Stable hp mixed finite elements based on the
Hellinger-Reissner principle
Manil Suri
In the Hellinger-Reissner formulation for linear elasticity, both
the displacement u and the stress sigma are taken as unknowns, giving
rise to a saddle point problem. We present new pairings of quadrilateral
`trunk' finite element spaces for this method and prove stability (and
optimality) in terms of both h and p. The effect of mesh shape
regularity on the stability constant is explicitly tracked. Our results
provide a theoretical basis for recent numerical experiments (in the
context of a mixed p formulation for viscoelasticity) that showed
these spaces worked well computationally.