Some inverse problems for a viscoelastic medium with a physically non-linear inclusion

A plane finite elastic domain containing a physically non-linear inclusion is considered. The problem of determining the loads acting on the outer botmdary of the domain that produce a given uniform stress-strain state in the inclusion is formulated and solved.

A three-dimensional linearly elastic (viscoelastic) domain (finite or infinite) containing a physically non-linear inclusion of arbitrary shape is considered. The possibility of creating a prescribed uniform stress-strain state in the inclusion by a suitable choice of loads on the outer boundary of

An isotropic elastic plane is considered which contains different elliptic inclusions remote from one another and which exhibit the properties of non-linear creep. The corresponding constitutive equations contain a damage parameter which varies from zero (in the undeformed state) to unity (at the in