Dirichlet energy of Delaunay meshes and intrinsic Delaunay triangulations
The Dirichlet energy of a smooth function measures how variable the function is. Due to its deep connection to the Laplace–Beltrami operator, Dirichlet energy plays an important role in digital geometry processing. Given a 2-manifold triangle mesh M with vertex set V, the generalized Rippa's th...
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sg-ntu-dr.10356-1522952021-08-04T02:17:11Z Dirichlet energy of Delaunay meshes and intrinsic Delaunay triangulations Ye, Zipeng Yi, Ran Gong, Wenyong He, Ying Liu, Yong-Jin School of Computer Science and Engineering Engineering::Computer science and engineering Dirichlet Energy Delaunay Meshes The Dirichlet energy of a smooth function measures how variable the function is. Due to its deep connection to the Laplace–Beltrami operator, Dirichlet energy plays an important role in digital geometry processing. Given a 2-manifold triangle mesh M with vertex set V, the generalized Rippa's theorem shows that the Dirichlet energy among all possible triangulations of V arrives at its minimum on the intrinsic Delaunay triangulation (IDT) of V. Recently, Delaunay meshes (DM) – a special type of triangle mesh whose IDT is the mesh itself – were proposed, which can be constructed by splitting mesh edges and refining the triangulation to ensure the Delaunay condition. This paper focuses on Dirichlet energy for functions defined on DMs. Given an arbitrary function f defined on the original mesh vertices V, we present a scheme to assign function values to the DM vertices Vₙₑw⊃V by interpolating f. We prove that the Dirichlet energy on DM is no more than that on the IDT. Furthermore, among all possible functions defined on Vₙₑw by interpolating f, our scheme attains the global minimum of Dirichlet energy on a given DM. This work was supported by the Natural Science Foundation (NSF) of China (61725204, 61802147), the Natural Science Foun- dation of Guangdong Province, China (2018A030310634) and Fundamental Research Funds for the Central Universities, China (21617348). 2021-08-04T02:17:11Z 2021-08-04T02:17:11Z 2020 Journal Article Ye, Z., Yi, R., Gong, W., He, Y. & Liu, Y. (2020). Dirichlet energy of Delaunay meshes and intrinsic Delaunay triangulations. Computer-Aided Design, 126, 102851-. https://dx.doi.org/10.1016/j.cad.2020.102851 0010-4485 https://hdl.handle.net/10356/152295 10.1016/j.cad.2020.102851 2-s2.0-85084583080 126 102851 en Computer-Aided Design © 2020 Elsevier Ltd. All rights reserved. |
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Engineering::Computer science and engineering Dirichlet Energy Delaunay Meshes Ye, Zipeng Yi, Ran Gong, Wenyong He, Ying Liu, Yong-Jin Dirichlet energy of Delaunay meshes and intrinsic Delaunay triangulations |
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The Dirichlet energy of a smooth function measures how variable the function is. Due to its deep connection to the Laplace–Beltrami operator, Dirichlet energy plays an important role in digital geometry processing. Given a 2-manifold triangle mesh M with vertex set V, the generalized Rippa's theorem shows that the Dirichlet energy among all possible triangulations of V arrives at its minimum on the intrinsic Delaunay triangulation (IDT) of V. Recently, Delaunay meshes (DM) – a special type of triangle mesh whose IDT is the mesh itself – were proposed, which can be constructed by splitting mesh edges and refining the triangulation to ensure the Delaunay condition. This paper focuses on Dirichlet energy for functions defined on DMs. Given an arbitrary function f defined on the original mesh vertices V, we present a scheme to assign function values to the DM vertices Vₙₑw⊃V by interpolating f. We prove that the Dirichlet energy on DM is no more than that on the IDT. Furthermore, among all possible functions defined on Vₙₑw by interpolating f, our scheme attains the global minimum of Dirichlet energy on a given DM. |
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School of Computer Science and Engineering |
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School of Computer Science and Engineering Ye, Zipeng Yi, Ran Gong, Wenyong He, Ying Liu, Yong-Jin |
| format |
Article |
| author |
Ye, Zipeng Yi, Ran Gong, Wenyong He, Ying Liu, Yong-Jin |
| author_sort |
Ye, Zipeng |
| title |
Dirichlet energy of Delaunay meshes and intrinsic Delaunay triangulations |
| title_short |
Dirichlet energy of Delaunay meshes and intrinsic Delaunay triangulations |
| title_full |
Dirichlet energy of Delaunay meshes and intrinsic Delaunay triangulations |
| title_fullStr |
Dirichlet energy of Delaunay meshes and intrinsic Delaunay triangulations |
| title_full_unstemmed |
Dirichlet energy of Delaunay meshes and intrinsic Delaunay triangulations |
| title_sort |
dirichlet energy of delaunay meshes and intrinsic delaunay triangulations |
| publishDate |
2021 |
| url |
https://hdl.handle.net/10356/152295 |
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1707774595709272064 |