Wavelet-finite element bases for numerical solutions of partial differential equations /
algorithms with the same measures for FEM.
| Main Author: | |
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| Format: | Thesis eBook |
| Language: | English |
| Published: |
[Place of publication not identified] :
[publisher not identified] ;
1996.
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| Subjects: | |
| Online Access: | Link to OAKTrust copy |
| Summary: | algorithms with the same measures for FEM. bases will be chosen carefully and will be combined into one basis. This hybrid basis is used in the Ritz-Galerkin method choosing which functions to use from each basis at each level computational measures such as the conditioning of the differential equations (PDES) using wavelets and finite elements. We focus on third order Daubechies' wavelets and for numerically solving PDES. Three different procedures for Galerkin matrices and the overall complexity of the matches that of standard Finite Element Methods (FEM) with most effective and prove that with appropriate smoothness of refinement will be discussed and numerical results will be piecewise linear elements. Finally, we compare other piecewise linear finite elements. Functions from these two requirements the convergence rate for this best choice This thesis presents a method to solve elliptic partial used to illustrate the strengths and weaknesses of each variation. We show which of these strategies will be the |
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| Item Description: | "Major subject: Mathematics". Vita. |
| Physical Description: | vii, 77 leaves : illustrations ; 28 cm. Also available online. Issued also on microfiche from Lange Micrographics. |
| Bibliography: | Includes bibliographical references: pages 54-55. |