CLC number: TP391.72
On-line Access: 2024-08-27
Received: 2023-10-17
Revision Accepted: 2024-05-08
Crosschecked: 0000-00-00
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LU Li-zheng, WANG Guo-zhao. A quadratic programming method for optimal degree reduction of Bézier curves with G1-continuity[J]. Journal of Zhejiang University Science A, 2007, 8(10): 1657-1662.
@article{title="A quadratic programming method for optimal degree reduction of Bézier curves with G1-continuity",
author="LU Li-zheng, WANG Guo-zhao",
journal="Journal of Zhejiang University Science A",
volume="8",
number="10",
pages="1657-1662",
year="2007",
publisher="Zhejiang University Press & Springer",
doi="10.1631/jzus.2007.A1657"
}
%0 Journal Article
%T A quadratic programming method for optimal degree reduction of Bézier curves with G1-continuity
%A LU Li-zheng
%A WANG Guo-zhao
%J Journal of Zhejiang University SCIENCE A
%V 8
%N 10
%P 1657-1662
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%D 2007
%I Zhejiang University Press & Springer
%DOI 10.1631/jzus.2007.A1657
TY - JOUR
T1 - A quadratic programming method for optimal degree reduction of Bézier curves with G1-continuity
A1 - LU Li-zheng
A1 - WANG Guo-zhao
J0 - Journal of Zhejiang University Science A
VL - 8
IS - 10
SP - 1657
EP - 1662
%@ 1673-565X
Y1 - 2007
PB - Zhejiang University Press & Springer
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DOI - 10.1631/jzus.2007.A1657
Abstract: This paper presents a quadratic programming method for optimal multi-degree reduction of bézier curves with G1-continuity. The L2 and l2 measures of distances between the two curves are used as the objective functions. The two additional parameters, available from the coincidence of the oriented tangents, are constrained to be positive so as to satisfy the solvability condition. Finally, degree reduction is changed to solve a quadratic problem of two parameters with linear constraints. Applications of degree reduction of bézier curves with their parameterizations close to arc-length parameterizations are also discussed.
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