Litcius/Paper detail

The Augmented Lagrangian Method as a Framework for Stabilised Methods in Computational Mechanics

Erik Burman, Peter Hansbo, Mats G. Larson

2023Archives of Computational Methods in Engineering39 citationsDOIOpen Access PDF

Abstract

Abstract In this paper we will present a review of recent advances in the application of the augmented Lagrange multiplier method as a general approach for generating multiplier-free stabilised methods. The augmented Lagrangian method consists of a standard Lagrange multiplier method augmented by a penalty term, penalising the constraint equations, and is well known as the basis for iterative algorithms for constrained optimisation problems. Its use as a stabilisation methods in computational mechanics has, however, only recently been appreciated. We first show how the method generates Galerkin/Least Squares type schemes for equality constraints and then how it can be extended to develop new stabilised methods for inequality constraints. Application to several different problems in computational mechanics is given.

Topics & Concepts

Augmented Lagrangian methodLagrange multiplierLagrangianApplied mathematicsConstraint algorithmConstraint (computer-aided design)Galerkin methodMathematicsMathematical optimizationComputational mechanicsMultiplier (economics)Computer scienceFinite element methodStructural engineeringGeometryEngineeringEconomicsMacroeconomicsAdvanced Numerical Methods in Computational MathematicsContact Mechanics and Variational InequalitiesNumerical methods in engineering