论文信息 - Non‐unique slipping in the coulomb friction model in two‐dimensional linear elasticity

Non‐unique slipping in the coulomb friction model in two‐dimensional linear elasticity

This work is concerned with the Coulomb friction model in continuum linear elastostatics. We consider the two-dimensional problem and we recall that an infinity of solutions corresponding to slip may exist when the friction coefficient (or its opposite value) is an eigenvalue of a specific problem. We show that such coefficients exist and we determine them explicitly for a simple class of problems. Finally, we exhibit cases in which the static friction problem admits an infinity of solutions slipping in the same direction.

Patrick Hild | P. Hild

[1] Jaroslav Haslinger,et al. Approximation of the signorini problem with friction, obeying the coulomb law , 1983 .

[2] James Barber,et al. Stability of the three‐dimensional Coulomb friction law , 1999, Proceedings of the Royal Society of London. Series A: Mathematical, Physical and Engineering Sciences.

[3] Patrick Hild,et al. Multiple solutions of stick and separation type in the Signorini model with Coulomb friction , 2005 .

[4] J. Jarusek. Contact problems with bounded friction. Coercive case , 1983 .

[5] A. Klarbring. Examples of non-uniqueness and non-existence of solutions to quasistatic contact problems with friction , 1990, Ingenieur-Archiv.

[6] Patrick Hild. ON FINITE ELEMENT UNIQUENESS STUDIES FOR COULOMB'S FRICTIONAL CONTACT MODEL , 2002 .

[7] J. Jarusek,et al. EXISTENCE RESULTS FOR THE STATIC CONTACT PROBLEM WITH COULOMB FRICTION , 1998 .