Superdiffusivity of Two Dimensional Lattice Gas Models

Landim, Cláudio; Ramı́rez, José A.; Yau, Horng‐Tzer

doi:10.1007/s10955-005-4297-1

Cited by 10 publications

(11 citation statements)

References 16 publications

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“…Given the explicit expressions (11), (12) and (13) for J 1 (v) and J 2 (v), in order to prove the superdiffusive lower bound in (5) we need to prove efficient upper bounds on J 3 (v).…”

Section: Isotropic Srbp and Dcgf Modelsmentioning

confidence: 99%

See 1 more Smart Citation

Superdiffusive Bounds on Self-repellent Brownian Polymers and Diffusion in the Curl of the Gaussian Free Field in d=2

Tóth

Valkó

2012

J Stat Phys

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We consider two models of random diffusion in random environment in two dimensions. The first example is the self-repelling Brownian polymer, this describes a diffusion pushed by the negative gradient of its own occupation time measure (local time). The second example is a diffusion in a fixed random environment given by the curl of massless Gaussian free field.In both cases we show that the process is superdiffusive: the variance grows faster than linearly with time. We give lower and upper bounds of the order of t log log t, respectively, t log t. We also present computations for an anisotropic version of the self-repelling Brownian polymer where we give lower and upper bounds of t (log t) 1/2 , respectively, t log t. The bounds are given in the sense of Laplace transforms, the proofs rely on the resolvent method.The true order of the variance for these processes is expected to be t (log t) 1/2 for the isotropic and t (log t) 2/3 for the non-isotropic case. In the appendix we present a non-rigorous derivation of these scaling exponents.

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“…Given the explicit expressions (11), (12) and (13) for J 1 (v) and J 2 (v), in order to prove the superdiffusive lower bound in (5) we need to prove efficient upper bounds on J 3 (v).…”

Section: Isotropic Srbp and Dcgf Modelsmentioning

confidence: 99%

“…(See [12] for another example.) In the Appendix we present a non-rigorous, nevertheless very instructive scaling argument which explains this conjecture.…”

mentioning

confidence: 99%

Superdiffusive Bounds on Self-repellent Brownian Polymers and Diffusion in the Curl of the Gaussian Free Field in d=2

Tóth

Valkó

2012

J Stat Phys

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“…Remark 2. The d = 1, j (ρ) = 0, j (ρ) = 0 case bears many similarities in scaling of the diffusivity to the d = 2 lattice gas models for Navier-Stokes studied in [20] and certain random diffusions in random environment in d = 2 [33]. This is not completely coincidental as there are some structural similarities between models in d = 1 at inflection points and models in d = 2 without preferred direction which make the both superdiffusivity and the estimates based on degree 3 test functions coincide in the two cases.…”

Section: Model and Main Resultsmentioning

confidence: 92%

“…Note that the full predictions for the superdiffusivities can be obtained formally from the variational method if one assumes certain scaling properties of the optimal test function, and (more severely) that all off diagonal terms in the computations vanish. The formal computations are described in [20,27,33]. Since they are fairly analogous in our case, we do not repeat them here.…”

Section: Model and Main Resultsmentioning

confidence: 99%

Diffusivity of Lattice Gases

Quastel

Valkó

2013

Arch Rational Mech Anal

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Abstract. We consider one component lattice gases with a local dynamics and a stationary product Bernoulli measure. We give upper and lower bounds on the diffusivity at an equilibrium point depending on the dimension and the local behavior of the macroscopic flux function. We show that if the model is expected to be diffusive, it is indeed diffusive, and, if it is expected to be superdiffusive, it is indeed superdiffusive.

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“…The proof of Theorem 1 follows the main lines of [5]. See also [4]. However on the computational level there are notable differences.…”

Section: Theoremmentioning

confidence: 95%