The intermediate disorder regime for a directed polymer model on a hierarchical lattice

Alberts, Tom; Clark, Jeremy; Kocić, Saša

doi:10.1016/j.spa.2017.02.011

Cited by 12 publications

(20 citation statements)

References 22 publications

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“…Let us mention some related work on the directed polymer model on the hierarchical lattice. In particular, for the marginally relevant case, Alberts, Clark and Kocić in [ACK17] established the existence of a phase transition, similar to [CSZ17a]. And more recently, Clark [Cla17] computed the moments of the partition function around a critical window for the case of bond disorder.…”

Section: 22)mentioning

confidence: 91%

On the Moments of the $$(2+1)$$-Dimensional Directed Polymer and Stochastic Heat Equation in the Critical Window

Caravenna

Sun

Zygouras

2019

Commun. Math. Phys.

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The partition function of the directed polymer model on Z 2`1 undergoes a phase transition in a suitable continuum and weak disorder limit. In this paper, we focus on a window around the critical point. Exploiting local renewal theorems, we compute the limiting third moment of the space-averaged partition function, showing that it is uniformly bounded. This implies that the rescaled partition functions, viewed as a generalized random field on R 2 , have non-trivial subsequential limits, and each such limit has the same explicit covariance structure. We obtain analogous results for the stochastic heat equation on R 2 , extending previous work by Bertini and Cancrini [BC98].

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Section: 22)mentioning

confidence: 91%

On the Moments of the $$(2+1)$$-Dimensional Directed Polymer and Stochastic Heat Equation in the Critical Window

Caravenna

Sun

Zygouras

2019

Commun. Math. Phys.

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“…This limit result is analogous to the intermediate disorder regime in [2] for directed polymers on the (1 + 1)-rectangular lattice. My focus here will be on developing the theory for a CDRP corresponding to the limiting partition function obtained in [1].…”

Section: Introductionmentioning

confidence: 99%

Continuum directed random polymers on disordered hierarchical diamond lattices

Clark

2020

Stochastic Processes and their Applications

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I discuss models for a continuum directed random polymer in a disordered environment in which the polymer lives on a fractal called the diamond hierarchical lattice, a self-similar metric space forming a network of interweaving pathways. This fractal depends on a branching parameter b ∈ N and a segmenting number s ∈ N. For s > b my focus is on random measures on the set of directed paths that can be formulated as a subcritical Gaussian multiplicative chaos. This path measure is analogous to the continuum directed random polymer introduced by Alberts, Khanin, Quastel [Journal of Statistical Physics 154, 305-326 (2014)].

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“…Although rectangular lattices are the most mathematically compelling graphical structures for studying directed polymers in disordered enviornments-due, in part, to their limiting connection with the stochastic heat equation-, it is also interesting to explore analogous models on graphical structures that have contrasting characteristics, such as exact hierarchical symmetry. The diamond hierarchical lattice is one such toy structure that researchers have chosen to grow their understanding of disordered polymers [10,19,2] and a variety of other statistical mechanical phenomena such as pinning models [14,20], resister networks [21,17,15], diffusion on fractals [18], and spin models [16]. Diamond hierarchical lattices are sequences D b,s n n∈N of recursively-defined finite graphs whose construction depends on a branching parameter b ∈ {2, 3, · · · } and a segmenting parameter s ∈ {2, 3, · · · } (see next section for details).…”

Section: Introductionmentioning

confidence: 99%

“…Thus, the respective cases s > b, s = b, and s < b are analogous to d < 2, d = 2, and d > 2 of the rectangular lattice, and this correspondence can be understood heuristically based on the expected number of sites shared by two randomly chosen directed paths; see the introduction of [19]. In [2] we studied an infinite-temperature distributional scaling limit analogous to [3] for the partition function of the diamond lattice polymer in the case when s > b and disorder variables are placed on either sites or bonds. The techniques of [2] do not extend to proving a limit theorem for the partition function in the s = b case, where it is relatively tricky to determine a plausible choice of infinite-temperature scaling β −1 ≡ β b n −1 ∞ as the generation, n, of the diamond graph D b,b n grows.…”

Section: Introductionmentioning

confidence: 99%

“…In [2] we studied an infinite-temperature distributional scaling limit analogous to [3] for the partition function of the diamond lattice polymer in the case when s > b and disorder variables are placed on either sites or bonds. The techniques of [2] do not extend to proving a limit theorem for the partition function in the s = b case, where it is relatively tricky to determine a plausible choice of infinite-temperature scaling β −1 ≡ β b n −1 ∞ as the generation, n, of the diamond graph D b,b n grows. In this article I propose an infinite-temperature scaling for the s = b diamond lattice polymer in the case of bond disorder.…”

Section: Introductionmentioning

confidence: 99%

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High-Temperature Scaling Limit for Directed Polymers on a Hierarchical Lattice with Bond Disorder

Clark

2019

J Stat Phys

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Diamond "lattices" are sequences of recursively-defined graphs that provide a network of directed pathways between two fixed root nodes, A and B. The construction recipe for diamond graphs depends on a branching number b ∈ N and a segmenting number s ∈ N, for which a larger value of the ratio s/b intuitively corresponds to more opportunities for intersections between two randomly chosen paths. By attaching i.i.d. random variables to the bonds of the graphs, I construct a random Gibbs measure on the set of directed paths by assigning each path an "energy" given by summing the random variables along the path. For the case b = s, I propose a scaling regime in which the temperature grows along with the number of hierarchical layers of the graphs, and the partition function (the normalization factor of the Gibbs measure) appears to converge in law. I prove that all of the positive integer moments of the partition function converge in this limiting regime. The motivation of this work is to prove a functional limit theorem that is analogous to a previous result obtained in the b < s case.

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The intermediate disorder regime for a directed polymer model on a hierarchical lattice

Cited by 12 publications

References 22 publications

On the Moments of the $$(2+1)$$-Dimensional Directed Polymer and Stochastic Heat Equation in the Critical Window

On the Moments of the $$(2+1)$$-Dimensional Directed Polymer and Stochastic Heat Equation in the Critical Window

Continuum directed random polymers on disordered hierarchical diamond lattices

High-Temperature Scaling Limit for Directed Polymers on a Hierarchical Lattice with Bond Disorder

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