A New Construction of Boundary Interpolating Wavelets for Fourth Order Problems

Bertoluzza Silvia; Perrier Valerie

首页> 外文期刊>Acta Applicandae Mathematicae: An International Journal on Applying Mathematics and Mathematical Applications >A New Construction of Boundary Interpolating Wavelets for Fourth Order Problems

【24h】

A New Construction of Boundary Interpolating Wavelets for Fourth Order Problems

机译：第四阶问题边界插值小波建设

获取原文

获取原文并翻译 | 示例

掌桥外文数据库（机构版） >>

开具论文收录证明 >>

文献代查 >>

页面导航

摘要
著录项
相似文献
相关主题

摘要

In this article we introduce a new mixed Lagrange-Hermite interpolating wavelet family on the interval, to deal with two types (Dirichlet and Neumann) of boundary conditions. As this construction is a slight modification of the interpolating wavelets on the interval of Donoho, it leads to fast decomposition, error estimates and norm equivalences. This new basis is then used in adaptive wavelet collocation schemes for the solution of one dimensional fourth order problems. Numerical tests conducted on the 1D Euler-Bernoulli beam problem, show the efficiency of the method.

机译：在本文中，我们在间隔内引入了一个新的混合拉格朗日 - Hermite插值小波家族，以处理边界条件的两种类型（Dirichlet和Neumann）。由于这种结构是在Donoho的间隔内轻微修改内插小波，它导致快速分解，误差估计和符号等效性。然后在自适应小波剥离方案中使用这种新的基础，用于解决一维第四阶问题的解决方案。在1D Euler-Bernoulli梁问题上进行的数值测试，显示了该方法的效率。

著录项

来源
《Acta Applicandae Mathematicae: An International Journal on Applying Mathematics and Mathematical Applications》 |2017年第1期|共24页
作者
Bertoluzza Silvia; Perrier Valerie;
展开▼
作者单位

CNR IMATI Pavia Italy;

Univ Grenoble Alpes CNRS LJK F-38000 Grenoble France;

展开▼
收录信息
原文格式 PDF
正文语种 eng
中图分类应用数学;
关键词
Interpolating wavelets; Wavelet collocation; Fourth order problems;

机译：内插小波;小波搭配;第四个阶问题;

相似文献

外文文献
中文文献
专利

1. A New Construction of Boundary Interpolating Wavelets for Fourth Order Problems [J] . Bertoluzza Silvia, Perrier Valerie Acta Applicandae Mathematicae: An International Journal on Applying Mathematics and Mathematical Applications . 2017,第1期

机译：第四阶问题边界插值小波建设
2. New Wavelets Collocation Method for Solving Second-Order Multipoint Boundary Value Problems Using Chebyshev Polynomials of Third and Fourth Kinds [J] . W. M.Abd-Elhameed, E. H.Doha, Y. H.Youssri Abstract and applied analysis . 2013,第6期

机译：使用第三和第四类Chebyshev多项式求解二阶多点边值问题的新小波配置方法
3. Numerical solution of fourth order boundary-value problems using Haar wavelets [J] . A. Dasdemir Applied mathematical sciences . 2011,第61a64期

机译：Haar小波对四阶边值问题的数值解
4. Cubic Spline Wavelets Satisfying Homogeneous Boundary Conditions for Fourth-Order Problems [C] . Dana Cerna, Vaclav Finek International Conference on Numerical Analysis and Applied Mathematics . 2009

机译：立方样条小波满足均匀边界条件的四阶问题
5. The identity of zeros of higher and lower dimensional filter banks and the construction of multidimensional nonseparable wavelets. [D] . Belayneh, Sirak. 2008

机译：高维和低维滤波器组零点的标识以及多维不可分小波的构造。
6. Development of Automated Sleep Stage Classification System Using Multivariate Projection-Based Fixed Boundary Empirical Wavelet Transform and Entropy Features Extracted from Multichannel EEG Signals [O] . Rajesh Kumar Tripathy, Samit Kumar Ghosh, Pranjali Gajbhiye, 2020

机译：使用基于多变量投影的固定边界经验小波变换和从多机组EEG信号提取的自动睡眠阶段分类系统的开发
7. A new construction of boundary interpolating wavelets for fourth order problems [O] . Bertoluzza, Silvia, Perrier, Valérie 2017

机译：四阶问题边界插值小波的一种新构造
8. Effective Construction of Compactly Supported Wavelets Satisfying HomogenousBoundary Conditions on the Interval [R] . Chiavassa, G., Liandrat, J. 1996

机译：在区间上满足均匀边界条件的紧支撑小波的有效构造

A New Construction of Boundary Interpolating Wavelets for Fourth Order Problems

摘要

著录项

相似文献

相关主题

期刊订阅