Search
for Topics
All Reviews
Browse All Reviews
>
Mathematics Of Computing (G)
>
Numerical Analysis (G.1)
>
Approximation (G.1.2)
> Approximation Of Surfaces And Contours (G.1.2...)
Options:
All Media Types
Journals
Proceedings
Div Books
Whole Books
Other
Date Reviewed
Title
Author
Publisher
Published Date
Descending
Ascending
1-4 of 4 Reviews about "
Approximation Of Surfaces And Contours (G.1.2...)
":
Date Reviewed
Introduction to the mathematics of subdivision surfaces
Andersson L., Stewart N., Society for Industrial and Applied Mathematics, Philadelphia, PA, 2010. 380 pp. Type: Book (978-0-898716-97-9)
For students in computer science and applied math who deal with computer graphics, solid modeling, and computer-aided design, this book is a must-read. It provides a well-written and comprehensive introduction to the field, explaining ...
Mar 28 2011
Curve and surface reconstruction: algorithms with mathematical analysis (Cambridge Monographs on Applied and Computational Mathematics)
Dey T., Cambridge University Press, New York, NY, 2006. 228 pp. Type: Book (9780521863704)
This is a worthy successor to Edelsbrunner’s 2001 book [1], published in the same “Cambridge Monographs” series, tracking that book in digestible length, mathematical rigor, clarity, and focus on Voronoi d...
Sep 14 2007
Handbook of computational methods for integration
Kythe P., Schaferkotter M., Chapman & Hall/CRC, Boca Raton, FL, 2004. 624 pp. Type: Book (9781584884286)
The solutions of many problems in various areas of computational mathematics require that one is able to approximate integrals in an efficient and reliable way. Thus, there is a high demand for practically useful algorithms for numeric...
Dec 19 2005
Variational normal meshes
Friedel I., Schröder P., Khodakovsky A. ACM Transactions on Graphics (TOG) 23(4): 1061-1073, 2004. Type: Article
Hierarchical representations of surfaces have many advantages for digital geometry processing applications. Normal meshes are particularly attractive, since their level-to-level displacements are in the local normal direction only. Con...
Feb 11 2005
Reproduction in whole or in part without permission is prohibited. Copyright 1999-2024 ThinkLoud
®
Terms of Use
|
Privacy Policy