Local discontinuous Galerkin method for diffusion equations with reduced stabilization

We extend the results on minimal stabilization of Burman and Stamm[J. Sci. Comp., 33 (2007), pp. 183-208] to the case of the local discontinuous Galerkin methods on mixed form. The penalization term on the faces is relaxed to act only on a part of the polynomial spectrum. Stability in the form of a discrete inf-sup condition is proved and optimal convergence follows. Some numerical examples using high order approximation spaces illustrate the theory.

Local discontinuous Galerkin method for diffusion equations with reduced stabilization

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A cut-cell method for the numerical simulation of 3D multiphase flows with strong interfacial effects

From low-rank retractions to dynamical low-rank approximation and back

Adaptive Finite Elements with Large Aspect Ratio. Application to Aluminium Electrolysis

A cut-cell method for the numerical simulation of 3D multiphase flows with strong interfacial effects

From low-rank retractions to dynamical low-rank approximation and back

Adaptive Finite Elements with Large Aspect Ratio. Application to Aluminium Electrolysis