Wavelet Subdivision Methods

Name: Wavelet Subdivision Methods
Brand: Taylor & Francis Inc
SKU: 9781439812150
Price: 223.2 EUR
Availability: InStock

★★★★★

€223.20

Product variants

A01=Charles Chui

A01=Johan de Villiers

Age Group_Uncategorized

Author_Charles Chui

Author_Johan de Villiers

automatic-update

Bi-orthogonal Wavelets

Category1=Non-Fiction

Category=PBK

Category=PBM

Category=PBW

Category=UG

Coefficient Sequence

computer simulation

COP=United States

Curve Rendering

Curve Representation

Delivery_Pre-order

Dual Scaling Functions

eq_computing

eq_isMigrated=2

eq_non-fiction

Euclidean Algorithm

Exact Degree

Filter Sequences

General Polynomial

Geometry Editing

geometry editing and manipulation schemes

Geometry Editing And Manipulation Schemes (Gems)

Language_English

Laurent Polynomial

Manipulation Schemes

Odd Integer

PA=Temporarily unavailable

Parametric Curves

Polynomial Sequence

Price_€100 and above

PS=Active

Reciprocal Polynomial

Refinement Sequence

Scaling Functions

softlaunch

Subdivision Methods

Subdivision Operator

Subdivision Schemes

Surface Rendering

Surface Subdivision

Symmetric Polynomial

Synthesis Wavelets

Van Der Bijl

wavelet analysis

Wavelet Approach

wavelet bottom-up subdivision

Wavelet Decomposition

Wavelet Subdivision

wavelet top-down editing

Product details

ISBN 9781439812150
Weight: 816g
Dimensions: 156 x 234mm
Publication Date: 23 Aug 2010
Publisher: Taylor & Francis Inc
Publication City/Country: US
Product Form: Hardback
Language: English

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Prevalent in animation movies and interactive games, subdivision methods allow users to design and implement simple but efficient schemes for rendering curves and surfaces. Adding to the current subdivision toolbox, Wavelet Subdivision Methods: GEMS for Rendering Curves and Surfaces introduces geometry editing and manipulation schemes (GEMS) and covers both subdivision and wavelet analysis for generating and editing parametric curves and surfaces of desirable geometric shapes. The authors develop a complete constructive theory and effective algorithms to derive synthesis wavelets with minimum support and any desirable order of vanishing moments, along with decomposition filters.

Through numerous examples, the book shows how to represent curves and construct convergent subdivision schemes. It comprehensively details subdivision schemes for parametric curve rendering, offering complete algorithms for implementation and theoretical development as well as detailed examples of the most commonly used schemes for rendering both open and closed curves. It also develops an existence and regularity theory for the interpolatory scaling function and extends cardinal B-splines to box splines for surface subdivision.

Keeping mathematical derivations at an elementary level without sacrificing mathematical rigor, this book shows how to apply bottom-up wavelet algorithms to curve and surface editing. It offers an accessible approach to subdivision methods that integrates the techniques and algorithms of bottom-up wavelets.

Charles Chui is a Curators’ Professor in the Department of Mathematics and Computer Science at the University of Missouri in St. Louis, and a consulting professor of statistics at Stanford University in California. Dr. Chui’s research interests encompass applied and computational mathematics, with an emphasis on splines, wavelets, mathematics of imaging, and fast algorithms.

Johan de Villiers is a professor in the Department of Mathematical Sciences, Mathematics Division at Stellenbosch University in South Africa. Dr. de Villiers’s research interests include computational mathematics, with an emphasis on wavelet and subdivision analysis.