On the modeling of frictional contact problems using variational inequalities

This article is concerned with the development, implementation and application of variational inequalities to treat the general elastodynamic contact problem. The solution strategy is based upon the iterative use of two subproblems. Quadratic programming and Lagrange multipliers are used to solve th

A new variational inequality-based formulation is presented for the large deformation analysis of frictional contact in elastic shell structures. The formulations are based on a seven-parameter continuum shell model, which account for the normal stress and strain through the shell thickness and acco

This article is devoted to the formulation and solution of general frictional contact problems in elasto-plastic solids undergoing large deformations using variational inequalities. An updated Lagrangian formulation is adopted to develop the incremental variational inequality representing this class

## Abstract A scalar contact problem with friction governed by the Yukawa equation is reduced to a boundary variational inequality. The presence of the non‐differentiable friction functional causes some difficulties when approximated. We present two methods to overcome this difficulty. The first on

## Abstract Some dynamic contact problems with friction can be formulated as an implicit variational inequality. A time discretization of such an inequality is given here, thus giving rise to a so‐called incremental solution. The convergence of the incremental solution is established, and then the