Study of variational inequality and equality formulations for elastostatic frictional contact problems
DOI10.1007/BF02736213zbMath1031.74002OpenAlexW2012930841WikidataQ113327858 ScholiaQ113327858MaRDI QIDQ5933951
Jasbir S. Arora, Anand R. Mijar
Publication date: 21 August 2001
Published in: Archives of Computational Methods in Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1007/bf02736213
frictional contactvariational inequalityfrictionless contactCoulomb's friction lawfinite element program ANSYSiterative Newton-Raphson schemeKarush-Kuhn-Tucker optimality conditionspenalty approachvariational equality
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- A theory of friction
- A perturbed Lagrangian formulation for the finite element solution of contact problems
- Sliding interfaces with contact-impact in large-scale Lagrangian computations
- A mixed formulation for frictional contact problems prone to Newton like solution methods
- Multibody elastic contact analysis by quadratic programming
- A finite element method for a class of contact-impact problems
- On the numerical modeling of frictional wear phenomena
- Multiplier and gradient methods
- A solution method for planar and axisymmetric contact problems
- Frictionless geometrically non‐linear contact using quadratic programming
- Numerical analysis of certain contact problems in elasticity with non-classical friction laws
- On the rigid body displacements and rotations in unilateral contact problems and applications
- An augmented lagrangian treatment of contact problems involving friction
- A general finite element approach for contact stress analysis
- Multiplier methods for engineering optimization
- The return mapping method for the integration of friction constitutive relations
- Application of augmented Lagrangian techniques for non‐linear constitutive laws in contact interfaces
- A continuum‐based finite element formulation for the implicit solution of multibody, large deformation‐frictional contact problems
- An augmented Lagrangian method for discrete large‐slip contact problems
- A dual approach to solving nonlinear programming problems by unconstrained optimization
- On augmented Lagrangian algorithms for thermomechanical contact problems with friction
- Study of variational inequality and equality formulations for elastostatic frictional contact problems
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