TY - JOUR
T1 - Optimal a priori error estimates for an elliptic problem with dirac right-hand side
AU - Köppl, T.
AU - Wohlmuth, B.
N1 - Publisher Copyright:
© 2014 Society for Industrial and Applied Mathematics.
PY - 2014
Y1 - 2014
N2 - It is well known that finite element solutions for elliptic PDEs with Dirac measures as source terms converge, due to the fact that the solution is not in H1, suboptimal in classical norms. A standard remedy is to use graded meshes, then quasioptimality, i.e., optimal up to a log-factor, for low order finite elements can be recovered, e.g., in the L2-norm. Here we show for the lowest order case quasioptimality and for higher order finite elements optimal order a priori estimates on a family of quasi-uniform meshes in an L2-seminorm. The seminorm is defined as an L2-norm on a fixed subdomain which excludes the locations of the delta source terms. Our motivation in the use of such a norm results from the observation that in many applications the error at the singularity is dominated by the model error, e.g., in dimension reduced settings or is not the quantity of interest, e.g., in optimal control problems. The quasi-optimal and optimal order a priori bounds are obtained recursively by using Aubin-Nitsche techniques, localWahlbin-type error estimates, interior regularity results, and weighted Sobolev norms. For the proof of these results no graded meshes are required, it is sufficient to work on a family of quasi-uniform meshes. Numerical tests in two and three space dimensions confirm our theoretical results.
AB - It is well known that finite element solutions for elliptic PDEs with Dirac measures as source terms converge, due to the fact that the solution is not in H1, suboptimal in classical norms. A standard remedy is to use graded meshes, then quasioptimality, i.e., optimal up to a log-factor, for low order finite elements can be recovered, e.g., in the L2-norm. Here we show for the lowest order case quasioptimality and for higher order finite elements optimal order a priori estimates on a family of quasi-uniform meshes in an L2-seminorm. The seminorm is defined as an L2-norm on a fixed subdomain which excludes the locations of the delta source terms. Our motivation in the use of such a norm results from the observation that in many applications the error at the singularity is dominated by the model error, e.g., in dimension reduced settings or is not the quantity of interest, e.g., in optimal control problems. The quasi-optimal and optimal order a priori bounds are obtained recursively by using Aubin-Nitsche techniques, localWahlbin-type error estimates, interior regularity results, and weighted Sobolev norms. For the proof of these results no graded meshes are required, it is sufficient to work on a family of quasi-uniform meshes. Numerical tests in two and three space dimensions confirm our theoretical results.
KW - A priori estimates
KW - Dirac measure
KW - Dual problem
KW - Elliptic problems
KW - Finite element approximations
UR - http://www.scopus.com/inward/record.url?scp=84907031450&partnerID=8YFLogxK
U2 - 10.1137/130927619
DO - 10.1137/130927619
M3 - Article
AN - SCOPUS:84907031450
SN - 0036-1429
VL - 52
SP - 1753
EP - 1769
JO - SIAM Journal on Numerical Analysis
JF - SIAM Journal on Numerical Analysis
IS - 4
ER -