Triangular mesh parameterization with trimmed surfaces

Ruiz-Salguero, Oscar; Mejía, Daniel; Cadavid, Carlos A.

doi:10.1007/s12008-015-0276-1

Cited by 5 publications

(9 citation statements)

References 28 publications

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“…However, such a parameterization is improved by applying the Poisson reconstruction, reducing the distortion close to mesh holes and boundary concavities (Figure 11b). A more extreme case is illustrated in Figure 12, with the S-trimmed-on-cone data set from [14]. Since the S shape is trimmed on a cone, M is a fully developable surface.…”

Section: Resultsmentioning

confidence: 99%

“…As a consequence, these algorithms have been applied successfully in mesh parameterization applications. Such algorithms include Laplacian Eigenmaps [14] and Hessian Locally Linear Embedding [15].…”

Section: Angle-preserving Mesh Parameterizationmentioning

confidence: 99%

“…Ruiz et al [14] used a dimensionality-reduction geodesic-based algorithm (Isomap) for the computation of isometric parameterization of quasi-developable meshes. However, in addition to the classic nonconvex parameterization problems, such algorithms estimate geodesics using shortest-path graph algorithms which introduce additional distortions in the resulting parameterization.…”

Section: Distance-preserving Mesh Parameterizationmentioning

confidence: 99%

“…Figure 14 plots the parameterization results for the segmented mesh. Each submesh bijective parameterization presents low distortion, enabling further reverse engineering operations such as NURBs reparameterization [14], finite element analysis, structural optimization, and/or dimensional inspection [31].…”

Section: Reverse Engineering Of Cow Vertebramentioning

confidence: 99%

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Quasi-Isometric Mesh Parameterization Using Heat-Based Geodesics and Poisson Surface Fills

et al. 2019

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In the context of CAD, CAM, CAE, and reverse engineering, the problem of mesh parameterization is a central process. Mesh parameterization implies the computation of a bijective map ϕ from the original mesh M ∈ R 3 to the planar domain ϕ ( M ) ∈ R 2 . The mapping may preserve angles, areas, or distances. Distance-preserving parameterizations (i.e., isometries) are obviously attractive. However, geodesic-based isometries present limitations when the mesh has concave or disconnected boundary (i.e., holes). Recent advances in computing geodesic maps using the heat equation in 2-manifolds motivate us to revisit mesh parameterization with geodesic maps. We devise a Poisson surface underlying, extending, and filling the holes of the mesh M. We compute a near-isometric mapping for quasi-developable meshes by using geodesic maps based on heat propagation. Our method: (1) Precomputes a set of temperature maps (heat kernels) on the mesh; (2) estimates the geodesic distances along the piecewise linear surface by using the temperature maps; and (3) uses multidimensional scaling (MDS) to acquire the 2D coordinates that minimize the difference between geodesic distances on M and Euclidean distances on R 2 . This novel heat-geodesic parameterization is successfully tested with several concave and/or punctured surfaces, obtaining bijective low-distortion parameterizations. Failures are registered in nonsegmented, highly nondevelopable meshes (such as seam meshes). These cases are the goal of future endeavors.

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Section: Resultsmentioning

confidence: 99%

Section: Angle-preserving Mesh Parameterizationmentioning

confidence: 99%

Section: Distance-preserving Mesh Parameterizationmentioning

confidence: 99%

Section: Reverse Engineering Of Cow Vertebramentioning

confidence: 99%

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Quasi-Isometric Mesh Parameterization Using Heat-Based Geodesics and Poisson Surface Fills

et al. 2019

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“…Failures of IsoMap are not due to the coarse graph approximation of geodesic curves. Instead,holes or to the non-developable character of the mesh hinder IsoMap performance [15].…”

Section: Introductionmentioning

confidence: 99%

Untitled

2019

IJET

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Database manager systems (DBMS) have been traditionally used for handling economic and alphanumeric information, related to business, government, education, health, urbanism, etc. Making 3D geometry and topology and their related algorithms the raw material and subject of DBMS is rare. Attempts have been made in the specific field of Geographic Information Systems (GIS). However, for historical and economical reasons 3D geometry and topology was appended on top of 2D entities. The mechanism found is usually the addition of 3D information in the form of attributes for, for example, vertical extrusions of 2D entities. The related algorithms usually handle the interrogations and constructs of GIS, even though some GIS systems contain3D geometry and Topology, in the sense of Geometric Modelling. This manuscript presents the usage of DBMS graph capabilities for approximation of hard core computational geometry algorithms. This rarely used approach has the advantage of avoiding degenerate situations, at the price of lower precision. Taping into the vast graph capabilities of DBMSs has the obvious advantage of large algorithm libraries, which in this case we apply to computational geometry. The lower geometric precision of graph-based DBMS algorithms do not hamper their application, in problems of dimensional reduction, mesh parameterization and segmentation, etc. This manuscript is also attractive in that it illustrates the articulation of freeware display systems (e.g. JavaView TM) with DBMS for computational geometry applications.

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Parameterizing and extending trimmed regions for tensor-product surface fitting

Vaitkus

Várady

2018

Computer-Aided Design

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Triangular mesh parameterization with trimmed surfaces

Cited by 5 publications

References 28 publications

Quasi-Isometric Mesh Parameterization Using Heat-Based Geodesics and Poisson Surface Fills

Quasi-Isometric Mesh Parameterization Using Heat-Based Geodesics and Poisson Surface Fills

Untitled

Parameterizing and extending trimmed regions for tensor-product surface fitting

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