Nonlinear Diffusion Equations

Wu, Zhong; Yin, Jingxue; Li, Huilai; Zhao, Junning

doi:10.1142/9789812799791

Cited by 194 publications

(171 citation statements)

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“…In this section, we present the definition of weak solution to the evolution problem (27)- (29), propose an approximating evolution equation, establish existence result for the solution of the approximate evolution equation, and, then, by logical mathematical manipulation and passing to the limits, present a proof of the existence and uniqueness of the solution of the evolution problem (27)- (29). We refer to the works in [25][26][27][28] as the motivation for our definition of the weak solution to the evolution problem (27)- (29).…”

Section: Weak Solution To the Flow Associated With The Minimization Pmentioning

confidence: 99%

An Alternative Variational Framework for Image Denoising

Elisha

Guo

2014

Abstract and Applied Analysis

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We propose an alternative framework for total variation based image denoising models. The model is based on the minimization of the total variation with a functional coefficient, where, in this case, the functional coefficient is a function of the magnitude of image gradient. We determine the considerations to bear on the choice of the functional coefficient. With the use of an example functional, we demonstrate the effectiveness of a model chosen based on the proposed consideration. In addition, for the illustrative model, we prove the existence and uniqueness of the minimizer of the variational problem. The existence and uniqueness of the solution associated evolution equation are also established. Experimental results are included to demonstrate the effectiveness of the selected model in image restoration over the traditional methods of Perona-Malik (PM), total variation (TV), and the D-α-PM method.

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Section: Weak Solution To the Flow Associated With The Minimization Pmentioning

confidence: 99%

An Alternative Variational Framework for Image Denoising

Elisha

Guo

2014

Abstract and Applied Analysis

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“…(1.1) becomes a linear parabolic equation, we would like to suggest that, for linear equations, any boundedness estimate is equivalent to a stability result (i.e., control of differences of solutions in terms of differences of data), but this is not the truth for nonlinear equations generally. One can see the well-known monographs or textbooks [1][2][3][4][5][6][7] and the references therein. However, in some special case, if we add some restrictions to k (u,x,t) , the character may be still true.…”

Section: Introductionmentioning

confidence: 99%

On a Nonlinear Heat Equation with Degeneracy on the Boundary

sci¹

2019

JPDE

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“…, x n ) ∈ R n and t ∈ R. When m > 1, this equation models slow diffusion phenomena so this condition is often assumed (cf. [17]). However, for reasons that will become evident below, we will allow m ∈ R\{0, 1}.…”

Section: Introductionmentioning

confidence: 99%