Two dimensional mortar contact methods for large deformation frictional sliding

## Abstract We construct a novel __hp__‐mortar boundary element method for two‐body frictional contact problems for nonmatched discretizations. The contact constraints are imposed in the weak sense on the discrete set of Gauss–Lobatto points using the __hp__‐mortar projection operator. The problem

## Nitsche method Friction Active set strategy a b s t r a c t In the first part of this work, the theoretical basis of a frictional contact domain method for two-dimensional large deformation problems is presented. Most of the existing contact formulations impose the contact constraints on the bo

The paper introduces a general theory for the numerical simulation of large deformation contact problems. The contacting bodies under consideration may be of two-or three-dimensional shape modelled by ÿnite elements. A contact ÿnite element which can be applied to handle multi-body contact as well a

Two-and three-dimensional frictional contact problems are uniformly formulated as a system of nondifferentiable equations based on variational inequality theory. Through constructing a simple continuously differentiable approximation function to the non-differentiable one, the smoothing Newton metho