Inflationary dynamics for matrix eigenvalue problems

Eric J. Heller, Lev Kaplan, Frank Pollmann

Research output: Contribution to journalArticlepeer-review

5 Scopus citations

Abstract

Many fields of science and engineering require finding eigenvalues and eigenvectors of large matrices. The solutions can represent oscillatory modes of a bridge, a violin, the disposition of electrons around an atom or molecule, the acoustic modes of a concert hall, or hundreds of other physical quantities. Often only the few eigenpairs with the lowest or highest frequency (extremal solutions) are needed. Methods that have been developed over the past 60 years to solve such problems include the Lanczos algorithm, Jacobi-Davidson techniques, and the conjugate gradient method. Here, we present a way to solve the extremal eigenvalue/eigenvector problem, turning it into a nonlinear classical mechanical system with a modified Lagrangian constraint. The constraint induces exponential inflationary growth of the desired extremal solutions.

Original languageEnglish
Pages (from-to)7631-7635
Number of pages5
JournalProceedings of the National Academy of Sciences of the United States of America
Volume105
Issue number22
DOIs
StatePublished - 3 Jun 2008
Externally publishedYes

Keywords

  • Eigenpairs
  • Sparse matrices

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