Tail estimates for homogenization theorems in random media

Boivin, Daniel

doi:10.1051/ps:2007036

Cited by 9 publications

(8 citation statements)

References 35 publications

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“…Other noteworthy earlier derivations of (suboptimal) variance upper bounds include an old paper by Yurinskii [24] and a more recent paper by Benjamini and Rossignol [2]. Closely related to these estimates are recent derivations of quantitative central limit theorems for random walk among random conductances and approximations of the limiting diffusivity matrix, e.g., Caputo and Ioffe [7], Bourgeat and Piatnitski [5], Boivin [4], Mourrat [18], Gloria and Mourrat [9,10], etc. Incidentally, the Meyers estimate is also the key tool in [7].…”

Section: Introduction and Main Resultsmentioning

confidence: 99%

“…Unfortunately, a direct attempt at the substitution of (the gradients of) Ψ Λ by ψ in (2.13) reveals another technical obstacle: As (2.13) relies on the Fundamental Theorem of Calculus, the replacement of Ψ Λ by ψ requires the latter function to be defined for ω that may lie outside of the support of P. This is a problem because ψ is generally determined by conditions (1)(2)(3)(4) in Proposition 2.2 only on a set of full P-measure. Imposing additional assumptions on P -namely, that the single-conductance distribution is supported on an interval with a bounded and non-vanishing density -would allow us to replace the Lebesgue integral in (2.13) by an integral with respect to P(dω k ) and thus eliminate this problem.…”

Section: Perturbed Corrector and Variance Formulamentioning

confidence: 99%

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A Central Limit Theorem for the Effective Conductance: Linear Boundary Data and Small Ellipticity Contrasts

Biskup

Salvi

Wolff

2014

Commun. Math. Phys.

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Given a resistor network on Z d with nearest-neighbor conductances, the effective conductance in a finite set with a given boundary condition is the the minimum of the Dirichlet energy over functions with the prescribed boundary values. For shift-ergodic conductances, linear (Dirichlet) boundary conditions and square boxes, the effective conductance scaled by the volume of the box converges to a deterministic limit as the box-size tends to infinity. Here we prove that, for i.i.d. conductances with a small ellipticity contrast, also a (non-degenerate) central limit theorem holds. The proof is based on the corrector method and the Martingale Central Limit Theorem; a key integrability condition is furnished by the Meyers estimate. More general domains, boundary conditions and ellipticity contrasts will be addressed in a subsequent paper.

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Section: Introduction and Main Resultsmentioning

confidence: 99%

Section: Perturbed Corrector and Variance Formulamentioning

confidence: 99%

A Central Limit Theorem for the Effective Conductance: Linear Boundary Data and Small Ellipticity Contrasts

Biskup

Salvi

Wolff

2014

Commun. Math. Phys.

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“…In [5], the definition of A n is different, based on the discrete cube and not on the torus, however the behaviour should be the same. [5] obtains only suboptimal bounds for the variance of the mean conductivity.…”

Section: 32mentioning

confidence: 99%

“…The reciprocity law (5) gives that i e r (e ′ ) and i e ′ r (e) are of the same order: but e ′ r(e ′ )(i e r (e ′ )) 2 is the effective resistance from e − to e + , which is of order at most 1 [in fact at most r(e)]. Thus,…”

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confidence: 99%

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Noise-stability and central limit theorems for effective resistance of random electric networks

Rossignol¹

2016

Ann. Probab.

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We investigate the (generalized) Walsh decomposition of pointto-point effective resistances on countable random electric networks with i.i.d. resistances. We show that it is concentrated on low levels, and thus point-to-point effective resistances are uniformly stable to noise. For graphs that satisfy some homogeneity property, we show in addition that it is concentrated on sets of small diameter. As a consequence, we compute the right order of the variance and prove a central limit theorem for the effective resistance through the discrete torus of side length n in Z d , when n goes to infinity.Proof. Let us first suppose that G is finite. Then it is well known that i u,v r (e) and R u,v (r) are rational functions of r with no positive pole.

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Normal approximation for a random elliptic equation

Nolen

2013

Probab. Theory Relat. Fields

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We consider solutions of an elliptic partial differential equation in R d with a stationary, random conductivity coefficient that is also periodic with period L. Boundary conditions on a square domain of width L are arranged so that the solution has a macroscopic unit gradient. We then consider the average flux that results from this imposed boundary condition. It is known that in the limit L → ∞, this quantity converges to a deterministic constant, almost surely. Our main result is that the law of this random variable is very close to that of a normal random variable, if the domain size L is large. We quantify this approximation by an error estimate in total variation. The error estimate relies on a second order Poincaré inequality developed recently by Chatterjee.

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Tail estimates for homogenization theorems in random media

Cited by 9 publications

References 35 publications

A Central Limit Theorem for the Effective Conductance: Linear Boundary Data and Small Ellipticity Contrasts

A Central Limit Theorem for the Effective Conductance: Linear Boundary Data and Small Ellipticity Contrasts

Noise-stability and central limit theorems for effective resistance of random electric networks

Normal approximation for a random elliptic equation

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