مرکز منطقه ای اطلاع رساني علوم و فناوري - Efficient Multilevel Eigensolvers with Applications to Data Analysis Tasks

DocumentCode :

1269416

Title :

Efficient Multilevel Eigensolvers with Applications to Data Analysis Tasks

Author :

Kushnir, Dan ; Galun, Meirav ; Brandt, Achi

Author_Institution :

Dept. of Math., Yale Univ., New Haven, CT, USA

Volume :

Issue :

fYear :

2010

Firstpage :

1377

Lastpage :

1391

Abstract :

Multigrid solvers proved very efficient for solving massive systems of equations in various fields. These solvers are based on iterative relaxation schemes together with the approximation of the “smooth” error function on a coarser level (grid). We present two efficient multilevel eigensolvers for solving massive eigenvalue problems that emerge in data analysis tasks. The first solver, a version of classical algebraic multigrid (AMG), is applied to eigenproblems arising in clustering, image segmentation, and dimensionality reduction, demonstrating an order of magnitude speedup compared to the popular Lanczos algorithm. The second solver is based on a new, much more accurate interpolation scheme. It enables calculating a large number of eigenvectors very inexpensively.

Keywords :

data analysis; eigenvalues and eigenfunctions; pattern clustering; Lanczos algorithm; classical algebraic multigrid; clustering; coarser level; data analysis tasks; dimensionality reduction; efficient multilevel eigensolvers; image segmentation; iterative relaxation schemes; Eigenvalues and eigenvectors; clustering.; graph algorithms; multigrid and multilevel methods; segmentation;

fLanguage :

English

Journal_Title :

Pattern Analysis and Machine Intelligence, IEEE Transactions on

Publisher :

ieee

ISSN :

0162-8828

Type :

jour

DOI :

10.1109/TPAMI.2009.147

Filename :

5184845

Link To Document :

https://search.ricest.ac.ir/dl/search/defaultta.aspx?DTC=49&DC=1269416