Total roto-translational variation

Abstract: We consider curvature depending variational models for image regularization, such as Euler's elastica. These models are known to provide strong priors for the continuity of edges and hence have important applications in shape-and image processing. We consider a lifted convex representation of these models in the roto-translation space: In this space, curvature depending variational energies are represented by means of a convex functional defined on divergence free vector fields. The line energies are then easi… Show more

“…The OS is obtained by convolving the image with a set of rotated wavelets allowing for stable reconstruction [14,4,24]. 2nd row: Vessel-tracking in a 2D image via geodesic PDE-flows in OS that underly TVF: [4,18,8], with n = (cos θ, sin θ) T ∈ S 1 . 3rd row: CED-OS diffusion of a 3D image [24,17] visualized as a field of angular profiles.…”

“…For {a, b} = {1, 1} we have a geometric Mean Curvature Flow (MCF) PDE. For {a, b} = {0, 1} we have a Total Variation Flow (TVF) [8]. For {a, b} = {0, 0} we obtain a linear diffusion for which exact smooth solutions exist [27].…”

“…In the last decade, many PDE-based image analysis techniques for tracking and enhancement of curvilinear structures took advantage of lifting the image data to the homogeneous space M = R d S d−1 of d-dimensional positions and orientations, cf. [14,10,34,6,4,8]. The precise definition of this homogeneous space follows in the next subsection.…”

“…Also for geodesic tracking methods, it helps that crossing line structures are disentangled in the lifted data. Geodesic flows prior to steepest descent also rely on (related [32,5,8]) PDEs on M commuting with roto-translations. They can account for crossings/bifurcations/corners [4,18,8].…”

“…As for PDE-based image denoising and enhancement, total variation flows (TVF) are more popular than nonlinear diffusion flows. Recently, Chambolle & Pock generalized TVF from R 2 to M = R 2 × S 1 , via 'total roto-translation variation' (TV-RT) flows [8] of 2D images. They employ (a)symmetric Finslerian geodesic models on M cf.…”

Total Variation and Mean Curvature PDEs on the Space of Positions and Orientations

“…The OS is obtained by convolving the image with a set of rotated wavelets allowing for stable reconstruction [14,4,24]. 2nd row: Vessel-tracking in a 2D image via geodesic PDE-flows in OS that underly TVF: [4,18,8], with n = (cos θ, sin θ) T ∈ S 1 . 3rd row: CED-OS diffusion of a 3D image [24,17] visualized as a field of angular profiles.…”

“…For {a, b} = {1, 1} we have a geometric Mean Curvature Flow (MCF) PDE. For {a, b} = {0, 1} we have a Total Variation Flow (TVF) [8]. For {a, b} = {0, 0} we obtain a linear diffusion for which exact smooth solutions exist [27].…”

“…In the last decade, many PDE-based image analysis techniques for tracking and enhancement of curvilinear structures took advantage of lifting the image data to the homogeneous space M = R d S d−1 of d-dimensional positions and orientations, cf. [14,10,34,6,4,8]. The precise definition of this homogeneous space follows in the next subsection.…”

“…Also for geodesic tracking methods, it helps that crossing line structures are disentangled in the lifted data. Geodesic flows prior to steepest descent also rely on (related [32,5,8]) PDEs on M commuting with roto-translations. They can account for crossings/bifurcations/corners [4,18,8].…”

“…As for PDE-based image denoising and enhancement, total variation flows (TVF) are more popular than nonlinear diffusion flows. Recently, Chambolle & Pock generalized TVF from R 2 to M = R 2 × S 1 , via 'total roto-translation variation' (TV-RT) flows [8] of 2D images. They employ (a)symmetric Finslerian geodesic models on M cf.…”

Total Variation and Mean Curvature PDEs on the Space of Positions and Orientations

Convex Lifting-Type Methods for Curvature Regularization

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