Differentiable measures and the Malliavin calculus

Богачев, В. И.

doi:10.1007/bf02355450

Cited by 57 publications

(27 citation statements)

References 390 publications

(348 reference statements)

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“…This proposition is a simple particular case of more general results presented in Chapter 10 of [Bog10]. However, for the reader's convenience, we give a complete proof of Proposition 5.6.…”

Section: Image Of Measures Under Finite-dimensional Transformationsmentioning

confidence: 74%

Control and mixing for 2D Navier-Stokes equations with space-time localised noise

Shirikyan¹

2015

Ann. Sci. École Norm. Sup.

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We consider randomly forced 2D Navier-Stokes equations in a bounded domain with smooth boundary. It is assumed that the random perturbation is non-degenerate, and its law is periodic in time and has a support localised with respect to space and time. Concerning the unperturbed problem, we assume that it is approximately controllable in infinite time by an external force whose support is included in that of the random force. Under these hypotheses, we prove that the Markov process generated by the restriction of solutions to the instants of time proportional to the period possesses a unique stationary distribution, which is exponentially mixing. The proof is based on a coupling argument, a local controllability property of the Navier-Stokes system, an estimate for the total variation distance between a measure and its image under a smooth mapping, and some classical results from the theory of optimal transport.

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Section: Image Of Measures Under Finite-dimensional Transformationsmentioning

confidence: 74%

Control and mixing for 2D Navier-Stokes equations with space-time localised noise

Shirikyan¹

2015

Ann. Sci. École Norm. Sup.

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“…Therefore, the measures µ (K,λ) and φ * µ (K,λ) are equivalent on Γ Λ (see e.g. p. 8 in Bogachev [3]). Consequently, by the usual relations between equivalent measures we have that the density of µ (K,λ) with respect to φ…”

Section: Proof Of (Ii) By Lemma 32 and Proposition 12 In [24mentioning

confidence: 99%

Quasi-invariance of fermion processes with J-Hermitian kernel

Torrisi¹

2014

COSA

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Abstract. Fermion (or determinantal) processes with J-Hermitian kernel constitute a large class of random point fields which is of interest in mathematical physics. They generalize the popular family of fermion processes with Hermitian kernel and their existence has been recently established in full generality by Lytvynov [24]. In this paper we prove a quasi-invariance property for fermion processes with J-Hermitian kernel. Our findings extend in various directions the corresponding result in Camilier and Decreusefond [10].

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“…This measure is regular in the sense of Definition 0.1 and non-degenerated in the sense that its support contains the whole space H p (see, e.g. Chapter 9 in [2]). Moreover, it is invariant for KdV [13].…”

Section: On Existence Of ǫ-Quasi-invariant Measuresmentioning

confidence: 99%

“…We recall that (0.10) is a welldefined probability measure on h p if and only if σ j < ∞(see [2]). It is regular in the sense of Definition 0.1 and is non-degenerated in the sense that its support equals to h p (see [2,3]). From (0.2), it is easy to see that this kind of measures are invariant for KdV.…”

Section: Introductionmentioning

confidence: 99%

On Longtime Dynamics of Perturbed KdV Equations

Huang

2014

J Dyn Control Syst

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Abstract. Consider a perturbed KdV equation:ut + uxxx − 6uux = ǫf (u(·)), x ∈ T = R/Z, T u(x, t)dx = 0, where the nonlinear perturbation defines analytic operators u(·) → f (u(·)) in sufficiently smooth Sobolev spaces. Assume that the equation has an ǫ-quasiinvariant measure µ and satisfies some additional mild assumptions. Let u ǫ (t) be a solution. Then on time intervals of order ǫ −1 , as ǫ → 0, its actions I(u ǫ (t, ·)) can be approximated by solutions of a certain well-posed averaged equation, provided that the initial datum is µ-typical. IntroductionThe KdV equation on the circle, perturbed by smoothing perturbations, was studied in [5]. There an averaging theorem that describes the long-time behavior for solutions of the perturbed KdV equation was proved. In this work, we suggest an abstract theorem which applies to a large class of ǫ-perturbed KdV equations which have ǫ-quasi-invariant measures; the latter notion is explained in the main text. We show that the systems considered in [5], satisfy this condition, and believe that it may be verified for many other perturbations of KdV. More exactly, we consider a perturbed KdV equation with zero mean-value periodic boundary condition:where ǫf is a nonlinear perturbation, specified below. For any p ∈ R we introduce the Sobolev space of real valued function on T with zero mean-value:Hereû k andû −k , k ∈ N are the Fourier coefficients of u with respect to the trigonometric base e k = √ 2 cos 2πkx, k > 0 and e k = √ 2 sin 2πkx, k < 0, i.e. u = k∈Nû k e k +û −k e −k . It is well known that KdV is integrable. It means that the function space H p admits analytic coordinates v = (v 1 , v 2 , . . . ) = Ψ(u(·)), where v j = (v j , v −j ) t ∈ R 2 , such that the quantities I j = 1 2 |v j | 2 and ϕ j = Arg v j , j 1, are action-angle variables for KdV. In the (I, ϕ)-varibles, KdV takes the integrable formİ = 0,φ = W (I), (0.2) 1

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Differentiable measures and the Malliavin calculus

Cited by 57 publications

References 390 publications

Control and mixing for 2D Navier-Stokes equations with space-time localised noise

Control and mixing for 2D Navier-Stokes equations with space-time localised noise

Quasi-invariance of fermion processes with J-Hermitian kernel

On Longtime Dynamics of Perturbed KdV Equations

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