On the Porosity of Free Boundaries in Degenerate Variational Inequalities

## 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

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

In this paper the numerical properties of the desingularized boundary integral formulation were studied within the framework of free surface potential problems. Several numerical experiments were carried out on simple test cases in order to investigate the effects on the accuracy of the distance bet

## Abstract In this paper we consider a resolvent problem of the Stokes operator with some boundary condition in the half space, which is obtained as a model problem arising in evolution free boundary problems for viscous, incompressible fluid flow. We show standard resolvent estimates in the __L~q