Quartic Interpolation on Triangles
スポンサーリンク
概要
- 論文の詳細を見る
A new method is presented for constructing a surface to interpolate the given boundary curves and cross-boundary slopes on the sides of triangles. On each triangle, the constructed surface patch is a quartic polynomial, which approximates a function with a polynomial precision of degree four or less. Six test functions proposed by Franke are used to test the new method.
- 一般社団法人情報処理学会の論文
- 1995-12-15
著者
-
Nagahashi Hiroshi
Department Of Information Processing Interdisciplinary Graduate School Of Science And Engineering To
-
Agui Takeshi
Department Of Information Processing Interdisciplinary Graduate School Of Science And Engineering To
-
Agui T
Toin Univ. Yokohama Yokohama‐shi Jpn
-
Nagahashi H
Tokyo Inst. Technol. Yokohama‐shi Jpn
-
Agui Takeshi
Interdisciplinary Graduate School Of Science And Engineering Tokyo Institute Of Technology
-
ZHANG Caiming
Department of Computer Science, Shandong University
-
Zhang Caiming
Interdisciplinary Graduate School of Science and Engineering, Tokyo Institute of Technology
-
Nagahashi Hiroshi
Interdisciplinary Graduate School of Science and Engineering, Tokyo Institute of Technology
-
Nagahashi Hiroshi
Interdisciplinary Graduate School Of Science And Engineering Tokyo Institute Of Technology
-
Zhang Caiming
Department Of Computer Science Shandong University
関連論文
- Motion Segmentation in RGB Image Sequence Based on Stochastic Modeling
- Qコ-ダを用いた2値画像の可逆型順次符号化法〔英文〕
- Generating Breadth-First Expression for Gray Scale Quadtree
- A Method for C^2 Piecewise Quartic Polynomial Interpolation
- Quartic Interpolation on Triangles
- Piecewise Parametric Cubic Interpolation
- Representation of Surfaces on 5 and 6 Side Regions
- Structural Evolution of Neural Networks Having Arbitrary Connections by a Genetic Method
- A New Method for Smooth Interpolation without Twist Constraints
- Interpolation of CT Slices for Laser Stereolithography
- Orientable Closed Surface Construction from Volume Data
- A Paint System of Monochromatic Moving Images
- A Direct Relation between Bezier and polynomial Representation