Elastic Stress Field beneath a Sticking Circular Contact under Tangential Load

TL;DR

This paper derives explicit, closed-form solutions for the subsurface stress field beneath a circular contact under tangential load, enabling fast analysis of frictional contact problems in elastic half-spaces.

Contribution

It provides a novel, compact complex-valued expression for the stress field under tangential loading, facilitating rapid superposition in contact mechanics analysis.

Findings

Explicit stress field expressions derived in closed form

Application to incremental series of rigid translations

Potential for fast superposition algorithms

Abstract

Based on a potential theoretical approach, the subsurface stress field is calculated for an elastic-half space, which is subject to normal and uniaxial tangential surface tractions that - in the case of elastic decoupling - correspond to rigid normal and tangential translations of a circular surface domain. The stress fields are obtained explicitly and in closed form as the imaginary parts of compact complex-valued expressions. The stress state in the surface and on the central axis are considered in detail. As, within specific approximations that have been discussed at length in the literature, any tangential contact problem with friction can be understood as a certain incremental series of such rigid translations, the solutions presented here can serve as the basis of very fast superposition algorithms for the analysis of subsurface stress fields in general tangential contact problems with friction.