English

The contact mechanics challenge: Problem definition

Soft Condensed Matter 2015-12-09 v1

Abstract

We present a contact mechanics problem, which we consider to be representative for contacts between nominally flat surfaces. The main ingredients of the mathematically fully defined contact problem are: Self-affine roughness, linear elasticity, the small-slope approximation, and short-range adhesion between the frictionless surfaces. Surface energies, elastic contact modulus and computer-generated surface topographies are provided at www.lms.uni-saarland.de/contact-mechanics-challenge. To minimize the undesirable but frequent problem of unit conversion errors, we provide some benchmark results, such as the relative contact area as a function of load ar(L)a_{\rm r}(L) between 0.1%0.1\% and 15%15\% relative contact. We call theorists and numericists alike to predict quantities that contain more information than ar(L)a_{\rm r}(L) and provide information on how to submit predictions. Examples for quantities of interest are the mean gap or contact stiffness as a function of load as well as distributions of contact patch size, interfacial stress, and interfacial separation at a reference load. Numerically accurate reference results will be disseminated in subsequent work including an evaluation of the submitted results.

Keywords

Cite

@article{arxiv.1512.02403,
  title  = {The contact mechanics challenge: Problem definition},
  author = {Martin H. Müser and Wolf B. Dapp},
  journal= {arXiv preprint arXiv:1512.02403},
  year   = {2015}
}

Comments

5 pages, 4 figures, see http://www.lms.uni-saarland.de/contact-mechanics-challenge for details

R2 v1 2026-06-22T12:04:03.184Z