Thermo-mechanical contact problems on non-matching meshes

S. Hüeber, B. I. Wohlmuth

Research output: Contribution to journalArticlepeer-review

67 Scopus citations

Abstract

Non-matching meshes and domain decomposition techniques based on Lagrange multipliers provide a flexible and efficient discretization technique for variational inequalities with interface constraints. Although mortar methods are well analyzed for variational inequalities, its application to dynamic thermo-mechanical contact problems with friction is still a field of active research. In this work, we extend the mortar approach for dynamic contact problems with Coulomb friction to the thermo-mechanical case. We focus on the discretization and on algorithmic aspects of dynamic effects such as frictional heating and thermal softening at the contact interface. More precisely, we generalize the mortar concept of dual Lagrange multipliers to non-linear Robin-type interface conditions and apply local static condensation to eliminate the heat flux. Numerical examples in the two-dimensional and the three-dimensional setting illustrate the flexibility of the discretization on non-matching meshes.

Original languageEnglish
Pages (from-to)1338-1350
Number of pages13
JournalComputer Methods in Applied Mechanics and Engineering
Volume198
Issue number15-16
DOIs
StatePublished - 15 Mar 2009
Externally publishedYes

Keywords

  • Contact dynamics
  • Dual Lagrange multiplier
  • Frictional heating
  • Heat transfer
  • Linear thermo-elasticity
  • Mortar method
  • Thermo-mechanical coupling

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