Fluctuations Around a Homogenised Semilinear Random PDE

Hairer, Martin; Pardoux, Étienne

doi:10.1007/s00205-020-01574-8

Cited by 22 publications

(10 citation statements)

References 19 publications

(162 reference statements)

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“…is lays the foundation for improving the clinical diagnosis rate of the disease, reducing the misdiagnosis rate and missed diagnosis rate, and improving the therapeutic effect. [18,19].…”

Section: Discussionmentioning

confidence: 99%

Diagnosis of Bronchial and Pulmonary Fungal Infection Using Gradient Weighted Denoising Algorithm-Based CT Images

Li-hua

Zhang

2022

Scientific Programming

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Based on computed tomography (CT) with a gradient weighted denoising algorithm, the image denoising technique was applied to diagnose bronchial and pulmonary fungal infection to discuss the features of CT images and the efficiency of the denoising algorithm. Therefore, it could assist clinicians in disease treatment. The clinical data and imaging data of 100 patients with invasive pulmonary fungal infection were collected in the hospital. All of them were rolled into a natural denoising CT group (routine group) and gradient weighted denoising algorithm-based image denoising group (algorithm group). The images from the routine group were processed by the routine natural denoising method, and the images from the algorithm group were denoised with the gradient weighted denoising algorithm. The results showed that the algorithm group had greater denoising efficiency and less denoising time compared with the routine group ( P < 0.05 ). The diagnostic sensitivity, specificity, and accuracy of the denoised images from the algorithm group were higher markedly than the above three indicators of the routine group ( P < 0.05 ). For bronchopulmonary infections, the sensitivity, specificity, and accuracy of the PDE model for CT denoised images were 99.00%, 96.87%, and 98.33%, the positive rate of chest CT examination was 86.2%, which was higher markedly than the rate of ordinary CT examination (70.5%), and the difference was statistically substantial ( P < 0.05 ). Besides, the mean absolute error (MAE), peak signal to noise ratio (PSNR), and mean structural similarity index measure (MSSIM) of the algorithm group were better than those of the unprocessed images and the routine group ( P < 0.05 ). Moreover, the algorithm group had a good visual effect. In conclusion, the gradient weighted denoising algorithm could effectively remove the noise and bar artifacts in CT images and well retain the edge details of CT images, thereby improving the quality of CT images. Therefore, it was suitable for clinical diagnosis and had practical application value.

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“…is lays the foundation for improving the clinical diagnosis rate of the disease, reducing the misdiagnosis rate and missed diagnosis rate, and improving the therapeutic effect. [18,19].…”

Section: Discussionmentioning

confidence: 99%

Diagnosis of Bronchial and Pulmonary Fungal Infection Using Gradient Weighted Denoising Algorithm-Based CT Images

Li-hua

Zhang

2022

Scientific Programming

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“…(An operator I k represents the convolution with a kernel x (∂ k K)(x). These operators also appeared in the very recent work [15] of Hairer and Pardoux.) If τ is homogeneous, then I t k (τ ) is also homogeneous and…”

Section: It Satisfies Assumptions (mentioning

confidence: 73%

Paracontrolled calculus and regularity structures II

Bailleul¹,

Hoshino²

2021

Journal De L’École Polytechnique — Mathématiques

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“…Such result is known to be closely related to the homogenization behavior of singularly perturbed partial differential equations, which is of its own interest, see e.g. [27,28]. For the study of the functional central limit theorem for finite dimensional multi-scale systems, we refer the reader to the fundamental paper by Khasminskii [30], see also [1,16,29,33,35,36,38].…”

Section: Introductionmentioning

confidence: 97%

Averaging principle and normal deviations for multi-scale stochastic hyperbolic-parabolic equations

Röckner¹,

Xie²,

Yang³

2020

Preprint

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We study the asymptotic behavior of stochastic hyperbolic parabolic equations with slow and fast time scales. Both the strong and weak convergence in the averaging principe are established, which can be viewed as a functional law of large numbers. Then we study the stochastic fluctuations of the original system around its averaged equation. We show that the normalized difference converges weakly to the solution of a linear stochastic wave equation, which is a form of functional central limit theorem. We provide a unified proof for the above convergence by using the Poisson equation in Hilbert spaces. Moreover, sharp rates of convergence are obtained, which are shown not to depend on the regularity of the coefficients in the equation for the fast variable.

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Fluctuations Around a Homogenised Semilinear Random PDE

Cited by 22 publications

References 19 publications

Diagnosis of Bronchial and Pulmonary Fungal Infection Using Gradient Weighted Denoising Algorithm-Based CT Images

Diagnosis of Bronchial and Pulmonary Fungal Infection Using Gradient Weighted Denoising Algorithm-Based CT Images

Paracontrolled calculus and regularity structures II

Averaging principle and normal deviations for multi-scale stochastic hyperbolic-parabolic equations

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