytic -rather than numerical -results. Not only do we recover the main assertions in the theory of spectral minimal partitions on domains, as studied in [

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Section: Dependence Of the Optimal Partitions On The Parameterssupporting

confidence: 69%

Section: Dependence Of the Optimal Partitions On The Parametersmentioning

confidence: 99%

A theory of spectral partitions of metric graphs

Kennedy¹,

Kurasov²,

Léna³

et al. 2020

Preprint

View full text Add to dashboard Cite

show abstract

“…For α = 1, problem (3) has been firstly studied by Caroccia in the paper [10], where the existence of solutions and some regularity results for the free boundaries are obtained. In fact, for arbitrary α > N −1 N , the existence of solutions (E 1 , .…”

Section: Introduction and Statement Of The Resultsmentioning

confidence: 99%

“…We choose to use a p-norm approach since this regularizes the non-smooth problem of minimizing the maximal radius of a family of disks. The minimization of a p-norm instead of the ∞-norm is a natural idea, already used in [3] for the study of partitions of a domain which minimize the largest fundamental eigenvalue of the Dirichlet-Laplace operator.…”

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confidence: 99%

Phase Field Approach to Optimal Packing Problems and Related Cheeger Clusters

2018

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In a fixed domain of R N we study the asymptotic behaviour of optimal clusters associated to α-Cheeger constants and natural energies like the sum or maximum: we prove that, as the parameter α converges to the "critical" value N −1 N + , optimal Cheeger clusters converge to solutions of different packing problems for balls, depending on the energy under consideration. As well, we propose an efficient phase field approach based on a multiphase Gamma convergence result of Modica-Mortola type, in order to compute α-Cheeger constants, optimal clusters and, as a consequence of the asymptotic result, optimal packings. Numerical experiments are carried over in two and three space dimensions.

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“…In cases where the previous criterion shows that candidates for the max are not optimal for the sum, we propose better candidates in Section 5. These candidates are either obtained with iterative methods already used in [6,3] or are constructed explicitly. §2.…”

Section: §1 Introductionmentioning

confidence: 99%

Optimal partitions for the sum and the maximum of eigenvalues

Bogosel,

Bonnaillie-Noël

2017

Preprint

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In this paper we compare the candidates to be spectral minimal partitions for two criteria: the maximum and the average of the first eigenvalue on each subdomains of the partition. We analyze in detail the square, the disk and the equilateral triangle. Using numerical simulations, we propose candidates for the max, prove that most of them can not be optimal for the sum and then exhibit better candidates for the sum.

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Minimal partitions for $p$-norms of eigenvalues

Cited by 8 publications

References 28 publications

A theory of spectral partitions of metric graphs

A theory of spectral partitions of metric graphs

Phase Field Approach to Optimal Packing Problems and Related Cheeger Clusters

Optimal partitions for the sum and the maximum of eigenvalues

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