Mixed stabilized finite element methods in nonlinear solid mechanics

“…As a remark we observe that as shown in previous works [7,8,15], where the static case was explored, the explicit mixed formulation is always (independently on the τ ε ) more accurate than the irreducible formulation on a given mesh.…”

“…For simplicity, in the case of constant meshes it is customary to take a constant value of the stabilization parameter [8] [15]. In this work typical values, in the range 0.1-0.5, were considered in all the examples.…”

“…The idea is to combine different primary variables, in our case displacements and strains, following the concept described in [7]. This approach was proved to show better mesh independence properties while providing the formal guarantee of a strain field converging at the same rate as the displacement one, which manifests in enhanced stress/analysis accuracy in both linear and non-linear analyses [8]. Following the ideas in [9,10,11,12,13,14], a stabilization technique is needed to allow the use of the same order of interpolation for the two primary variables of interest.…”

Explicit mixed strain-displacement finite element for dynamic geometrically non-linear solid mechanics

“…As a remark we observe that as shown in previous works [7,8,15], where the static case was explored, the explicit mixed formulation is always (independently on the τ ε ) more accurate than the irreducible formulation on a given mesh.…”

“…For simplicity, in the case of constant meshes it is customary to take a constant value of the stabilization parameter [8] [15]. In this work typical values, in the range 0.1-0.5, were considered in all the examples.…”

“…The idea is to combine different primary variables, in our case displacements and strains, following the concept described in [7]. This approach was proved to show better mesh independence properties while providing the formal guarantee of a strain field converging at the same rate as the displacement one, which manifests in enhanced stress/analysis accuracy in both linear and non-linear analyses [8]. Following the ideas in [9,10,11,12,13,14], a stabilization technique is needed to allow the use of the same order of interpolation for the two primary variables of interest.…”

Explicit mixed strain-displacement finite element for dynamic geometrically non-linear solid mechanics

“…Some technical details may be omitted by considering that the subscale enhancements behave as bubble functions, vanishing on the elements boundaries. They can be viewed as a "high frequency" perturbation of the finite element field, which cannot be resolved in V h [12,21].…”

“…In these works, deviatoric strains are calculated by differentiation of the displacement field; hence, the rate of convergence for the angular distortions is the same as in the irreducible formulation. More recently, Cervera et al [12,13,14] introduced a mixed ε− u strain/ displacement FE formulation and have applied it to address problems of strain localization using compressible and incompressible plasticity models [2,10]. The objective of such formulation is to achieve a discrete scheme with enhanced stress accuracy.…”

Explicit mixed strain–displacement finite elements for compressible and quasi-incompressible elasticity and plasticity

Finite Element Approach to the Sintering Process at the Grain Scale