Particle approximation of the Wasserstein diffusion

Andrés, Sebastián; Renesse, Max-K. von

doi:10.1016/j.jfa.2009.10.029

Cited by 34 publications

(74 citation statements)

References 25 publications

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“…This choice is simple from a theoretical point of view and is consistent with [13], but the model is difficult from a numerical perspective because of the large values of ∂E/∂x i that appear when particles approach one another. In the absence of any interparticle forces (E = 0), the x Figure 1.…”

Section: Dynamical Evolutionmentioning

confidence: 95%

“…As well as offering a new twist on condensation, this work is also motivated by connections between this model system and a recent mathematical study [13] where it was found that the dynamics of the particle density in a similar model should be described by a stochastic partial differential equation (PDE) with a stochastic term that does not vanish in the hydrodynamic limit. Usually, one expects to recover (almost surely) deterministic behaviour in the hydrodynamic limit: for example, the deterministic diffusion equation describes the spreading of a large number of random walkers.…”

Section: Introductionmentioning

confidence: 99%

“…Usually, one expects to recover (almost surely) deterministic behaviour in the hydrodynamic limit: for example, the deterministic diffusion equation describes the spreading of a large number of random walkers. Moreoever, the stochastic PDE found in [13] is closely related to the Dean equation [14], which describes (in this case) the diffusive motion of a finite number of non-interacting particles. This result offers the possibility that the clusters that form in our model might themselves act as free particles that diffuse through the system.…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Emergence of particle clusters in a one-dimensional model: connection to condensation processes

Burman¹,

Carpenter²,

Jack³

2017

J. Phys. A: Math. Theor.

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Abstract. We discuss a simple model of particles hopping in one dimension with attractive interactions. Taking a hydrodynamic limit in which the interaction strength increases with the system size, we observe the formation of multiple clusters of particles, with large gaps between them. These clusters are correlated in space, and the system has a self-similar (fractal) structure. These results are related to condensation phenomena in mass transport models and to a recent mathematical analysis of the hydrodynamic limit in a related model.

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Section: Dynamical Evolutionmentioning

confidence: 95%

Section: Introductionmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Emergence of particle clusters in a one-dimensional model: connection to condensation processes

Burman¹,

Carpenter²,

Jack³

2017

J. Phys. A: Math. Theor.

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show abstract

“…Note that the function α → C α is bounded on any closed interval not including 1 2 or 3 2 , but it diverges at these two values. Similarly, the functionC α diverges as it approaches 1 2 from below.…”

Section: Stochastic Convolutionmentioning

confidence: 99%

“…However, starting with the seminal works of Mosco [25,26], a number of authors have investigated sufficient conditions for the resolvent convergence of Dirichlet forms, see for example [2,3,21,24,28]. While our setting does not formally seem to be covered by these works, it 'morally' falls into the same category.…”

Section: A Motivation From Path Samplingmentioning

confidence: 99%

Singular perturbations to semilinear stochastic heat equations

Hairer

2010

Probab. Theory Relat. Fields

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We consider a class of singular perturbations to the stochastic heat equation or semilinear variations thereof. The interesting feature of these perturbations is that, as the small parameter ε tends to zero, their solutions converge to the 'wrong' limit, i.e. they do not converge to the solution obtained by simply setting ε = 0. A similar effect is also observed for some (formally) small stochastic perturbations of a deterministic semilinear parabolic PDE. Our proofs are based on a detailed analysis of the spatially rough component of the equations, combined with a judicious use of Gaussian concentration inequalities.

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Modified Massive Arratia Flow and Wasserstein Diffusion

Konarovskyi

Renesse

2018

Comm Pure Appl Math

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Extending previous work by the first author we present a variant of the Arratia flow, which consists of a collection of coalescing Brownian motions starting from every point of the unit interval. The important new feature of the model is that individual particles carry mass that aggregates upon coalescence and that scales the diffusivity of each particle in an inverse proportional way. In this work we relate the induced measure‐valued process to the Wasserstein diffusion of von Renesse and Sturm. First, we present the process as a martingale solution to an SPDE similar to that of von Renesse and Sturm. Second, as our main result we show a Varadhan formula 42 for short times that is governed by the quadratic Wasserstein distance. © 2018 Wiley Periodicals, Inc.

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Particle approximation of the Wasserstein diffusion

Cited by 34 publications

References 25 publications

Emergence of particle clusters in a one-dimensional model: connection to condensation processes

Emergence of particle clusters in a one-dimensional model: connection to condensation processes

Singular perturbations to semilinear stochastic heat equations

Modified Massive Arratia Flow and Wasserstein Diffusion

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