Maximum Likelihood Coordinates

Chang, Qingrui; Deng, Chongyang; Hormann, Kai

doi:10.1111/cgf.14908

Cited by 4 publications

(3 citation statements)

References 50 publications

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“…Coordinates that are at least C 1 and non-negative for arbitrary polygons include harmonic [JMD*07], maximum entropy [HS08], maximum likelihood [CDH23], positive and smooth Gordon-Wixom [WLMD19], iterative [DCH20], and local barycentric coordinates [ZDL*14; TDZ19], but they do not have a closed form and must be approximated by some numerical procedure. Some of the 2D constructions can be extended to the 3D setting, which is required for cage-based deformation, and we review these constructions in detail in Sections 5 to 8.…”

Section: Generalized Barycentric Coordinatesmentioning

confidence: 99%

“…. , λN C ) of the origin with respect to the vertices of a spherical cage Ĉ, and CHANG et al [CDH23] propose to find the latter by maximizing the function…”

Section: Maximum Likelihood Coordinatesmentioning

confidence: 99%

“…( 21). The resulting MLC have all desired properties, and CHANG et al [CDH23] further explain how the global minimizer η of F can be used to compute the derivatives of MLC at x. However, if x is close to a cage face, then it may happen that the spherical cage Ĉ does not contain the origin, and then the procedure above does not give proper GBC of x with respect to C.…”

Section: Maximum Likelihood Coordinatesmentioning

confidence: 99%

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A Survey on Cage‐based Deformation of 3D Models

Ströter,

Thiery,

Hormann

et al. 2024

Computer Graphics Forum

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Interactive deformation via control handles is essential in computer graphics for the modeling of 3D geometry. Deformation control structures include lattices for free‐form deformation and skeletons for character articulation, but this report focuses on cage‐based deformation. Cages for deformation control are coarse polygonal meshes that encase the to‐be‐deformed geometry, enabling high‐resolution deformation. Cage‐based deformation enables users to quickly manipulate 3D geometry by deforming the cage. Due to their utility, cage‐based deformation techniques increasingly appear in many geometry modeling applications. For this reason, the computer graphics community has invested a great deal of effort in the past decade and beyond into improving automatic cage generation and cage‐based deformation. Recent advances have significantly extended the practical capabilities of cage‐based deformation methods. As a result, there is a large body of research on cage‐based deformation. In this report, we provide a comprehensive overview of the current state of the art in cage‐based deformation of 3D geometry. We discuss current methods in terms of deformation quality, practicality, and precomputation demands. In addition, we highlight potential future research directions that overcome current issues and extend the set of practical applications. In conjunction with this survey, we publish an application to unify the most relevant deformation methods. Our report is intended for computer graphics researchers, developers of interactive geometry modeling applications, and 3D modeling and character animation artists.

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Section: Generalized Barycentric Coordinatesmentioning

confidence: 99%

“…. , λN C ) of the origin with respect to the vertices of a spherical cage Ĉ, and CHANG et al [CDH23] propose to find the latter by maximizing the function…”

Section: Maximum Likelihood Coordinatesmentioning

confidence: 99%

Section: Maximum Likelihood Coordinatesmentioning

confidence: 99%

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