TY - JOUR
T1 - A posteriori error control and adaptivity for Crank–Nicolson finite element approximations for the linear Schrödinger equation
AU - Katsaounis, Theodoros
AU - Kyza, Irene
N1 - Publisher Copyright:
© 2014, Springer-Verlag Berlin Heidelberg.
PY - 2014/1
Y1 - 2014/1
N2 - We derive optimal order a posteriori error estimates for fully discrete approximations of linear Schrödinger-type equations, in the L∞ (L2)-norm. For the discretization in time we use the Crank–Nicolson method, while for the space discretization we use finite element spaces that are allowed to change in time. The derivation of the estimators is based on a novel elliptic reconstruction that leads to estimates which reflect the physical properties of Schrödinger equations. The final estimates are obtained using energy techniques and residual-type estimators. Various numerical experiments for the one-dimensional linear Schrödinger equation in the semiclassical regime, verify and complement our theoretical results. The numerical implementations are performed with both uniform partitions and adaptivity in time and space. For adaptivity, we further develop and analyze an existing time-space adaptive algorithm to the cases of Schrödinger equations. The adaptive algorithm reduces the computational cost substantially and provides efficient error control for the solution and the observables of the problem, especially for small values of the Planck constant.
AB - We derive optimal order a posteriori error estimates for fully discrete approximations of linear Schrödinger-type equations, in the L∞ (L2)-norm. For the discretization in time we use the Crank–Nicolson method, while for the space discretization we use finite element spaces that are allowed to change in time. The derivation of the estimators is based on a novel elliptic reconstruction that leads to estimates which reflect the physical properties of Schrödinger equations. The final estimates are obtained using energy techniques and residual-type estimators. Various numerical experiments for the one-dimensional linear Schrödinger equation in the semiclassical regime, verify and complement our theoretical results. The numerical implementations are performed with both uniform partitions and adaptivity in time and space. For adaptivity, we further develop and analyze an existing time-space adaptive algorithm to the cases of Schrödinger equations. The adaptive algorithm reduces the computational cost substantially and provides efficient error control for the solution and the observables of the problem, especially for small values of the Planck constant.
KW - 35Q41
KW - 65M15
KW - 65M60
UR - http://www.scopus.com/inward/record.url?scp=84939880692&partnerID=8YFLogxK
U2 - 10.1007/s00211-014-0634-0
DO - 10.1007/s00211-014-0634-0
M3 - Article
AN - SCOPUS:84939880692
SN - 0029-599X
VL - 129
SP - 55
EP - 90
JO - Numerische Mathematik
JF - Numerische Mathematik
IS - 1
ER -