A unified discrete framework for intrinsic and extrinsic Dirac operators for geometry processing

Ye, Zi; Diamanti, Olga; Tang, Chengcheng; Guibas, Leonidas J.; Hoffmann, Tim

doi:10.1111/cgf.13494

Cited by 16 publications

(35 citation statements)

References 39 publications

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Ye et al. [YDT*18] create a framework, which consistently discretized the extrinsic Dirac operator and an intrinsic Dirac operator. In this paper, we improve the reconstruction based on [CPS11, YDT*18] by solving an equation with a larger solution space and introducing an area calibration (see Section 3.5).…”

Section: Related Workmentioning

confidence: 99%

See 1 more Smart Citation

A Curvature and Density‐based Generative Representation of Shapes

Ye¹,

Umetani

Igarashi

et al. 2020

Computer Graphics Forum

View full text Add to dashboard Cite

This paper introduces a generative model for 3D surfaces based on a representation of shapes with mean curvature and metric, which are invariant under rigid transformation. Hence, compared with existing 3D machine learning frameworks, our model substantially reduces the influence of translation and rotation. In addition, the local structure of shapes will be more precisely captured, since the curvature is explicitly encoded in our model. Specifically, every surface is first conformally mapped to a canonical domain, such as a unit disk or a unit sphere. Then, it is represented by two functions: the mean curvature half‐density and the vertex density, over this canonical domain. Assuming that input shapes follow a certain distribution in a latent space, we use the variational autoencoder to learn the latent space representation. After the learning, we can generate variations of shapes by randomly sampling the distribution in the latent space. Surfaces with triangular meshes can be reconstructed from the generated data by applying isotropic remeshing and spin transformation, which is given by Dirac equation. We demonstrate the effectiveness of our model on datasets of man‐made and biological shapes and compare the results with other methods.

show abstract

Section: Related Workmentioning

confidence: 99%

“…A curvature‐to‐shape reconstruction algorithm with high accuracy is critical for generating plausible shapes. We follow the basic idea in [CPS13] and [YDT*18]. The deformation between the domain and target shapes is given by the solution of the Dirac equation.…”

Section: Introductionmentioning

confidence: 99%

A Curvature and Density‐based Generative Representation of Shapes

Ye¹,

Umetani

Igarashi

et al. 2020

Computer Graphics Forum

View full text Add to dashboard Cite

show abstract

“…Later publications based on the quaternionic Dirac operator defined by Crane et al . result in quaternionic matrices as well [CPS13, LJC17, YDT*18]. Chern et al .…”

Section: Related Workmentioning

confidence: 99%

Analysis of Schedule and Layout Tuning for Sparse Matrices With Compound Entries on GPUs

Mueller-Roemer

Sourander

Fellner

2020

Computer Graphics Forum

View full text Add to dashboard Cite

Large sparse matrices with compound entries, i.e. complex and quaternionic matrices as well as matrices with dense blocks, are a core component of many algorithms in geometry processing, physically based animation and other areas of computer graphics. We generalize several matrix layouts and apply joint schedule and layout autotuning to improve the performance of the sparse matrix‐vector product on massively parallel graphics processing units. Compared to schedule tuning without layout tuning, we achieve speedups of up to 5.5 × . In comparison to cuSPARSE, we achieve speedups of up to 4.7 × .

show abstract

“…It is more generally related in spirit to large diffeomorphic frameworks [30,21] that can flow a shape from a template and (pose-equivariant) vector field. Our work expands on the framework of discrete spin transformations as introduced by Ye et al [32]. One of the appeals of a discrete framework is to bypass discretization errors by design and to offer a consistent definition of discrete geometric concepts such as curvature.…”

Section: Related Workmentioning

confidence: 99%

“…The task is now to reconstruct ("extrude") a shape of interest back from a reference sphere, given its mean curvature h and area A mapped onto the sphere surface. There is to our knowledge very little done in that direction, even in related work [6,32]. To emphasize, we only wish to recover the original mesh up to pose Fig.…”

Section: Applicationsmentioning

confidence: 99%

Controlling Meshes via Curvature: Spin Transformations for Pose-Invariant Shape Processing

Folgoc

Castro

Tan

et al. 2019

Lecture Notes in Computer Science

View full text Add to dashboard Cite

We investigate discrete spin transformations, a geometric framework to manipulate surface meshes by controlling mean curvature. Applications include surface fairing -flowing a mesh onto say, a reference sphere -and mesh extrusion -e.g., rebuilding a complex shape from a reference sphere and curvature specification. Because they operate in curvature space, these operations can be conducted very stably across large deformations with no need for remeshing. Spin transformations add to the algorithmic toolbox for pose-invariant shape analysis. Mathematically speaking, mean curvature is a shape invariant and in general fully characterizes closed shapes (together with the metric). Computationally speaking, spin transformations make that relationship explicit. Our work expands on a discrete formulation of spin transformations. Like their smooth counterpart, discrete spin transformations are naturally close to conformal (angle-preserving). This quasi-conformality can nevertheless be relaxed to satisfy the desired tradeoff between area distortion and angle preservation. We derive such constraints and propose a formulation in which they can be efficiently incorporated. The approach is showcased on subcortical structures.

show abstract

A unified discrete framework for intrinsic and extrinsic Dirac operators for geometry processing

Cited by 16 publications

References 39 publications

A Curvature and Density‐based Generative Representation of Shapes

A Curvature and Density‐based Generative Representation of Shapes

Analysis of Schedule and Layout Tuning for Sparse Matrices With Compound Entries on GPUs

Controlling Meshes via Curvature: Spin Transformations for Pose-Invariant Shape Processing

Contact Info

Product

Resources

About