Amanote Research
Register
Sign In
Rigid Shape Interpolation Using Normal Equations
doi 10.1145/1377980.1377993
Full Text
Open PDF
Abstract
Available in
full text
Date
January 1, 2008
Authors
William Baxter
Pascal Barla
Ken-ichi Anjyo
Publisher
ACM Press
Related search
Second-Order Shape Derivatives Along Normal Trajectories, Governed by Hamilton-Jacobi Equations
Structural and Multidisciplinary Optimization
Control
Systems Engineering
Computer Graphics
Optimization
Computer Science Applications
Computer-Aided Design
Software
Volumetric Three-Dimensional Intravascular Ultrasound Visualization Using Shape-Based Nonlinear Interpolation
BioMedical Engineering Online
Nuclear Medicine
Radiology
Ultrasound Technology
Radiological
Biomaterials
Imaging
Medicine
Biomedical Engineering
Non-Rigid Shape Correspondence Using Pointwise Surface Descriptors and Metric Structures
Mathematics and Visualization
Computer Graphics
Geometry
Applied Mathematics
Simulation
Computer-Aided Design
Modeling
Topology
Non-Rigid Shape-From-Motion for Isometric Surfaces Using Infinitesimal Planarity
The Non-Rigid 3D Shape Descriptors Analysis
Design of Rational Rotation–minimizing Rigid Body Motions by Hermite Interpolation
Mathematics of Computation
Computational Mathematics
Applied Mathematics
Number Theory
Algebra
Numerical Solution of Singular Fredholm Integral Equations of the First Kind Using Newton Interpolation
Menoufia Journal of Electronic Engineering Research
Shape Retrieval of Non-Rigid 3D Human Models
International Journal of Computer Vision
Computer Vision
Pattern Recognition
Artificial Intelligence
Software
The Offset Normal Shape Distribution for Dynamic Shape Analysis
Journal of Computational and Graphical Statistics
Combinatorics
Uncertainty
Statistics
Probability
Discrete Mathematics
