Simple and weighted cyclic proximity curves and surfaces. (August 2021)
- Record Type:
- Journal Article
- Title:
- Simple and weighted cyclic proximity curves and surfaces. (August 2021)
- Main Title:
- Simple and weighted cyclic proximity curves and surfaces
- Authors:
- Róth, Ágoston
- Abstract:
- Abstract: Using the continuous extension ρ u ; σ = 1 2 σ 1 + cos u σ, u ∈ R mod 2 π of the de la Vallée Poussin kernel ( σ ∈ R ≥ 0 ), we generalize the classic integral and rational cyclic curves of order n ∈ N ≥ 1 published in Róth et al. [1] and Juhász and Róth [2], respectively. We refer to these new closed smooth curve-modeling tools as simple/weighted cyclic proximity curves of order n and of shape parameter σ . Continuously increasing the fullness-controlling parameter σ, these new types of curves provide pointwise convergent curve-flows consisting of smooth transitions between the starting classic integral/rational cyclic curves and their control polygons. Using tensor-products, we also define simple/weighted cyclic proximity surfaces of order n, m ∈ N ≥ 1 2 and of shape vector σ, τ ∈ R ≥ 0 2, which extend the notion of classic integral/rational cyclic surfaces and ensure smooth transitions between the initial classic integral/rational cyclic surfaces and their control nets. We also study the asymptotic behavior, the geometric and shape-preserving properties of these curve/surface-flows. Whenever we could find appropriate mathematical tools, we have proved these properties by assuming non-negative real shape parameters, but concerning variation- and length-diminishing properties, we have also formulated open questions for the research community when σ, τ ∈ R ≥ 0 ∖ S 2, where S = N ≥ 0 ∪ ( N ≥ 0 + 1 2 ) denotes the set of those shape parameters for which we were ableAbstract: Using the continuous extension ρ u ; σ = 1 2 σ 1 + cos u σ, u ∈ R mod 2 π of the de la Vallée Poussin kernel ( σ ∈ R ≥ 0 ), we generalize the classic integral and rational cyclic curves of order n ∈ N ≥ 1 published in Róth et al. [1] and Juhász and Róth [2], respectively. We refer to these new closed smooth curve-modeling tools as simple/weighted cyclic proximity curves of order n and of shape parameter σ . Continuously increasing the fullness-controlling parameter σ, these new types of curves provide pointwise convergent curve-flows consisting of smooth transitions between the starting classic integral/rational cyclic curves and their control polygons. Using tensor-products, we also define simple/weighted cyclic proximity surfaces of order n, m ∈ N ≥ 1 2 and of shape vector σ, τ ∈ R ≥ 0 2, which extend the notion of classic integral/rational cyclic surfaces and ensure smooth transitions between the initial classic integral/rational cyclic surfaces and their control nets. We also study the asymptotic behavior, the geometric and shape-preserving properties of these curve/surface-flows. Whenever we could find appropriate mathematical tools, we have proved these properties by assuming non-negative real shape parameters, but concerning variation- and length-diminishing properties, we have also formulated open questions for the research community when σ, τ ∈ R ≥ 0 ∖ S 2, where S = N ≥ 0 ∪ ( N ≥ 0 + 1 2 ) denotes the set of those shape parameters for which we were able to theoretically justify the previously listed two properties at the moment. If σ, τ ∈ N ≥ 0 2, the proposed simple/weighted proximity curves/surfaces also have an either integral or rational classic cyclic representation, but we show that the recommended modeling tools have advantages over the classic integral/rational cyclic curves/surfaces even in this special case. Graphical abstract: Highlights: Globally controlled simple/weighted cyclic proximity curves/surfaces are proposed. The proposed free-form modeling tools generalize the classic cyclic curves/surfaces. Based on continuously extended de la Vallée Poussin kernels/radial basis functions. Asymptotic behaviors, geometric and shape-preserving properties are studied. Continuous curve/surface-flows that converge pointwise to the control-polygon/net. … (more)
- Is Part Of:
- Computer aided design. Volume 137(2021)
- Journal:
- Computer aided design
- Issue:
- Volume 137(2021)
- Issue Display:
- Volume 137, Issue 2021 (2021)
- Year:
- 2021
- Volume:
- 137
- Issue:
- 2021
- Issue Sort Value:
- 2021-0137-2021-0000
- Page Start:
- Page End:
- Publication Date:
- 2021-08
- Subjects:
- De la Vallée Poussin kernel and radial basis functions -- Global proximity/sensitivity-control -- Cyclic proximity basis -- Simple/weighted cyclic proximity curves/surfaces -- Pointwise convergent curve/surface-flows -- Geometric and shape-preserving properties
Computer-aided design -- Periodicals
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Conception technique -- Informatique -- Périodiques
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Periodicals
Electronic journals
620.00420285 - Journal URLs:
- http://www.journals.elsevier.com/computer-aided-design/ ↗
http://www.elsevier.com/journals ↗ - DOI:
- 10.1016/j.cad.2021.103043 ↗
- Languages:
- English
- ISSNs:
- 0010-4485
- Deposit Type:
- Legaldeposit
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- Available online (eLD content is only available in our Reading Rooms) ↗
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- British Library DSC - 3393.520000
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