Accra Metropolitan University

  • Home
  • Information
  • News
  • Help
  • Librarian
  • Member Area
  • Select Language :
    Arabic Bengali Brazilian Portuguese English Espanol German Indonesian Japanese Malay Persian Russian Thai Turkish Urdu

Search by :

ALL Author Subject ISBN/ISSN Advanced Search

Last search:

{{tmpObj[k].text}}
Image of Spline Functions on Triangulations
Bookmark Share

Mathematics

Spline Functions on Triangulations

M I N G -J U N L A I and LARRY SCHUMAKER - Personal Name;

The theory of univariate splines began its rapid development in the early sixties, resulting in several thousand research papers and a number of books. This development was largely over by 1980, and the bulk of what is known today was treated in the classic monographs of deBoor [Boo78] and Schu- maker [Sch81]. Univariate splines have become an essential tool in a wide variety of application areas, and are by now a standard topic in numerical analysis books.
If 1960–1980 was the age of univariate splines, then the next twenty years can be regarded as the age of multivariate splines. Prior to 1980 there were some results for tensor-product splines, and engineers were us- ing piecewise polynomials in two and three variables in the finite element method, but multivariate splines had attracted relatively little attention. Now we have an estimated 1500 papers on the subject.
The purpose of this book is to provide a comprehensive treatment of the theory of bivariate and trivariate polynomial splines defined on triangu- lations and tetrahedral partitions. We have been working on this book for more than ten years, and initially planned to include details on some of the most important applications, including for example CAGD, data fitting, surface compression, and numerical solution of partitial differential equa- tions. But to keep the size of the book manageable, we have reluctantly decided to leave applications for another monograph.
For us, a multivariate spline is a function which is made up of pieces of polynomials defined on some partition △ of a set Ω, and joined together to ensure some degree of global smoothness. We will focus primarily on the case where △ is a triangulation of a planar region, a triangulation on the sphere, or a tetrahedral partition of a set Ω in R3


Availability

No copy data

Detail Information
Series Title
Spline Functions on Triangulations
Call Number
-
Publisher
USA : Cambridge University Press., 2007
Collation
1-609
Language
English
ISBN/ISSN
13 978-0-521-87592-9
Classification
NONE
Content Type
-
Media Type
-
Carrier Type
-
Edition
1st Edtion
Subject(s)
Mathematics
Specific Detail Info
-
Statement of Responsibility
-
Other version/related

No other version available

File Attachment
  • Spline Functions on Triangulations
Comments

You must be logged in to post a comment

Accra Metropolitan University
  • Information
  • Services
  • Librarian
  • Member Area

About Us

Accra Metropolitan University is a forward-thinking, private higher education institution in Ghana dedicated to empowering minds and shaping futures for sustainable global development. Fully accredited by the Ghana Tertiary Education Commission (GTEC), the university is built on the core pillars of LIFE: Leadership, Innovation, Flexibility, and Entrepreneurship.

Search

start it by typing one or more keywords for title, author or subject

Keep SLiMS Alive Want to Contribute?

© 2026 — Senayan Developer Community

Powered by SLiMS
Select the topic you are interested in
  • Computer Science, Information & General Works
  • Philosophy & Psychology
  • Religion
  • Social Sciences
  • Language
  • Pure Science
  • Applied Sciences
  • Art & Recreation
  • Literature
  • History & Geography
Icons made by Freepik from www.flaticon.com
Advanced Search
Where do you want to share?