TY - JOUR
T1 - Improved maximum-norm a posteriori error estimates for linear and semilinear parabolic equations
AU - Kopteva, Natalia
AU - Linß, Torsten
N1 - Publisher Copyright:
© 2017, Springer Science+Business Media New York.
PY - 2017/10/1
Y1 - 2017/10/1
N2 - Linear and semilinear second-order parabolic equations are considered. For these equations, we give a posteriori error estimates in the maximum norm that improve upon recent results in the literature. In particular it is shown that logarithmic dependence on the time step size can be eliminated. Semidiscrete and fully discrete versions of the backward Euler and of the Crank-Nicolson methods are considered. For their full discretizations, we use elliptic reconstructions that are, respectively, piecewise-constant and piecewise-linear in time. Certain bounds for the Green’s function of the parabolic operator are also employed.
AB - Linear and semilinear second-order parabolic equations are considered. For these equations, we give a posteriori error estimates in the maximum norm that improve upon recent results in the literature. In particular it is shown that logarithmic dependence on the time step size can be eliminated. Semidiscrete and fully discrete versions of the backward Euler and of the Crank-Nicolson methods are considered. For their full discretizations, we use elliptic reconstructions that are, respectively, piecewise-constant and piecewise-linear in time. Certain bounds for the Green’s function of the parabolic operator are also employed.
KW - Backward Euler
KW - Crank-Nicolson
KW - Elliptic reconstructions
KW - Maximum-norm a posteriori error estimates
KW - Parabolic problems
UR - http://www.scopus.com/inward/record.url?scp=85014125713&partnerID=8YFLogxK
U2 - 10.1007/s10444-017-9514-3
DO - 10.1007/s10444-017-9514-3
M3 - Article
AN - SCOPUS:85014125713
SN - 1019-7168
VL - 43
SP - 999
EP - 1022
JO - Advances in Computational Mathematics
JF - Advances in Computational Mathematics
IS - 5
ER -