Solution of Finite Element Problems by Preconditioned Conjugate Gradient and Lanczos Methods.

Abstract

The solution of nonlinear, transient finite element problems may be achieved by using step-by-step integration of the equations of motion combined with a Newton solution of the resulting nonlinear algebraic equations. The use of Newton type methods leads to a set of linear simultaneous algebraic equations whose solution gives the iterate. For very large problems the solution of the large set of linearized equations may be a formidable task - often consuming more than half of the computing effort when performed by a direct method based upon Gauss elimination. Accordingly, it is of considerable importance to investigate alternative methods to solve the problem. The present study presents results obtained by using a Preconditioned Conjugate Gradient Method (PCG) described in (7) and a Preconditioned Lanczos Method (PLM) described in (6) to solve a variety of numerical examples. Based upon results obtained it is evident that a significant reduction in overall effort, compared to direct solutions, may be achieved using the preconditioned methods.

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Document Details

Document Type
Technical Report
Publication Date
Jun 01, 1984
Accession Number
ADA146921

Entities

People

  • B. Nour-omid
  • R. L. Taylor

Organizations

  • University of California, Berkeley

Tags

Communities of Interest

  • Air Platforms
  • Energy and Power Technologies

DTIC Thesaurus Topics

  • Civil Engineering
  • Computer Programs
  • Differential Equations
  • Engineering
  • Equations
  • Equations Of Motion
  • Finite Element Analysis
  • Iterations
  • Linear Algebraic Equations
  • Linear Systems
  • Materials
  • Mechanics
  • Numerical Analysis
  • Structural Engineering
  • Structural Mechanics
  • Three Dimensional
  • Two Dimensional

Fields of Study

  • Mathematics

Readers

  • Finite Element Method (FEM) for solving Partial Differential Equations (PDEs)
  • Linear Algebra