Adaptive \(hp\)-finite element viscoelastic flow calculations
From MaRDI portal
Publication:1371831
DOI10.1016/0045-7825(96)01052-3zbMath0894.76042OpenAlexW2026610487MaRDI QIDQ1371831
Vincent Warichet, Vincent Legat
Publication date: 7 September 1998
Published in: Computer Methods in Applied Mechanics and Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/0045-7825(96)01052-3
Related Items
Residual a posteriori error estimator for a three-field model of a nonlinear generalized Stokes problem, Stress boundary layers in the viscoelastic flow past a cylinder in a channel: limiting solutions, A posteriori error estimates for spectral element solutions to viscoelastic flow problems, A first error indicator for micro-macro simulations of viscoelastic fluids having closed-form constitutive equations
Cites Work
- Toward a universal h-p adaptive finite element strategy. I: Constrained approximation and data structure
- Toward a universal h-p adaptive finite element strategy. II: A posteriori error estimation
- Toward a universal h-p adaptive finite element strategy. III: Design of h-p meshes
- The p- and h-p versions of the finite element method. An overview
- Spectral/finite-element calculations of the flow of a Maxwell fluid between eccentric rotating cylinders
- Impact of the constitutive equation and singularity on the calculation of stick-slip flow: The modified upper-convected Maxwell model (MUCM)
- Calculation of steady-state viscoelastic flow through axisymmetric contractions with the EEME formulation
- Spectral approximation for elliptic boundary value problems
- A posteriori error estimators for second order elliptic systems. II: An optimal order process for calculating self-equilibrating fluxes
- A posteriori error estimation for \(h-p\) approximations in elastostatics
- Preconditioned Chebyshev collocation for non-Newtonian fluid flows
- An adaptive \(hp\)-finite element method for incompressible free surface flows of generalized Newtonian fluids
- A parallel \(hp\)-adaptive discontinuous Galerkin method for hyperbolic conservation laws
- Mixed \(hp\) finite element methods for problems in elasticity and Stokes flow
- Existence of Slow Steady Flows of Viscoelastic Fluids with Differential Constitutive Equations
