ANALYSIS OF A VISCOELASTIC FRICTIONLESS CONTACT PROBLEM WITH ADHESION

First, in Section 4.1 we describe the algorithm used to solve Problem VP hk and, secondly, in Sections 4.2 and 4.3, we consider two two-dimensional test problems in order to

The complete contact law (Signorini conditions + Coulomb friction laws) is a com- plex non smooth dissipative law including three statuses (no contact, contact with sti- cking

We consider quasistatic evolution of a viscoelastic body which is in bilateral frictional contact with a rigid foundation, We derive two variational formulations for

A dynamic contact problem with adhesion and nonlocal friction is considered and its variational formulation is written as the coupling between an implicit variational inequality and

Based on Ky Fan’s fixed point theorem, an elastic contact problem with relaxed unilateral conditions and pointwise Coulomb friction in the static case was studied in [26], the

Our main contribution is a multiscale approach for solving the unconstrained convex minimization problem introduced in [AHA98], and thus to solve L 2 optimal transport.. Let us

In [2] the quasistatic contact problem with Coulomb friction was solved by an established shifting technique used to obtain increased regularity at the contact surface and by the aid

A nonlinear electro-viscoelastic constitutive law with long memory is used and the contact is modeled with a normal compliance condition and the associated Coulomb’s law of dry