ϵκ -Curves: controlled local curvature extrema

Kenjiro T. Miura, R. U. Gobithaasan, Péter Salvi, Dan Wang, Tadatoshi Sekine, Shin Usuki, Jun ichi Inoguchi, Kenji Kajiwara

研究成果: Contribution to journalArticle査読

1 被引用数 (Scopus)

抄録

The κ-curve is a recently published interpolating spline which consists of quadratic Bézier segments passing through input points at the loci of local curvature extrema. We extend this representation to control the magnitudes of local maximum curvature in a new scheme called extended- or ϵκ-curves.κ-curves have been implemented as the curvature tool in Adobe Illustrator® and Photoshop® and are highly valued by professional designers. However, because of the limited degrees of freedom of quadratic Bézier curves, it provides no control over the curvature distribution. We propose new methods that enable the modification of local curvature at the interpolation points by degree elevation of the Bernstein basis as well as application of generalized trigonometric basis functions. By using ϵκ-curves, designers acquire much more ability to produce a variety of expressions, as illustrated by our examples.

本文言語英語
ジャーナルVisual Computer
DOI
出版ステータス受理済み/印刷中 - 2021

All Science Journal Classification (ASJC) codes

  • ソフトウェア
  • コンピュータ ビジョンおよびパターン認識
  • コンピュータ グラフィックスおよびコンピュータ支援設計

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