Noiseless regularisation by noise

Galeati, Lucio; Gubinelli, Massimiliano

doi:10.4171/rmi/1280

Cited by 36 publications

(121 citation statements)

References 52 publications

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“…Of course it is to be expected that the present composition results can be generalized further using a refined Fourieranalytic approach. Important recent results close to the present article can be found in [19,27,28,35,36]. In [28] the authors provide a comprehensive study of ρ-irregularity from the point of view of prevalence.…”

Section: Introductionsupporting

confidence: 58%

“…In [28] the authors provide a comprehensive study of ρ-irregularity from the point of view of prevalence. The notion of ρ-irregularity had been introduced in [19], it quantifies the regularity of occupation measures in a rather complete way and has natural consequences for the mapping properties of averaging operators, [19,27,36], which are integrals of compositions involving shifted paths. In the present article we do not aim at integrals of compositions but at compositions themselves, clearly a different question.…”

Section: Introductionmentioning

confidence: 99%

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Sobolev regularity of occupation measures and paths, variability and compositions

Hinz,

Tölle,

Viitasaari

2021

Preprint

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We prove a result on the fractional Sobolev regularity of composition of paths of low fractional Sobolev regularity with functions of bounded variation. The result relies on the notion of variability, proposed in [40]. Here we work under relaxed hypotheses, formulated in terms of Sobolev norms, and we can allow discontinuous paths, which is new. The result applies to typical realizations of certain Gaussian or Lévy processes, and we use it to show the existence of Stieltjes type integrals involving compositions.

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Section: Introductionsupporting

confidence: 58%

Section: Introductionmentioning

confidence: 99%

Sobolev regularity of occupation measures and paths, variability and compositions

Hinz,

Tölle,

Viitasaari

2021

Preprint

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“…Proof. The case of w sampled as an fBm follows from the results from [16], see for instance Remark 7 or Section 3.3 more in general; indeed for b as above, almost every realisation of w satisfies…”

mentioning

confidence: 90%

“…Our approach to the problem follows the ideas introduced in [8], where analytic conditions on w which imply well-posedness for (1.1) with b 2 ≡ 0 and possibly distributional drift b 1 are identified. In recent years, this analytic approach to regularization by noise phenomena has been considerably expanded, see [16,22,21].…”

mentioning

confidence: 99%

“…In contrast, in order to define the integral appearing in (1.5) as a Young integral, we need at least to require w to be δ-Hölder continuous with H + δ > 1; without this assumption, it is unclear how to interpret neither (1.2) nor (1.5), even when b is a smooth function. At the same time, it is now clear from [8,16,22] that a strong regularisation effect is expected to hold for especially rough w, i.e. for very small values of δ, thus making the requirement H + δ > 1 too restrictive.…”

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confidence: 99%

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Regularization of multiplicative SDEs through additive noise

Galeati¹,

Harang²

2020

Preprint

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We investigate the regularizing effect of certain additive continuous perturbations on SDEs with multiplicative fractional Brownian motion (fBm). Traditionally, a Lipschitz requirement on the drift and diffusion coefficients is imposed to ensure existence and uniqueness of the SDE. We show that suitable perturbations restore existence, uniqueness and regularity of the flow for the resulting equation, even when both the drift and the diffusion coefficients are distributional, thus extending the program of regularization by noise to the case of multiplicative SDEs. Our method relies on a combination of the non-linear Young formalism developed by Catellier and Gubinelli [8], and stochastic averaging estimates recently obtained by Hairer and Li [20].

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Well‐posedness of stochastic heat equation with distributional drift and skew stochastic heat equation

Athreya,

Butkovsky,

Lê

et al. 2023

Comm Pure Appl Math

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We study stochastic reaction–diffusion equation where b is a generalized function in the Besov space , and is a space‐time white noise on . We introduce a notion of a solution to this equation and obtain existence and uniqueness of a strong solution whenever , and . This class includes equations with b being measures, in particular, which corresponds to the skewed stochastic heat equation. For , we obtain existence of a weak solution. Our results extend the work of Bass and Chen (2001) to the framework of stochastic partial differential equations and generalize the results of Gyöngy and Pardoux (1993) to distributional drifts. To establish these results, we exploit the regularization effect of the white noise through a new strategy based on the stochastic sewing lemma introduced in Lê (2020).

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Noiseless regularisation by noise

Cited by 36 publications

References 52 publications

Sobolev regularity of occupation measures and paths, variability and compositions

Sobolev regularity of occupation measures and paths, variability and compositions

Regularization of multiplicative SDEs through additive noise

Well‐posedness of stochastic heat equation with distributional drift and skew stochastic heat equation

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