An application of symmetry groups to nonlocal continuum mechanics

Teoman Özer*

*Corresponding author for this work

Research output: Contribution to journalArticlepeer-review

15 Citations (Scopus)

Abstract

In this study the symmetry group properties of the one-dimensional elastodynamics problem in nonlocal continuum mechanics is discussed by using an approach developed for symmetry group analysis of integro-differential equations with general form. This approach is based on the modification of the invariance criterion of the differential equations, which include nonlocal variables and integro-differential operators. Lie point symmetries of the nonlocal elasticity equation are obtained based on solving nonlocal determining equations by using a new approach. The symmetry groups for different types of kernel function and the free term including the classical linear elasticity case are presented.

Original languageEnglish
Pages (from-to)1923-1942
Number of pages20
JournalComputers and Mathematics with Applications
Volume55
Issue number9
DOIs
Publication statusPublished - May 2008

Keywords

  • Classification
  • Integro-differential equations
  • Lie symmetry groups
  • Nonlocal continuum mechanics
  • Point symmetries

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