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2.158j计算几何(麻省理工学院)

2.158J Computational Geometry (MIT)
课程网址: http://ocw.mit.edu/courses/mechanical-engineering/2-158j-computat...  
主讲教师: Patrikalakis, Nicholas, Maekawa, Takashi
开课单位: 麻省理工学院
开课时间: 2003-01-01
课程语种: 英语
中文简介:
表面建模的主题:b样条,非均匀有理b样条,基于物理的可变形曲面,扫描和广义圆柱,偏移,混合和圆角曲面。非线性求解器和交叉问题。实体建模:构造实体几何,边界表示,非流形和混合维度边界表示模型,八叉树。几何计算的稳健性。区间方法。连续介质力学问题的有限元和边界元离散化方法。科学可视化。变分几何。公差。检验方法。特征表示和识别。形状审查设计,分析和制造。涉及分析和编程任务。本课程最初在课程13(海洋工程系)中提供,为13.472J。 2005年,海洋工程学科成为课程2(机械工程系)的一部分,该课程重新编号为2.158J。
课程简介: Topics in surface modeling: b-splines, non-uniform rational b-splines, physically based deformable surfaces, sweeps and generalized cylinders, offsets, blending and filleting surfaces. Non-linear solvers and intersection problems. Solid modeling: constructive solid geometry, boundary representation, non-manifold and mixed-dimension boundary representation models, octrees. Robustness of geometric computations. Interval methods. Finite and boundary element discretization methods for continuum mechanics problems. Scientific visualization. Variational geometry. Tolerances. Inspection methods. Feature representation and recognition. Shape interrogation for design, analysis, and manufacturing. Involves analytical and programming assignments. This course was originally offered in Course 13 (Department of Ocean Engineering) as 13.472J. In 2005, ocean engineering subjects became part of Course 2 (Department of Mechanical Engineering), and this course was renumbered 2.158J.
关 键 词: 曲面造型; 可变形表面; 广义气瓶
课程来源: 麻省理工学院公开课
最后编审: 2024-04-09:chenjy
阅读次数: 176

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