Title :
Computing the Sparse Solution to Fourier Extension of Nonperiodic Function
Author :
Jiang Guojun ; Luo Yawen ; Zhang Kun ; Zhang Chuanlin
Author_Institution :
Dept. of Math., Ji´nan Univ., Guangzhou, China
Abstract :
For a given basis, the approximate solution to Fourier extension of Nonperiodic function computed with numerical least squares methods including projection methods and collocation methods are successful but not sparse. To solve the linear system equations built on projection methods by using Orthogonal Matching Pursuit algorithm, we extract some items from the original basis. We do optimization based on the low-dimensional basis generated by those items extracted from the original basis, thus we find the sparse solution to Fourier extension of Nonperiodic function without loss of approximation accuracy and unbounded Fourier coefficients.
Keywords :
Fourier analysis; iterative methods; least squares approximations; linear systems; Fourier extension; approximate solution; collocation methods; linear system equations; low dimensional basis; nonperiodic function; numerical least squares methods; optimization; orthogonal matching pursuit algorithm; sparse solution computing; unbounded Fourier coefficients; Eigenvalues and eigenfunctions; Equations; Least squares approximations; Linear systems; Matching pursuit algorithms; Optimization; Fourier extension; Orthogonal Matching Pursuit; least squares; sparse rate; sparse solution;
Conference_Titel :
Software Engineering (WCSE), 2013 Fourth World Congress on
Conference_Location :
Hong Kong
Print_ISBN :
978-1-4799-2882-8
DOI :
10.1109/WCSE.2013.36
