A boundary integral approach to potential and elasticity problems for axisymmetric bodies with arbitrary boundary conditions

This paper considers a boundary integral approach to Stefan problems that have multiple phase changes and satisfy the Laplace equation in each phase. It is shown that, by introducing artificial phase changes, the effects of moderate diffusivity can be incorporated. The paper includes the results fro

## Abstract We study a non‐linear problem in pressure saturation modelling of a free boundary problem, arising in self‐lubricating bearings, with Neumann boundary conditions for the pressure and a non‐local constraint on the saturation variable, which indeed is a Lagrange multiplier. We prove an ex

## Abstract We investigate unilateral contact problems for micropolar hemitropic elastic solids. Our study includes Tresca friction (given friction model) along some parts of the boundary of the body. We equivalently reduce these problems to boundary variational inequalities with the help of the St

This work presents a novel boundary integral method to treat the two-dimensional potential ¯ow due to a moving body with the Lyapunov surface. The singular integral equations are derived in singularity-free form by applying the Gauss ¯ux theorem and the property of the equipotential body. The modi®e