Upper bounds for Steklov eigenvalues of subgraphs of polynomial growth Cayley graphs

Tschanz, Léonard

doi:10.1007/s10455-021-09799-w

Cited by 5 publications

(5 citation statements)

References 10 publications

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“…As said before, we want to work on graphs that have exponential growth rates; therefore, we will only consider the third case in this paper. Since one may ask if our result is still true for the two other cases, we remark that in the Euclidean case, the triangle group has polynomial growth rate and then has already been studied in [16]. Regarding the spherical case, the triangle group is finite, and hence, one can theoretically compute all different possible situations.…”

Section: Triangle Groups and Associated Triangle-tiling Graphsmentioning

confidence: 80%

“…As a corollary, we have Corollary 7 (Corollary 6 in [16]) Let be a polynomial growth Cayley graph of order d ≥ 2 and ( l ) ∞ l=1 be a sequence of subgraphs of such that…”

Section: Definitionmentioning

confidence: 96%

“…This theorem is way more general about the class of host graph but provides us control over the first non-trivial eigenvalue only, see [13] for details. We gave an extension to this result in a precedent article: Theorem 6 (Theorem 5 in [16]) Let = Cay(G, S) be a polynomial growth Cayley graph of order d ≥ 2. Let be a subgraph of .…”

Section: Definitionmentioning

confidence: 99%

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The Steklov Problem on Triangle-Tiling Graphs in the Hyperbolic Plane

Tschanz

2023

J Geom Anal

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We introduce a graph $$\Gamma $$ Γ which is roughly isometric to the hyperbolic plane, and we study the Steklov eigenvalues of a subgraph with boundary $$\Omega $$ Ω of $$\Gamma $$ Γ . For $$(\Omega _l)_{l\ge 1}$$ ( Ω l ) l ≥ 1 a sequence of subgraphs of $$\Gamma $$ Γ such that $$|\Omega _l| \longrightarrow \infty $$ | Ω l | ⟶ ∞ , we prove that for each $$k \in \mathbb {N}$$ k ∈ N , the $$k^{\text{ th }}$$ k th eigenvalue tends to 0 proportionally to $$1/|B_l|$$ 1 / | B l | . The idea of the proof consists in finding a bounded domain N of the hyperbolic plane which is roughly isometric to $$\Omega $$ Ω , giving an upper bound for the Steklov eigenvalues of N and transferring this bound to $$\Omega $$ Ω via a process called discretization.

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Section: Triangle Groups and Associated Triangle-tiling Graphsmentioning

confidence: 80%

“…As a corollary, we have Corollary 7 (Corollary 6 in [16]) Let be a polynomial growth Cayley graph of order d ≥ 2 and ( l ) ∞ l=1 be a sequence of subgraphs of such that…”

Section: Definitionmentioning

confidence: 96%

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The Steklov Problem on Triangle-Tiling Graphs in the Hyperbolic Plane

Tschanz

2023

J Geom Anal

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“…In [15], the authors prove a uniform spectral comparison inequality between the Steklov eigenvalues of a manifold and those of its discretization. This idea used by Tschanz in [36] to transfer upper bounds of the Steklov spectrum of a bounded domain of M to subgraph of finite polynomial growth Cayley graphs. This strategy is known as coarse discretization, which is used in the literature to the spectral geometry of the Laplacian on closed Riemannian manifolds.…”

Section: Introductionmentioning

confidence: 99%

The First Steklov Eigenvalue on Infinite Subgraphs of Integer Lattices

Chebbi

2023

Preprint

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In the context of transient graphs, we study the first Steklov eigenvalue σ0(Ω) of an infinite subgraph with finite boundary (Ω, B) of the integer lattice Zn. We focus in this paper on finding lower bounds using the technique of discretization of smooth compact Riemannian manifolds with cylindrical boundary. These bounds essentially depend on the discretization of the sphere Sn ⊂ Rn+1 with two identical boundaries’ isometrics to {1} × Sn−1 through quasi-isometries. As a consequence, if n ≥ 4 and the boundary B considered as a finite subset of Zd where 1 ≤ d ≤ n − 3, we show that σ0(Ω)|B| 1/n−1 tends to infinity as the cardinal of B tends to infinity. Moreover, if n ≥ 3 and the boundary B is a sphere, we prove that the first Steklov eigenvalue tends to zero proportionally to 1/|B| 1/n−1 as the radius tends to infinity and that σ0(Ω)|B| 1/n−1 is bounded. 2010 Mathematics Subject Classification. 39A12, 05C63, 47B25, 05C12, 05C50.

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“…Although the notions are new, there have been a number of studies on exploring the properties of Steklov eigenvalues in the discrete setting. For example, in [13,16,17,12,14,20,26], the authors studied isoperimetric control of Steklov eigenvalues. In [15,27], the authors studied monotonicity of Steklov eigenvalues.…”

Section: Introductionmentioning

confidence: 99%

Minimal Steklov eigenvalues on combinatorial graphs

Yu¹,

Yu²

2022

Preprint

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Upper bounds for Steklov eigenvalues of subgraphs of polynomial growth Cayley graphs

Abstract: We study the Steklov problem on a subgraph with boundary $$(\Omega ,B)$$ ( Ω , B ) of a polynomial growth Cayley graph $$\Gamma$$ Γ . For $$(\Omega _l, B_l)_{l=1}^\infty$$ ( Ω l , … Show more

Cited by 5 publications

References 10 publications

The Steklov Problem on Triangle-Tiling Graphs in the Hyperbolic Plane

The Steklov Problem on Triangle-Tiling Graphs in the Hyperbolic Plane

The First Steklov Eigenvalue on Infinite Subgraphs of Integer Lattices

Minimal Steklov eigenvalues on combinatorial graphs

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