Optimal-order exit point bounds in exponential last-passage percolation via the coupling technique

Emrah, Elnur; Janjigian, Christopher; Seppäläinen, Timo

doi:10.48550/arxiv.2105.09402

Cited by 3 publications

(16 citation statements)

References 72 publications

(182 reference statements)

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“…Along the way, we also prove some novel results about geometric last-passage percolation in order to verify our hypotheses. In particular, we prove a new, sharp bound for exit times in increment-stationary geometric last-passage percolation following a strategy recently introduced in [21,22]. This is recorded as Theorem B.1 below.…”

Section: Introductionmentioning

confidence: 99%

Non-existence of non-trivial bi-infinite geodesics in Geometric Last Passage Percolation

Sean¹,

Janjigian²,

Rassoul-Agha³

2021

Preprint

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We show non-existence of non-trivial bi-infinite geodesics in the solvable last-passage percolation model with i.i.d. geometric weights. This gives the first example of a model with discrete weights where non-existence of nontrivial bi-infinite geodesics has been proven. Our proofs rely on the structure of the increment-stationary versions of the model, following the approach recently introduced by Balázs, Busani, and Seppäläinen. Most of our results work for a general weights distribution and we identify the two properties of the stationary distributions which would need to be shown in order to generalize the main result to a non-solvable setting.

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Section: Introductionmentioning

confidence: 99%

Non-existence of non-trivial bi-infinite geodesics in Geometric Last Passage Percolation

Sean¹,

Janjigian²,

Rassoul-Agha³

2021

Preprint

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“…More specifically, this article presents a new derivation of optimal-order central moment bounds in planar directed last-passage percolation (LPP). Our technique builds on a recent strengthening [49,50] of the coupling method, and requires no input from integrable probability or random matrix theory. A main appeal of our approach is that it would in principle be conveniently applicable in both zero and positive temperature settings, as long as the associated increment-stationary LPP and free energy processes are sufficiently tractable.…”

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confidence: 99%

“…The present work introduces our argument in the context of the exponential LPP, one of the quintessential models in the KPZ universality class, with the aim of serving as a detailed blueprint for potential adaptations to the aforementioned settings. Because the inputs from [49,50] were developed for the exponential LPP, this model is also where our presentation can be most concise. 1.2.…”

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confidence: 99%

“…The follow-up work of the authors [93] tailored their technique to the four basic integrable lattice polymers using the framework of [31]. Around the same time, articles [49,50] made the following observations. Certain m.g.f.…”

mentioning

confidence: 99%

“…These subsume the variance identities and elevate the capabilities of the coupling method to the level of integrable probability for many purposes. For example, article [50] derived optimal-order geodesic fluctuation bounds through the enhanced coupling method. Among the several other applications announced in [50], one concerns central moment bounds, which is the topic of the present work.…”

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confidence: 99%

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Coupling derivation of optimal-order central moment bounds in exponential last-passage percolation

Emrah¹,

Georgiou²,

Ortmann³

2022

Preprint

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We introduce new probabilistic arguments to derive optimal-order central moment bounds in planar directed last-passage percolation. Our technique is based on couplings with the increment-stationary variants of the model, and is presented in the context of i.i.d. exponential weights for both zero and near-stationary boundary conditions. A main technical novelty in our approach is a new proof of the left-tail fluctuation upper bound with exponent 3{2 for the last-passage times.

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Upper tail bounds for stationary KPZ models

Landon¹,

Sosoe²

2022

Preprint

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We present a proof of an upper tail bound of the correct order (up to a constant factor in the exponent) in two classes of stationary models in the KPZ universality class.The proof is based on an exponential identity due to Rains in the case of Last Passage Percolation with exponential weights, and recently re-derived by Emrah-Jianjigian-Seppäiläinen (EJS). Our proof follows very similar lines for the two classes of models we consider, using only general monotonocity and convexity properties, and can thus be expected to apply to many other stationary models.

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Optimal-order exit point bounds in exponential last-passage percolation via the coupling technique

Cited by 3 publications

References 72 publications

Non-existence of non-trivial bi-infinite geodesics in Geometric Last Passage Percolation

Non-existence of non-trivial bi-infinite geodesics in Geometric Last Passage Percolation

Coupling derivation of optimal-order central moment bounds in exponential last-passage percolation

Upper tail bounds for stationary KPZ models

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