Lubricated friction between incommensurate substrates

TL;DR

This study investigates how incommensurate substrate interactions affect frictional behavior in a one-dimensional lubricant model, revealing that non-quadratic irrational incommensurabilities can minimize friction.

Contribution

It demonstrates that in a 1D lubricant model, non-quadratic irrational incommensurabilities lead to lower friction than quadratic ones, contrasting with the standard FK model.

Findings

Non-quadratic irrational incommensurabilities yield minimal friction.

Golden mean incommensurability results in higher friction.

Frictional behavior depends on the lattice pinning properties.

Abstract

This paper is part of a study of the frictional dynamics of a confined solid lubricant film - modelled as a one-dimensional chain of interacting particles confined between two ideally incommensurate substrates, one of which is driven relative to the other through an attached spring moving at constant velocity. This model system is characterized by three inherent length scales; depending on the precise choice of incommensurability among them it displays a strikingly different tribological behavior. Contrary to two length-scale systems such as the standard Frenkel-Kontorova (FK) model, for large chain stiffness one finds that here the most favorable (lowest friction) sliding regime is achieved by chain-substrate incommensurabilities belonging to the class of non-quadratic irrational numbers (e.g., the spiral mean). The well-known golden mean (quadratic) incommensurability which slides best in the standard FK model shows instead higher kinetic-friction values. The underlying reason lies in the pinning properties of the lattice of solitons formed by the chain with the substrate having the closest periodicity, with the other slider.