John B. Greer scite author profile

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Low‐curvature image simplifiers: Global regularity of smooth solutions and Laplacian limiting schemes

Bertozzi

Greer

2004

Comm Pure Appl Math

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We consider a class of fourth-order nonlinear diffusion equations motivated by Tumblin and Turk's "low-curvature image simplifiers" for image denoising and segmentation. The PDE for the image intensity u is of the formis a "curvature" threshold and λ denotes a fidelitymatching parameter. We derive a priori bounds for u that allow us to prove global regularity of smooth solutions in one space dimension, and a geometric constraint for finite-time singularities from smooth initial data in two space dimensions. This is in sharp contrast to the second-order Perona-Malik equation (an ill-posed problem), on which the original LCIS method is modeled. The estimates also allow us to design a finite difference scheme that satisfies discrete versions of the estimates, in particular, a priori bounds on the smoothness estimator in both one and two space dimensions. We present computational results that show the effectiveness of such algorithms. Our results are connected to recent results for fourth-order lubrication-type equations and the design of positivitypreserving schemes for such equations. This connection also has relevance for other related fourth-order imaging equations.

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Traveling Wave Solutions of Fourth Order PDEs for Image Processing

Greer

Bertozzi²

2004

SIAM J. Math. Anal.

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John B. Greer

An Improvement of a Recent Eulerian Method for Solving PDEs on General Geometries

Learning Discriminative Sparse Representations for Modeling, Source Separation, and Mapping of Hyperspectral Imagery

Low‐curvature image simplifiers: Global regularity of smooth solutions and Laplacian limiting schemes

Traveling Wave Solutions of Fourth Order PDEs for Image Processing

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