A simple sufficient condition for the quasiconvexity of elastic stored-energy functions in spaces which allow for cavitation

Abstract

In this note we formulate a sufficient condition for the quasiconvexity at x λ x of certain functionals I(u) which model the stored-energy of elastic materials subject to a deformation u. The materials we consider may cavitate, and so we impose the well-known technical condition (INV), due to M\"uller and Spector, on admissible deformations. Deformations obey the condition u(x)= λ x whenever x belongs to the boundary of the domain initially occupied by the material. In terms of the parameters of the models, our analysis provides an explicit upper bound on those λ>0 such that I(u) ≥ I(uλ) for all admissible u, where uλ is the linear map x λ x applied across the entire domain. This is the quasiconvexity condition referred to above.