Arithmetization Of A Circular Arc
DGCI'09: Proceedings of the 15th IAPR international conference on Discrete geometry for computer imagery(2009)
摘要
In tins paper, we present an arithmetization of the Euler's integration scheme based on infinitely large integers coming from the nonstandard analysis theory. Using the differential equation that defines circles allows us to draw two families of discrete arc circles using three parameters, the radius, the global scale and the drawing scale. These parameters determine the properties of the obtained arc circles. We give criteria to assure the 8-connectivity. A global error estimate for the arithmetization of the Euler's integration scheme is also given and a first attempt to define the approximation order of an arithmetized integration scheme is provided.
更多查看译文
关键词
Discrete circle,Discrete arc circle,Arithmetization,Numerical scheme,Error order,Connectedness
AI 理解论文
溯源树
样例
生成溯源树,研究论文发展脉络