research-article

Discrete Connection and Covariant Derivative for Vector Field Analysis and Design

Authors:

Fernando De Goes,

Mathieu DesbrunAuthors Info & Claims

ACM Transactions on Graphics (TOG), Volume 35, Issue 3

Article No.: 23, Pages 1 - 17

https://doi.org/10.1145/2870629

Published: 15 March 2016 Publication History

Abstract

In this article, we introduce a discrete definition of connection on simplicial manifolds, involving closed-form continuous expressions within simplices and finite rotations across simplices. The finite-dimensional parameters of this connection are optimally computed by minimizing a quadratic measure of the deviation to the (discontinuous) Levi-Civita connection induced by the embedding of the input triangle mesh, or to any metric connection with arbitrary cone singularities at vertices. From this discrete connection, a covariant derivative is constructed through exact differentiation, leading to explicit expressions for local integrals of first-order derivatives (such as divergence, curl, and the Cauchy-Riemann operator) and for L₂-based energies (such as the Dirichlet energy). We finally demonstrate the utility, flexibility, and accuracy of our discrete formulations for the design and analysis of vector, n-vector, and n-direction fields.

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Cited By

Weng YCao JChen Z(2024)Global optimization of optimal Delaunay triangulation with modified whale optimization algorithmEngineering with Computers10.1007/s00366-023-01928-240:4(2595-2616)Online publication date: 1-Aug-2024
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Coiffier GCorman E(2023)The Method of Moving Frames for Surface Global ParametrizationACM Transactions on Graphics10.1145/360428242:5(1-18)Online publication date: 20-Sep-2023
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Liu HGillespie MChislett BSharp NJacobson ACrane K(2023)Surface Simplification using Intrinsic Error MetricsACM Transactions on Graphics10.1145/359240342:4(1-17)Online publication date: 26-Jul-2023
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Index Terms

Discrete Connection and Covariant Derivative for Vector Field Analysis and Design
1. Computing methodologies
  1. Computer graphics
    1. Shape modeling
      1. Mesh models

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Published In

cover image ACM Transactions on Graphics

ACM Transactions on Graphics Volume 35, Issue 3

June 2016

128 pages

ISSN:0730-0301

EISSN:1557-7368

DOI:10.1145/2903775

Editor:
Kavita Bala
Cornell University

Issue’s Table of Contents

Copyright © 2016 ACM.

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Association for Computing Machinery

New York, NY, United States

Publication History

Published: 15 March 2016

Accepted: 01 December 2015

Revised: 01 November 2015

Received: 01 August 2014

Published in TOG Volume 35, Issue 3

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Cited By

Weng YCao JChen Z(2024)Global optimization of optimal Delaunay triangulation with modified whale optimization algorithmEngineering with Computers10.1007/s00366-023-01928-240:4(2595-2616)Online publication date: 1-Aug-2024
https://dl.acm.org/doi/10.1007/s00366-023-01928-2
Coiffier GCorman E(2023)The Method of Moving Frames for Surface Global ParametrizationACM Transactions on Graphics10.1145/360428242:5(1-18)Online publication date: 20-Sep-2023
https://dl.acm.org/doi/10.1145/3604282
Liu HGillespie MChislett BSharp NJacobson ACrane K(2023)Surface Simplification using Intrinsic Error MetricsACM Transactions on Graphics10.1145/359240342:4(1-17)Online publication date: 26-Jul-2023
https://dl.acm.org/doi/10.1145/3592403
Qiu YReeve SLi MYang YSlattery SJiang C(2023)A Sparse Distributed Gigascale Resolution Material Point MethodACM Transactions on Graphics10.1145/357016042:2(1-21)Online publication date: 16-Jan-2023
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Mancinelli CPuppo E(2023)Computing the Riemannian center of mass on meshesComputer Aided Geometric Design10.1016/j.cagd.2023.102203103(102203)Online publication date: Jun-2023
https://doi.org/10.1016/j.cagd.2023.102203
Chun S(2023)High-Order Method with Moving Frames to Compute the Covariant Derivatives of Vectors on General 2D Curved SurfacesCommunications on Applied Mathematics and Computation10.1007/s42967-022-00225-x5:4(1534-1563)Online publication date: 9-Jan-2023
https://doi.org/10.1007/s42967-022-00225-x
Boksebeld IVaxman A(2022)High-Order Directional FieldsACM Transactions on Graphics10.1145/3550454.355545541:6(1-17)Online publication date: 30-Nov-2022
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Yao HSong ZChen BLiu L(2022)ControlVAEACM Transactions on Graphics10.1145/3550454.355543441:6(1-16)Online publication date: 30-Nov-2022
https://dl.acm.org/doi/10.1145/3550454.3555434
Park HYu RLee YLee KLee J(2022)Understanding the stability of deep control policies for biped locomotionThe Visual Computer: International Journal of Computer Graphics10.1007/s00371-021-02342-939:1(473-487)Online publication date: 3-Jan-2022
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Liu JXian ZZhou YNomura TDede EZhu B(2022)A marker-and-cell method for large-scale flow-based topology optimization on GPUStructural and Multidisciplinary Optimization10.1007/s00158-022-03214-z65:4Online publication date: 1-Apr-2022
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