Finite Element Solution of the Helmholtz Equation with High Wave Number Part II: The h-p Version of the FEM

## Abstract The paper is the second in the series addressing the __h‐p__ version of the finite element method for parabolic equations. The present paper addresses the case when in both variables, the spatial and time, the __h‐p__ version is used. Error estimation is given and numerical computations

## Goal oriented adaptivity Global/local estimates a b s t r a c t The standard approach for goal oriented error estimation and adaptivity uses an error representation via an adjoint problem, based on the linear functional output representing the quantity of interest. For the assessment of the err

The paper is the first in the series addressing the h-p version of the finite element method for parabolic equations. The h-p version is applied to both time and space variables. The present paper addresses the case when in time the p-version with one single time element is used. Error estimation is

In part I of this investigation, we proved that the standard a posteriori estimates, based only on local computations, may severely underestimate the exact error for the classes of wave-numbers and the types of meshes employed in engineering analyses. We showed that this is due to the fact that the