Mathematical justification of a viscoelastic generalized membrane problem

Abstract

We consider a family of linearly viscoelastic shells with thickness 2, clamped along a portion of their lateral face, all having the same middle surface S=θ(ω)⊂ R3, where ω⊂R2 is a bounded and connected open set with a Lipschitz-continuous boundary γ. We show that, if the applied body force density is O(1) with respect to and surface tractions density is O(), the solution of the scaled variational problem in curvilinear coordinates, defined over the fixed domain =ω×(-1,1), converges in ad hoc functional spaces as 0 to a limit u. Furthermore, the average u()= 12∫-11u () dx3, converges in an ad hoc space to the unique solution of what we have identified as (scaled) two-dimensional equations of a viscoelastic generalized membrane shell, which includes a long-term memory that takes into account previous deformations. We finally provide convergence results which justify those equations.