Abstract
Discrete de Rham complexes are fundamental tools in the construction of stable elements for mixed finite element methods. The purpose of this paper is to discuss a new discrete de Rham complex in three space dimensions, where the finite element spaces have some extra smoothness compared to the standard requirements. The motivation for this construction is to produce discretization which have uniform stability properties for certain families of singular perturbation problems. In particular, we will show how the spaces constructed here lead to discretizations of Stokes type systems which have uniform convergence properties as the Stokes flow approaches a Darcy flow.