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Approximation Theory, Spline Functions and Applications Hardcover
Free US Delivery | ISBN:079231574X
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Condition:
“Former library book; may include library markings. Used book that is in clean, average condition ”... Read moreabout condition
Good
A book that has been read but is in good condition. Very minimal damage to the cover including scuff marks, but no holes or tears. The dust jacket for hard covers may not be included. Binding has minimal wear. The majority of pages are undamaged with minimal creasing or tearing, minimal pencil underlining of text, no highlighting of text, no writing in margins. No missing pages.
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eBay item number:277417368534
Item specifics
- Condition
- Good
- Seller Notes
- Features
- EX-LIBRARY
- Book Title
- Approximation Theory, Spline Functions and Applications Hardcover
- ISBN
- 9780792315742
About this product
Product Identifiers
Publisher
Springer Netherlands
ISBN-10
079231574X
ISBN-13
9780792315742
eBay Product ID (ePID)
8038803326
Product Key Features
Number of Pages
Xvi, 479 Pages
Language
English
Publication Name
Approximation Theory, Spline Functions and Applications
Subject
Functional Analysis, General, Mathematical Analysis
Publication Year
1992
Type
Textbook
Subject Area
Mathematics
Series
NATO Science Series C: Ser.
Format
Hardcover
Dimensions
Item Weight
68.1 Oz
Item Length
9.3 in
Item Width
6.1 in
Additional Product Features
Intended Audience
Scholarly & Professional
LCCN
91-043975
Dewey Edition
20
Series Volume Number
356
Number of Volumes
1 vol.
Illustrated
Yes
Dewey Decimal
511.42
Table Of Content
Approximation by Functions of Nonclassical Form.- Wavelets- with Emphasis on Spline-Wavelets and Applications to Signal Analysis.- Padé Approximation in one and more Variables.- Rational Hermite Interpolation in one and more variables.- The Method of Alternating Orthogonal Projections.- Selections for Metric Projections.- Weighted Polynomials.- Some Aspects of Radial Basis Function Approximation.- A Tutorial on Multivariate Wavelet Decomposition.- Using the Refinement Equation for the Construction of Pre-Wavelets VI: Shift Invariant Subspaces.- Error Estimates for Near-Minimax Approximations.- Different Metrics and Location Problems.- On the Effectiveness of Some Inversion Methods for Noisy Fourier Series.- A Generalization of N-Widths.- The Equivalence of the Usual and Quotient Topologies for C?(E) when E ? ?n is Whitney p-- Regular.- Korovkin Theorems for Vector-Valued Continuous Functions.- On Modified Bojanic-Shisha Operators.- A property of zeros and Cotes numbers of Hermite and Laguerre orthogonal polynomials.- Hermite-Fejér and Hermite Interpolation.- New Results on Lagrange Interpolation.- Ambiguous Loci in Best Approximation Theory.- A Theorem on best approximations in topological vector spaces.- On the Characterization of Totally Positive Matrices.- Iterative Methods for the General Order Complementarity Problem.- Wavelets, Splines, and Divergence-Free Vector Functions.- An Approach to Meromorphic Approximation in a Stein Manifold.- Approximating Fixed Points for Nonexpansive Maps in Hilbert Spaces.- On Approximation and Interpolation of Convex Functions.- Convergence of Approximating Fixed Point Sets for Multivalued Nonexpansive Mappings.- A Subdivision Algorithm for Non-Uniform B-Splines.- Some Applications of an Approximation Theorem for FixedPoints of Multi-valued Contractions.- Geometrical Differentiation and High-Accuracy curve Interpolation.- On Best Simultaneous Approximation in Normed Linear Spaces.- Some Examples Concerning Projection Constants.
Synopsis
These are the Proceedings of the NATO Advanced Study Institute on Approximation Theory, Spline Functions and Applications held in the Hotel villa del Mare, Maratea, Italy between April 28,1991 and May 9, 1991. The principal aim of the Advanced Study Institute, as reflected in these Proceedings, was to bring together recent and up-to-date developments of the subject, and to give directions for future research. Amongst the main topics covered during this Advanced Study Institute is the subject of uni variate and multivariate wavelet decomposition over spline spaces. This is a relatively new area in approximation theory and an increasingly impor tant subject. The work involves key techniques in approximation theory cardinal splines, B-splines, Euler-Frobenius polynomials, spline spaces with non-uniform knot sequences. A number of scientific applications are also highlighted, most notably applications to signal processing and digital im age processing. Developments in the area of approximation of functions examined in the course of our discussions include approximation of periodic phenomena over irregular node distributions, scattered data interpolation, Pade approximants in one and several variables, approximation properties of weighted Chebyshev polynomials, minimax approximations, and the Strang Fix conditions and their relation to radial functions. I express my sincere thanks to the members of the Advisory Commit tee, Professors B. Beauzamy, E. W. Cheney, J. Meinguet, D. Roux, and G. M. Phillips. My sincere appreciation and thanks go to A. Carbone, E. DePas cale, R. Charron, and B., These are the Proceedings of the NATO Advanced Study Institute on Approximation Theory, Spline Functions and Applications held in the Hotel villa del Mare, Maratea, Italy between April 28,1991 and May 9, 1991. The principal aim of the Advanced Study Institute, as reflected in these Proceedings, was to bring together recent and up-to-date developments of the subject, and to give directions for future research. Amongst the main topics covered during this Advanced Study Institute is the subject of uni- variate and multivariate wavelet decomposition over spline spaces. This is a relatively new area in approximation theory and an increasingly impor- tant subject. The work involves key techniques in approximation theory- cardinal splines, B-splines, Euler-Frobenius polynomials, spline spaces with non-uniform knot sequences. A number of scientific applications are also highlighted, most notably applications to signal processing and digital im- age processing. Developments in the area of approximation of functions examined in the course of our discussions include approximation of periodic phenomena over irregular node distributions, scattered data interpolation, Pade approximants in one and several variables, approximation properties of weighted Chebyshev polynomials, minimax approximations, and the Strang- Fix conditions and their relation to radial functions. I express my sincere thanks to the members of the Advisory Commit- tee, Professors B. Beauzamy, E. W. Cheney, J. Meinguet, D. Roux, and G. M. Phillips. My sincere appreciation and thanks go to A. Carbone, E. DePas- cale, R. Charron, and B.
LC Classification Number
QA299.6-433
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Seller feedback (457,360)
- a***m (637)- Feedback left by buyer.Past monthVerified purchaseItem. arrived on time, as described. Thanks.
- eBay 自動留下信用評價- Feedback left by buyer.Past month訂單準時送達,沒遇到任何問題
- eBay 自動留下信用評價- Feedback left by buyer.Past month訂單準時送達,沒遇到任何問題