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31 results on '"Nicolussi, Noema"'

1. Higher rank inner products, Voronoi tilings and metric degenerations of tori

Author

Amini, Omid and Nicolussi, Noema

Subjects
Mathematics - Metric Geometry, Mathematics - Algebraic Geometry, Mathematics - Combinatorics, Mathematics - Differential Geometry, Mathematics - Geometric Topology
Abstract

We introduce higher rank inner products on real and complex vector spaces and study their corresponding Voronoi tilings. We use the framework to describe metric degenerations of polarized tori and Hausdorff limits of Voronoi tilings of discrete sets., Comment: 65 pages, 12 figures. Comments welcome!

Published
2023

2. Capacity of infinite graphs over non-Archimedean ordered fields

Author

Fischer, Florian, Keller, Matthias, Muranova, Anna, and Nicolussi, Noema

Subjects
Mathematics - Analysis of PDEs, Mathematical Physics, Mathematics - Spectral Theory, 31C20, 47S10, 05C50, 05C22, 12J15
Abstract

In this article we study the notion of capacity of a vertex for infinite graphs over non-Archimedean fields. In contrast to graphs over the real field monotone limits do not need to exist. Thus, in our situation next to positive and null capacity there is a third case of divergent capacity. However, we show that either of these cases is independent of the choice of the vertex and is therefore a global property for connected graphs. The capacity is shown to connect the minimization of the energy, solutions of the Dirichlet problem and existence of a Green's function. We furthermore give sufficient criteria in form of a Nash-Williams test, study the relation to Hardy inequalities and discuss the existence of positive superharmonic functions. Finally, we investigate the analytic features of the transition operator in relation to the inverse of the Laplace operator., Comment: 29 pages, 1 figure

Published
2023

3. A note on Spectral Analysis of Quantum graphs

Author

Nicolussi, Noema

Subjects
Mathematics - Spectral Theory, Primary 81Q35, Secondary 34B45, 35R02, 81Q10
Abstract

We provide an introductory review of some topics in spectral theory of Laplacians on metric graphs. We focus on three different aspects: the trace formula, the self-adjointness problem and connections between Laplacians on metric graphs and discrete graph Laplacians., Comment: to appear in Internationale Mathematische Nachrichten; 15 pages, 2 figures

Published
2022

5. Moduli of hybrid curves II: Tropical and hybrid Laplacians

Author

Amini, Omid and Nicolussi, Noema

Subjects
Mathematics - Algebraic Geometry, Mathematics - Combinatorics, Mathematics - Complex Variables, Mathematics - Differential Geometry, Mathematics - Number Theory
Abstract

The present paper is a sequel to our work on hybrid geometry of curves and their moduli spaces. We introduce a notion of hybrid Laplacian, formulate a hybrid Poisson equation, and give a mathematical meaning to the convergence both of the Laplace operator and the solutions to the Poisson equation on Riemann surfaces. As the main theorem of this paper, we then obtain a layered description of the asymptotics of Arakelov Green functions on Riemann surfaces close to the boundary of their moduli spaces. This is done in terms of a suitable notion of hybrid Green functions. As a byproduct of our approach, we obtain other results of independent interest. In particular, we introduce higher rank canonical compactifications of fans and polyhedral spaces and use them to define the moduli space of higher rank tropical curves. Moreover, we develop the first steps of a function theory in higher rank non-Archimedean, hybrid, and tame analysis. Furthermore, we establish the convergence of the Laplace operator on metric graphs toward the tropical Laplace operator on limit tropical curves in the corresponding moduli spaces, leading to new perspectives in operator theory on metric graphs. Our result on the Arakelov Green function is inspired by the works of several authors, in particular those of Faltings, de Jong, Wentworth and Wolpert, and solves a long-standing open problem arising from the Arakelov geometry of Riemann surfaces. The hybrid layered behavior close to the boundary of moduli spaces is expected to be a broad phenomenon and will be explored in our forthcoming work., Comment: 230 pages, 26 figures, comments welcome

Published
2022

6. Laplacians on infinite graphs: discrete vs continuous

Author

Kostenko, Aleksey and Nicolussi, Noema

Subjects
Mathematics - Spectral Theory, Mathematical Physics, Mathematics - Functional Analysis, Mathematics - Metric Geometry
Abstract

There are two main notions of a Laplacian operator associated with graphs: discrete graph Laplacians and continuous Laplacians on metric graphs (widely known as quantum graphs). Both objects have a venerable history as they are related to several diverse branches of mathematics and mathematical physics. The existing literature usually treats these two Laplacian operators separately. In this overview, we will focus on the relationship between them (spectral and parabolic properties). Our main conceptual message is that these two settings should be regarded as complementary (rather than opposite) and exactly their interplay leads to important further insight on both sides., Comment: This is an extended version of the invited lecture of one of us (A.K.) at the 8th European Congress of Mathematics in Portoro\v{z}, June 21-26, 2021. arXiv admin note: text overlap with arXiv:2105.09931

Published
2021
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7. A note on the Gaffney Laplacian on infinite metric graphs

Author

Kostenko, Aleksey and Nicolussi, Noema

Subjects
Mathematics - Functional Analysis, Mathematics - Spectral Theory, Primary 34B45, Secondary 47B25, 81Q10
Abstract

We show that the deficiency indices of the minimal Gaffney Laplacian on an infinite locally finite metric graph are equal to the number of finite volume graph ends. Moreover, we provide criteria, formulated in terms of finite volume graph ends, for the Gaffney Laplacian to be closed., Comment: This version of the article is accepted for publication in J. Funct. Anal

Published
2021
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8. A Glazman-Povzner-Wienholtz Theorem on graphs

Author

Kostenko, Aleksey, Malamud, Mark, and Nicolussi, Noema

Subjects
Mathematics - Spectral Theory, Mathematical Physics, Mathematics - Functional Analysis
Abstract

The Glazman-Povzner-Wienholtz theorem states that the completeness of a manifold, when combined with the semiboundedness of the Schr\"odinger operator $-\Delta + q$ and suitable local regularity assumptions on $q$, guarantees its essential self-adjointness. Our aim is to extend this result to Schr\"odinger operators on graphs. We first obtain the corresponding theorem for Schr\"odinger operators on metric graphs, allowing in particular distributional potentials $q\in H^{-1}_{\rm loc}$. Moreover, we exploit recently discovered connections between Schr\"odinger operators on metric graphs and weighted graphs in order to prove a discrete version of the Glazman-Povzner-Wienholtz theorem., Comment: 24 pages; After submission we learned that the discrete version of the Glazman-Povzner-Wienholtz theorem (Theorem 6.1) was proved earlier by a different approach in arXiv:1301.1304 (see Theorem 2.16 there)

Published
2021
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10. Moduli of hybrid curves I: Variations of canonical measures

Author

Amini, Omid and Nicolussi, Noema

Subjects
Mathematics - Algebraic Geometry, Mathematics - Combinatorics, Mathematics - Complex Variables, Mathematics - Differential Geometry, Mathematics - Number Theory
Abstract

The present paper is the first in a series devoted to the study of asymptotic geometry of Riemann surfaces and their moduli spaces. We introduce the moduli space of hybrid curves as a new compactification of the moduli space of curves, refining the one obtained by Deligne and Mumford. This is the moduli space for multiscale geometric objects which mix complex and higher rank tropical and non-Archimedean geometries, reflecting both discrete and continuous features. We define canonical measures on hybrid curves which combine and generalize Arakelov-Bergman measures on Riemann surfaces and Zhang measures on metric graphs. We then show that the universal family of canonically measured hybrid curves over this moduli space varies continuously. This provides a precise link between the non-Archimedean Zhang measure and variations of Arakelov-Bergman measures in families of Riemann surfaces, answering a question which has been open since the pioneering work of Zhang on admissible pairing in the nineties., Comment: 65 pages, 4 figures, change of title. Final version, to appear in Annales scientifiques de l'ENS

Published
2020

11. Self-adjoint and Markovian extensions of infinite quantum graphs

Author

Kostenko, Aleksey, Mugnolo, Delio, and Nicolussi, Noema

Subjects
Mathematics - Spectral Theory, Mathematical Physics, Mathematics - Functional Analysis, Primary 34B45, Secondary 47B25, 81Q10
Abstract

We investigate the relationship between one of the classical notions of boundaries for infinite graphs, \emph{graph ends}, and self-adjoint extensions of the minimal Kirchhoff Laplacian on a metric graph. We introduce the notion of \emph{finite volume} for ends of a metric graph and show that finite volume graph ends is the proper notion of a boundary for Markovian extensions of the Kirchhoff Laplacian. In contrast to manifolds and weighted graphs, this provides a transparent geometric characterization of the uniqueness of Markovian extensions, as well as of the self-adjointness of the Gaffney Laplacian -- the underlying metric graph does not have finite volume ends. If however finitely many finite volume ends occur (as is the case of edge graphs of normal, locally finite tessellations or Cayley graphs of amenable finitely generated groups), we provide a complete description of Markovian extensions upon introducing a suitable notion of traces of functions and normal derivatives on the set of graph ends., Comment: to appear in J. London Math. Soc.; 47 pages, 2 figures

Published
2019
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12. Trace formulas and continuous dependence of spectra for the periodic conservative Camassa-Holm flow

Author

Eckhardt, Jonathan, Kostenko, Aleksey, and Nicolussi, Noema

Subjects
Mathematics - Spectral Theory, Mathematics - Classical Analysis and ODEs, Primary 34L05, 34B07, Secondary 34L15, 37K15
Abstract

This article is concerned with the isospectral problem \[ -f'' + \frac{1}{4} f = z\omega f + z^2 \upsilon f \] for the periodic conservative Camassa-Holm flow, where $\omega$ is a periodic real distribution in $H^{-1}_{\mathrm{loc}}(\mathbb{R})$ and $\upsilon$ is a periodic non-negative Borel measure on $\mathbb{R}$. We develop basic Floquet theory for this problem, derive trace formulas for the associated spectra and establish continuous dependence of these spectra on the coefficients with respect to a weak$^\ast$ topology., Comment: 16 pages. arXiv admin note: text overlap with arXiv:1801.04612

Published
2019
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13. Quantum graphs on radially symmetric antitrees

Author

Kostenko, Aleksey and Nicolussi, Noema

Subjects
Mathematics - Spectral Theory, Mathematical Physics, 34B45 (Primary), 35P15, 81Q10, 81Q35 (Secondary)
Abstract

We investigate spectral properties of Kirchhoff Laplacians on radially symmetric antitrees. This class of metric graphs enjoys a rich group of symmetries, which enables us to obtain a decomposition of the corresponding Laplacian into the orthogonal sum of Sturm--Liouville operators. In contrast to the case of radially symmetric trees, the deficiency indices of the Laplacian defined on the minimal domain are at most one and they are equal to one exactly when the corresponding metric antitree has finite total volume. In this case, we provide an explicit description of all self-adjoint extensions including the Friedrichs extension. Furthermore, using the spectral theory of Krein strings, we perform a thorough spectral analysis of this model. In particular, we obtain discreteness and trace class criteria, criterion for the Kirchhoff Laplacian to be uniformly positive and provide spectral gap estimates. We show that the absolutely continuous spectrum is in a certain sense a rare event, however, we also present several classes of antitrees such that the absolutely continuous spectrum of the corresponding Laplacian is $[0,\infty)$.

Published
2019
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14. Strong Isoperimetric Inequality for Tessellating Quantum Graphs

Author

Nicolussi, Noema

Subjects
Mathematics - Metric Geometry, Mathematics - Spectral Theory, 34B45, 35P15, 81Q35
Abstract

We investigate isoperimetric constants of infinite tessellating metric graphs. We introduce a curvature-like quantity, which plays the role of a metric graph analogue of discrete curvature notions for combinatorial tessellating graphs. We then prove a lower estimate and a criterium for positivity of the isoperimetric constant.

Published
2018

15. On the Hamiltonian-Krein index for a non-self-adjoint spectral problem

Author

Kostenko, Aleksey and Nicolussi, Noema

Subjects
Mathematics - Spectral Theory, Mathematics - Classical Analysis and ODEs
Abstract

We investigate the instability index of the spectral problem $$ -c^2y'' + b^2y + V(x)y = -\mathrm{i} z y' $$ on the line $\mathbb{R}$, where $V\in L^1_{\rm loc}(\mathbb{R})$ is real valued and $b,c>0$ are constants. This problem arises in the study of stability of solitons for certain nonlinear equations (e.g., the short pulse equation and the generalized Bullough-Dodd equation). We show how to apply the standard approach in the situation under consideration and as a result we provide a formula for the instability index in terms of certain spectral characteristics of the 1-D Schr\"odinger operator $H_V=-c^2\frac{d^2}{dx^2}+b^2 +V(x)$., Comment: 15 pages; to appear in Proc. Amer. Math. Soc

Published
2017
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16. Spectral Estimates for Infinite Quantum Graphs

Author

Kostenko, Aleksey and Nicolussi, Noema

Subjects
Mathematics - Spectral Theory, Mathematical Physics, Mathematics - Functional Analysis, 34B45, 34P15, 81Q35
Abstract

We investigate the bottom of the spectra of infinite quantum graphs, i.e., Laplace operators on metric graphs having infinitely many edges and vertices. We introduce a new definition of the isoperimetric constant for quantum graphs and then prove the Cheeger-type estimate. Our definition of the isoperimetric constant is purely combinatorial and thus it establishes connections with the combinatorial isoperimetric constant, one of the central objects in spectral graph theory and in the theory of simple random walks on graphs. The latter enables us to prove a number of criteria for quantum graphs to be uniformly positive or to have purely discrete spectrum. We demonstrate our findings by considering trees, antitrees and Cayley graphs of finitely generated groups., Comment: 38 pages; 2 figures

Published
2017
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18. Strong Isoperimetric Inequality for Tessellating Quantum Graphs

Author

Nicolussi, Noema, Gohberg, Israel, Founding Editor, Ball, Joseph A., Series Editor, Böttcher, Albrecht, Series Editor, Dym, Harry, Series Editor, Langer, Heinz, Series Editor, Tretter, Christiane, Series Editor, Atay, Fatihcan M., editor, Kurasov, Pavel B., editor, and Mugnolo, Delio, editor

Published
2020
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26. Laplacians on Infinite Graphs.

Author

Kostenko, Aleksey and Nicolussi, Noema

Subjects
WEIGHTED graphs, LAPLACIAN operator, LAPLACIAN matrices, DIFFERENTIAL operators, CAYLEY graphs
Abstract

The main focus in this memoir is on Laplacians on both weighted graphs and weighted metric graphs. Let us emphasize that we consider infinite locally finite graphs and do not make any further geometric assumptions. Whereas the existing literature usually treats these two types of Laplacian operators separately, we approach them in a uniform manner in the present work and put particular emphasis on the relationship between them. One of our main conceptual messages is that these two settings should be regarded as complementary (rather than opposite) and exactly their interplay leads to important further insight on both sides. Our central goal is twofold. First of all, we explore the relationships between these two objects by comparing their basic spectral (self-adjointness, spectral gap, etc.), parabolic (Markovian uniqueness, recurrence, stochastic completeness, etc.), and metric (quasi-isometries, intrinsic metrics, etc.) properties. In turn, we exploit these connections either to prove new results for Laplacians on metric graphs or to provide new proofs and perspective on the recent progress in weighted graph Laplacians. We also demonstrate our findings by considering several important classes of graphs (Cayley graphs, tessellations, and antitrees). [ABSTRACT FROM AUTHOR]

Published
2022
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27. Moduli of hybrid curves and variations of canonical measures

Author

Amini, Omid and Nicolussi, Noema

Subjects
Mathematics - Differential Geometry, Mathematics - Algebraic Geometry, Mathematics::Algebraic Geometry, Mathematics - Number Theory, Differential Geometry (math.DG), Mathematics - Complex Variables, FOS: Mathematics, Mathematics - Combinatorics, Combinatorics (math.CO), Number Theory (math.NT), Complex Variables (math.CV), Algebraic Geometry (math.AG)
Abstract

We introduce the moduli space of hybrid curves as the hybrid compactification of the moduli space of curves thereby refining the one obtained by Deligne and Mumford. As the main theorem of this paper we then show that the universal family of canonically measured hybrid curves over this moduli space varies continuously. On the way to achieve this, we present constructions and results which we hope could be of independent interest. In particular, we introduce higher rank variants of hybrid spaces which refine and combine both the ones considered by Berkovich, Boucksom and Jonsson, and metrized complexes of varieties studied by Baker and the first named author. Furthermore, we introduce canonical measures on hybrid curves which simultaneously generalize the Arakelov-Bergman measure on Riemann surfaces, Zhang measure on metric graphs, and Arakelov-Zhang measure on metrized curve complexes. This paper is part of our attempt to understand the precise link between the non-Archimedean Zhang measure and variations of Arakelov-Bergman measures in families of Riemann surfaces, answering a question which has been open since the pioneering work of Zhang on admissible pairing in the nineties., Comment: 78 pages. Clarified and included more details in some of the constructions

Published
2020
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28. Spectral analysis of infinite quantum graphs

Author

Nicolussi, Noema

Abstract

Der Begriff „Quantengraph” bezeichnet einen Laplace-Differentialoperator auf einem metrischen Graphen (ein kombinatorischer Graph, dessen Kanten als Intervalle unterschiedlicher Länge aufgefasst werden). Dieses Konzept wurde von L. Pauling in den 1930er-Jahren eingeführt und fand zahlreiche Anwendungen in der Chemie, Physik und Biologie. Endliche Quantengraphen (d.h., der metrische Graph besitzt endlich viele Knoten und Kanten) wurden in den letzten Jahren intensiv studiert. Über die Eigenschaften von Quantengraphen auf unendlichen Graphen ist weniger bekannt und ein großer Teil der existierenden Literatur behandelt diese nur unter einer zusätzlichen geometrischen Annahme, der Existenz einer strikt positiven unteren Schranke für die Kantenlängen. Gleichzeitig ist jedoch bekannt, dass dies gewisse interessante Phänomene und spektrale Eigenschaften bereits ausschließt. Die vorliegende Arbeit befasst sich mit verschiedenen Aspekten der Spektraltheorie von unendlichen Quantengraphen. Besonderer Fokus liegt dabei auf unendlichen Graphen ohne zusätzliche geometrische Bedingungen und den besonderen Phänomenen, die in diesem Fall auftreten können. Der erste Teil der Arbeit widmet sich Spektralabschätzungen für den Kirchhoff Laplace-Operator. Wir definieren eine isoperimetische Konstante für unendliche Quantengraphen und beweisen eine Cheeger-Abschätzung. Dies ergibt insbesondere rein kombinatorische Bedingungen unter denen der Kirchhoff Laplace-Operator strikt positives oder rein diskretes Spektrum besitzt. Im zweite Teil studieren wir die isoperimetrische Konstante für den Spezialfall von planaren metrische Graphen näher. Motiviert durch ähnliche Konzepte für kombinatorische Graphen benützen dafür wir eine Krümmungsgröße. Im dritten Teil untersuchen wir radialsymmetrische Antibäume, eine spezielle Klasse von unendlichen Graphen mit besonderen Symmetrieeigenschaften. Wir analysieren grundlegende spektrale Eigenschaften und konstruieren Beispiele von Antibäumen, für die das absolutstetige Spektrum des Kirchhoff Laplace-Operators gleich der positiven Halbachse ist. Das Ziel des vierten Teils ist die Entwicklung grundlegender Erweiterungstheorie für den minimalen Kirchhoff Laplace-Operator. Unter der oben erwähnten geometrischen Annahme ist dieser Operator selbst-adjungiert und daher gibt es zu diesem Thema bisher nur wenige Resultate. Wir studieren den Zusammenhang zwischen selbst-adjungierten Erweiterungen und Graphenden, einem klassischen Randbegriff für unendliche Graphen, der unabhängig von Freudenthal und Halin eingeführt wurde. Dabei erhalten wir eine scharfe untere Abschätzung für die Defektindizes und eine geometrische Charakterisierung der Existenz einer eindeutigen markowschen Erweiterung. Der fünfte und letzte Teil stellt ein Komplement zum vorigen dar. Wir definieren den Gaffney Laplace-Operator im Kontext von unendlichen metrischen Graphen, beweisen Resultate im Zusammenhang mit seiner Abgeschlossenheit und finden unter der Verwendung von Graphenden eine explizite Formel für die Defektindizes des minimalen Gaffney Laplace-Operators., A “quantum graph” is a Laplacian differential operator on a metric graph, that is a combinatorial graph where edges are identified with intervals of certain lengths. Introduced by L. Pauling in the 1930s, this concept has found various applications in chemistry, physics and biology. Finite quantum graphs (i.e., the metric graph has finitely many vertices and edges) are rather widely studied. On the other hand, less is known about quantum graphs on infinite metric graphs and in particular, a large part of the existing literature relies on an additional geometrical assumption, the existence of a uniform positive lower bound on the edge lengths. However, this is known to exclude certain interesting phenomena and spectral properties. The present thesis is concerned with several aspects of the spectral theory of infinite quantum graphs. Particular focus lies on infinite graphs without additional geometrical assumptions and the specific phenomena arising in this situation. The first part of the thesis is devoted to spectral estimates for the Kirchhoff Laplacian. We introduce a notion of an isoperimetric constant for infinite metric graphs and obtain a Cheeger-type estimate. This leads in particular to purely combinatorial criteria for the Kirchhoff Laplacian to have uniformly positive or discrete spectrum. The second part contains a study of the isoperimetric constant for tessellating metric graphs. Motivated by similar concepts in the setting of combinatorial graphs, this is carried out in terms of a curvature-like quantity. In the third part we investigate radially symmetric antitrees, a special class of infinite graphs with a high degree of symmetry. We perform a detailed spectral analysis and provide examples of antitrees for which the Kirchhoff Laplacian has absolutely continuous spectrum equal to the positive halfline. The goal of the fourth part is to develop basic extension theory for the minimal Kirchhoff Laplacian. The geometric standard assumption implies self-adjointness and hence there has been little prior work on this subject. In our approach, we study the connection between self-adjoint extensions and the notion of graph ends, an ideal boundary for infinite graphs introduced independently by Freudenthal and Halin. We obtain a sharp lower estimate on the deficiency indices and a geometric characterization of uniqueness of a Markovian extension. The fifth part can be seen as a complement to the previous. We introduce the Gaffney Laplacian on an infinite metric graph, prove results regarding its closedness and provide an explicit formula for the deficiency indices of the minimal Gaffney Laplacian in terms of graph ends.

Published
2020
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30. The Korteweg-de Vries equation: long-time asymptotics in the similarity region

Author

Nicolussi, Noema

Abstract

Die Korteweg-de-Vries Gleichung ist eine nichtlineare, partielle Differentialgleichung, die verwendet wird, um die Ausbreitung von Flachwasserwellen zu beschreiben. Das Ziel dieser Arbeit besteht darin, das Verhalten ihrer Lösungen für große Zeiten in der Similaritätsregion zu bestimmen. Dies wird durch eine Kombination von Resultaten aus der Streutheorie mit der Methode des nichtlinearen, steilsten Abstiegs für oszillierende Riemann-Hilbert-Probleme erreicht. Diese Herangehensweise ist grundsätzlich bereits bekannt, doch liegt der Fokus hier auf einigen technischen Aspekten, die zuvor nicht im Detail behandelt wurden.

Published
2016
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31. Spectral estimates for infinite quantum graphs.

Author

Kostenko, Aleksey and Nicolussi, Noema

Subjects
QUANTUM graph theory, ESTIMATION theory, INFINITE groups, CAYLEY graphs, RANDOM walks, ISOPERIMETRICAL problems
Abstract

We investigate the bottom of the spectra of infinite quantum graphs, i.e., Laplace operators on metric graphs having infinitely many edges and vertices. We introduce a new definition of the isoperimetric constant for quantum graphs and then prove the Cheeger-type estimate. Our definition of the isoperimetric constant is purely combinatorial and thus it establishes connections with the combinatorial isoperimetric constant, one of the central objects in spectral graph theory and in the theory of simple random walks on graphs. The latter enables us to prove a number of criteria for quantum graphs to be uniformly positive or to have purely discrete spectrum. We demonstrate our findings by considering trees, antitrees and Cayley graphs of finitely generated groups. [ABSTRACT FROM AUTHOR]

Published
2019
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