Stabilized element residual method (SERM): A posteriori error estimation for the advection-diffusion equation

This paper suggests an expression of a residual-based a posteriori error estimation for a Galerkin ®nite element discretisation of the Helmholtz operator applied in acoustics. In the ®rst part, we summarise the ®nite element approach and the a priori estimates. The new residual estimator is then for

In this paper the author presents an a posteriori error estimator for approximations of the solution to an advectiondiffusion equation with a non-constant, vector-valued diffusion coefficient e in a conforming finite element space. Based on the complementary variational principle, we show that the e

## Abstract This paper presents a stabilized mixed finite element method for the first‐order form of advection–diffusion equation. The new method is based on an additive split of the flux‐field into coarse‐ and fine‐scale components that systematically lead to coarse and fine‐scale variational form