Poisson kernel expansions for Schrödinger operators on trees

Anantharaman, Nalini; Sabri, Mostafa

doi:10.4171/jst/247

Cited by 12 publications

(9 citation statements)

References 20 publications

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“…As a general rule, the objects defined on the limit (T , W) will wear a hat· to distinguish them from similar objects defined on ( ‹ G N , W N ) (see also Remark A.3). The Green functions on trees satisfy some classical recursive relations; the following lemma is proved for instance in [10]. Given v ∈ V (T ), we denote by N v its set of nearest neighbours.…”

Section: 2mentioning

confidence: 99%

Quantum ergodicity on graphs: From spectral to spatial delocalization

Anantharaman

Sabri

2019

Ann. of Math. (2)

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We prove a quantum-ergodicity theorem on large graphs, for eigenfunctions of Schrödinger operators in a very general setting. We consider a sequence of finite graphs endowed with discrete Schrödinger operators, assumed to have a local weak limit. We assume that our graphs have few short loops, in other words that the limit model is a random rooted tree endowed with a random discrete Schrödinger operator. We show that absolutely continuous spectrum for the infinite model, reinforced by a good control of the moments of the Green function, imply "quantum ergodicity", a form of spatial delocalization for eigenfunctions of the finite graphs approximating the tree. This roughly says that the eigenfunctions become equidistributed in phase space. Our result applies in particular to graphs converging to the Anderson model on a regular tree, in the régime of extended states studied by Klein and Aizenman-Warzel.2010 Mathematics Subject Classification. Primary 58J51. Secondary 60B20, 81Q10.

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Section: 2mentioning

confidence: 99%

Quantum ergodicity on graphs: From spectral to spatial delocalization

Anantharaman

Sabri

2019

Ann. of Math. (2)

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“…A closely related result on Poisson transformations for general trees has recently been obtained by Anantharaman and Sabri [AS19]. Their perspective, however, is complementary to ours: They start with a given graph and a Schrödinger operator and construct a suitable Poisson kernel in terms of Green's functions.…”

Section: Introductionmentioning

confidence: 68%

Poisson Transforms for Trees of Bounded Degree

Bux¹,

Hilgert²,

Weich³

2021

Preprint

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“…In fact, such eigenfunctions form a "basis" for the set of generalized eigenfunctions of A Tq (cf. [9] and references therein for more general operators). However, as the Green function G γ of A Tq is explicit, by simple calculation one sees that for any λ ∈…”

Section: Discussionmentioning

confidence: 99%