University of Illinois Urbana-Champaign

Exploiting compression in solving discretized linear systems

Carrier, Erin Elizabeth

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https://hdl.handle.net/2142/104752

Description

Title
Exploiting compression in solving discretized linear systems
Author(s)
Carrier, Erin Elizabeth
Issue Date
2019-03-05
Director of Research (if dissertation) or Advisor (if thesis)
Heath, Michael T.
Doctoral Committee Chair(s)
Heath, Michael T.
Committee Member(s)
  • Olson, Luke
  • Fischer, Paul
  • Hansen, Per Christian
Department of Study
Computer Science
Discipline
Computer Science
Degree Granting Institution
University of Illinois at Urbana-Champaign
Degree Name
Ph.D.
Degree Level
Dissertation
Keyword(s)
  • linear systems
  • compressed solution
  • compression basis
  • projection method
  • discretized linear system
  • regularization method
Abstract
Solving systems of linear algebraic equations is crucial for many computational problems in science and engineering. Numerous techniques are available for solving such linear systems, including direct methods such as Gaussian elimination and iterative methods such as GMRES. This thesis proposes a method for exploiting compression while computing the solution to a given discretized system of linear algebraic equations and investigates both its overall effectiveness in practice and which factors determine its effectiveness. The method is based on computing an approximate solution in a reduced space, and thus we seek a basis in which the solution has a compressed representation and can consequently be computed more efficiently. We address three primary issues: (1) how to compute an approximate solution to the given discretized linear system using a given basis, (2) how to choose a basis that yields significant compression, and (3) how to detect when the basis is of sufficient dimension to provide a satisfactory approximation. While all three aspects have antecedents in previous ideas and methods, we combine, adapt, and extend them in a manner we believe to be novel for the purpose of solving discretized linear systems. We demonstrate that the resulting method can be competitive with, and sometimes outperform, current standard methods and is effective for efficiently solving linear systems resulting from the discretization of major classes of continuous problems.
Graduation Semester
2019-05
Type of Resource
text
Permalink
http://hdl.handle.net/2142/104752
Copyright and License Information
Copyright 2019 Erin Elizabeth Carrier

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