In recent years several papers have been devoted to stability and smoothing properties in maximum-norm of finite element discretizations of parabolic problems. Using the theory of analytic semigroups it has been possible to rephrase such properties as bounds for the resolvent of the associated discrete elliptic operator. In all these cases the triangulations of the spatial domain has been assumed to be quasiuniform. In the present paper we show a resolvent estimate, in one and two space dimensions, under weaker conditions on the triangulations than quasiuniformity. In the two-dimensional case, the bound for the resolvent contains a logarithmic factor.
@article{M2AN_2006__40_5_923_0,
author = {Bakaev, Nikolai Yu. and Crouzeix, Michel and Thom\'ee, Vidar},
title = {Maximum-norm resolvent estimates for elliptic finite element operators on nonquasiuniform triangulations},
journal = {ESAIM: Mathematical Modelling and Numerical Analysis - Mod\'elisation Math\'ematique et Analyse Num\'erique},
volume = {40},
year = {2006},
pages = {923-937},
doi = {10.1051/m2an:2006040},
mrnumber = {2293252},
zbl = {1116.65108},
language = {en},
url = {http://dml.mathdoc.fr/item/M2AN_2006__40_5_923_0}
}
Bakaev, Nikolai Yu.; Crouzeix, Michel; Thomée, Vidar. Maximum-norm resolvent estimates for elliptic finite element operators on nonquasiuniform triangulations. ESAIM: Mathematical Modelling and Numerical Analysis - Modélisation Mathématique et Analyse Numérique, Tome 40 (2006) pp. 923-937. doi : 10.1051/m2an:2006040. http://gdmltest.u-ga.fr/item/M2AN_2006__40_5_923_0/
[1] , Maximum norm resolvent estimates for elliptic finite element operators. BIT 41 (2001) 215-239. | Zbl 0979.65097
[2] , and, Long-time behavior of backward difference type methods for parabolic equations with memory in Banach space. East-West J. Numer. Math. 6 (1998) 185-206. | Zbl 0913.65139
[3] , and, Maximum-norm estimates for resolvents of elliptic finite element operators. Math. Comp. 72 (2002) 1597-1610. | Zbl 1028.65113
[4] ,, and, Parabolic finite element equations in nonconvex polygonal domains. BIT (to appear). | MR 2283311 | Zbl 1108.65097
[5] and, The stability in and of the -projection onto finite element function spaces. Math. Comp. 48 (1987) 521-532. | Zbl 0637.41034
[6] and, Resolvent estimates in for discrete Laplacians on irregular meshes and maximum-norm stability of parabolic finite difference schemes. Comput. Meth. Appl. Math. 1 (2001) 3-17. | Zbl 0987.65093
[7] , and, Resolvent estimates for elliptic finite element operators in one dimension. Math. Comp. 63 (1994) 121-140. | Zbl 0806.65096
[8] , Gaussian estimates and holomorphy of semigroups. Proc. Amer. Math. Soc. 123 (1995) 1465-1474. | Zbl 0829.47032
[9] , and, Maximum norm stability and error estimates in parabolic finite element equations. Comm. Pure Appl. Math. 33 (1980) 265-304. | Zbl 0414.65066
[10] , and, Stability, analyticity, and almost best approximation in maximum-norm for parabolic finite element equations. Comm. Pure Appl. Math. 51 (1998) 1349-1385. | Zbl 0932.65103
[11] , Generation of analytic semigroups by strongly elliptic operators. Trans. Amer. Math. Soc. 199 (1974) 141-161. | Zbl 0264.35043
[12] , Galerkin Finite Element Methods for Parabolic Problems. Springer-Verlag, New York (1997). | MR 1479170 | Zbl 0884.65097
[13] and, Maximum-norm stability and error estimates in Galerkin methods for parabolic equations in one space variable. Numer. Math. 41 (1983) 345-371. | Zbl 0515.65082