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

Author

Listed:
  • Daniel Mejia-Parra

    (Laboratory of CAD CAM CAE, Universidad EAFIT, Cra 49 no 7-sur-50, 050022 Medellín, Colombia
    Vicomtech, Paseo Mikeletegi 57, Parque Científico y Tecnológico de Gipuzcoa, 20009 Donostia/San Sebastián, Spain)

  • Jairo R. Sánchez

    (Vicomtech, Paseo Mikeletegi 57, Parque Científico y Tecnológico de Gipuzcoa, 20009 Donostia/San Sebastián, Spain)

  • Jorge Posada

    (Vicomtech, Paseo Mikeletegi 57, Parque Científico y Tecnológico de Gipuzcoa, 20009 Donostia/San Sebastián, Spain)

  • Oscar Ruiz-Salguero

    (Laboratory of CAD CAM CAE, Universidad EAFIT, Cra 49 no 7-sur-50, 050022 Medellín, Colombia)

  • Carlos Cadavid

    (Matemáticas y Aplicaciones, Departamento de Ciencias Matemáticas, Universidad EAFIT, Cra 49 no 7-sur-50, 050022 Medellín, Colombia)

Abstract

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.

Suggested Citation

  • Daniel Mejia-Parra & Jairo R. Sánchez & Jorge Posada & Oscar Ruiz-Salguero & Carlos Cadavid, 2019. "Quasi-Isometric Mesh Parameterization Using Heat-Based Geodesics and Poisson Surface Fills," Mathematics, MDPI, vol. 7(8), pages 1-17, August.
  • Handle: RePEc:gam:jmathe:v:7:y:2019:i:8:p:753-:d:258515
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    Cited by:

    1. Shuangmin Chen & Nailei Hei & Shun Hu & Zijia Yue & Ying He, 2024. "Convex Quadratic Programming for Computing Geodesic Distances on Triangle Meshes," Mathematics, MDPI, vol. 12(7), pages 1-19, March.

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