Non-uniform interpolatory curve subdivision with edge parameters built upon compactly supported fundamental splines

Existing shape models with spherical topology are typically designed either in the discrete domain using interpolating polygon meshes or in the continuous domain using smooth but non-interpolating schemes such as subdivision or NURBS. Both polygon models and subdivision methods require a large number of parameters to model smooth surfaces. NURBS need fewer parameters but have a complicated rational expression and non-uniform shifts in their formulation. We present a new method to construct deformable closed surfaces, which includes exact spheres, by combining the best of two worlds: a smooth, interpolating model with a continuously varying tangent plane and well-defined curvature at every point on the surface.Our formulation is considerably simpler than NURBS and requires fewer parameters than polygon meshes. We demonstrate the generality of our method with applications including intuitive user-interactive shape modeling, continuous surface deformation, shape morphing, reconstruction of shapes from parameterized point clouds, and fast iterative shape optimization for image segmentation. Comparisons with discrete methods and non-interpolating approaches highlight the advantages of our framework.

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“…Variants of this scheme have been proposed in Ref. [44] which have also been used to construct conic sections [45].…”

Section: Interpolationmentioning

confidence: 99%

Smooth shapes with spherical topology: Beyond traditional modeling, efficient deformation, and interaction

2017

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“…Thanks to this updating rule, the subdivision algorithm is linear and, after a few rounds of subdivision, the knot intervals assume a piecewise uniform configuration, namely the parameterization is uniform everywhere except at isolated points corresponding to the initial polyline vertices. Schemes of this kind have been the topic of several papers including [6,7,16,27]. In this case the insertion rule in (1) can be written as…”

Section: A Class Of Non-uniform Interpolatory 4-point Schemesmentioning

confidence: 99%

“…, which was proposed in [6]. By construction, the two reference schemes with coefficients in (5) and (6) reproduce polynomials respectively in Π 3 and Π 2 ; moreover, in the referenced papers, it was proven that they are C 1 when the parameterization is piecewise uniform.…”

Section: A Class Of Non-uniform Interpolatory 4-point Schemesmentioning

confidence: 99%

“…In this respect, uniform interpolatory schemes have been investigated in detail, both for the curve and surface cases, and by now fully understood. Interpolatory methods with non-uniform parameterization, were introduced in the seminal work by Daubechies et al [16] and more recently they have been the topic of several papers (see [6,7,17]). This renewed interest has arisen since it was observed that the non-uniform parameterization may significantly reduce interpolation artifacts (like unwanted undulation, cusps and self-intersections) with respect to the uniform.…”

Section: Introductionmentioning

confidence: 99%

“…In the interpolatory context, this paper is the first addressing a non-tensor product setting. The non-uniform, nontensor product surface subdivision scheme is defined as a generalization of a class of piecewise uniform, univariate, interpolatory 4-point schemes derived by upsampling fundamental bases for interpolation, as those in [6,8,16]. As a consequence, the coefficients of the scheme depend on the non-uniform, local knot intervals upon which the underlying cardinal spline basis is defined.…”

Section: Introductionmentioning

confidence: 99%

See 2 more Smart Citations

Non-uniform non-tensor product local interpolatory subdivision surfaces

Beccari¹,

Casciola²,

Romani³

2013

Computer Aided Geometric Design

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In this paper we exploit a class of univariate, C 1 interpolating four-point subdivision schemes featured by a piecewise uniform parameterization, to define non-tensor product subdivision schemes interpolating regular grids of control points and generating C 1 limit surfaces with a better behavior than the well-established tensor product subdivision and spline surfaces. As a result, it is emphasized that subdivision methods can be more effective than splines, not only, as widely acknowledged, for the representation of surfaces of arbitrary topology, but also for the generation of smooth interpolants of regular grids of points. To our aim, the piecewise uniform parameterization of the univariate case is generalized to an augmented parameterization, where the knot intervals of the kth level grid of points are computed from the initial ones by an updating relation that keeps the subdivision algorithm linear. The particular parameters configuration, together with the structure of the subdivision rules, turn out to be crucial to prove the continuity and smoothness of the limit surface.

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A mixed hyperbolic/trigonometric non‐stationary subdivision scheme for arbitrary topology meshes

Barrera

Lamnii

Nour

et al. 2022

Math Methods in App Sciences

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In this paper, a new non‐stationary mixed scheme constructed from hyperbolic and trigonometric schemes is presented. It is characterized by a shape parameter that allows the user to modify the shape of the surface obtained from a given initial mesh. Such a non‐stationary subdivision scheme is constructed by taking the tensor product of the univariate mixed hyperbolic/trigonometric schemes by giving appropriate rules in the neighborhoods of the extraordinary points. This new scheme can generate tangent plane continuous surfaces. Some examples are given to show the performance of these new schemes, such as the reconstruction of 3D models extracted from medical images.

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Non-uniform interpolatory curve subdivision with edge parameters built upon compactly supported fundamental splines

Cited by 19 publications

References 30 publications

Smooth shapes with spherical topology: Beyond traditional modeling, efficient deformation, and interaction

Smooth shapes with spherical topology: Beyond traditional modeling, efficient deformation, and interaction

Non-uniform non-tensor product local interpolatory subdivision surfaces

A mixed hyperbolic/trigonometric non‐stationary subdivision scheme for arbitrary topology meshes

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