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Backward Euler discretization of fully nonlinear parabolic problems

Author(s): C. González; A. Ostermann; C. Palencia; M. Thalhammer.
Journal: Math. Comp. 71 (2002), 125-145.
MSC (2000): Primary 65M12, 65M15; Secondary 35K55, 35R35, 65L06, 65L20
Posted: July 22, 2001
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Abstract:

This paper is concerned with the time discretization of nonlinear evolution equations. We work in an abstract Banach space setting of analytic semigroups that covers fully nonlinear parabolic initial-boundary value problems with smooth coefficients. We prove convergence of variable stepsize backward Euler discretizations under various smoothness assumptions on the exact solution. We further show that the geometric properties near a hyperbolic equilibrium are well captured by the discretization. A numerical example is given.

References:

1.
G. AKRIVIS, M. CROUZEIX AND C. MAKRIDAKIS, Implicit-explicit multistep methods for quasilinear parabolic equations. Numer. Math. 82 (1999), 521-541. MR 2000e:65075

2.
N. BAKAEV, On variable stepsize Runge-Kutta approximations of a Cauchy problem for the evolution equation. BIT 38 (1998), 462-485. MR 99i:65069

3.
A. BELLENI-MORANTE AND A.C. MCBRIDE, Applied Nonlinear Semigroups. An Introduction. John Wiley & Sons, Chichester, 1998. MR 99m:47083

4.
K. ERIKSSON, C. JOHNSON AND S. LARSSON, Adaptative finite element methods for parabolic problems VI: Analytic semigroups. SIAM J. Numer. Anal. 35 (1998), 1315-1325. MR 99d:65281

5.
C. GONZÁLEZ AND C. PALENCIA, Stability of Runge-Kutta methods for quasilinear parabolic problems. Math. Comp. 69 (2000), 609-628. MR 2000i:65130

6.
E. HAIRER AND M. ZENNARO, On error growth functions of Runge-Kutta methods. Appl. Numer. Math. 22 (1996), 205-216. MR 97j:65116

7.
D. HENRY, Geometric Theory of Semilinear Parabolic Equations. LNM 840, Springer, 1981. MR 83j:35084

8.
M.-N. LE ROUX, Méthodes multipas pour des équations paraboliques non linéaires. Numer. Math. 35 (1980), 143-162. MR 81i:65075

9.
CH. LUBICH AND A. OSTERMANN, Runge-Kutta methods for parabolic equations and convolution quadrature. Math. Comp. 60 (1993), 105-131. MR 93d:65082

10.
CH. LUBICH AND A. OSTERMANN, Runge-Kutta approximation of quasilinear parabolic equations. Math. Comp. 64 (1995), 601-627. MR 95g:65122

11.
CH. LUBICH AND A. OSTERMANN, Linearly implicit time discretization of non-linear parabolic equations. IMA J. Numer. Anal. 15 (1995), 555-583. MR 96g:65085

12.
A. LUNARDI, Analytic Semigroups and Optimal Regularity in Parabolic Problems. Birkhäuser, Basel, 1995. MR 96e:47039

13.
E. NAKAGUCHI AND A. YAGI, Error estimates of implicit Runge-Kutta methods for quasilinear abstract equations of parabolic type. Japan. J. Math. (N.S.) 25 (1999), 181-226. MR 2000d:65164

14.
C. PALENCIA, On the stability of variable stepsize rational approximations of holomorphic semigroups. Math. Comp. 62 (1994), 93-103. MR 94c:47066

15.
A. PAZY, Semigroups of Linear Operators and Applications to Partial Differential Equations. Springer, New York, 1983. MR 85g:47061

16.
M.E. TAYLOR, Partial Differential Equations III. Nonlinear Equations. Springer, New York, 1996. MR 98k:35001

17.
M. THALHAMMER, Runge-Kutta time discretization of nonlinear parabolic equations. Thesis, Universität Innsbruck, 2000.

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Additional Information:

C. González
Affiliation: Departamento de Matemática Aplicada y Computación, Facultad de Ciencias, Universidad de Valladolid, E-47011 Valladolid, Spain
Email: cesareo@mac.cie.uva.es

A. Ostermann
Affiliation: Institut für Technische Mathematik, Geometrie und Bauinformatik, Universität Innsbruck, Technikerstrasse 13, A-6020 Innsbruck, Austria
Address at time of publication: Section de mathématiques, Université de Genève, rue du Lièvre 2--4, CH-1211 Genève~24, Switzerland
Email: Alexander.Ostermann@uibk.ac.at, Alexander.Ostermann@math.unige.ch

C. Palencia
Affiliation: Departamento de Matemática Aplicada y Computación, Universidad de Valladolid, Facultad de Ciencias, E-47011 Valladolid, Spain
Email: palencia@mac.cie.uva.es

M. Thalhammer
Affiliation: Institut für Technische Mathematik, Geometrie und Bauinformatik, Universität Innsbruck, Technikerstrasse 13, A-6020 Innsbruck, Austria
Email: Mechthild.Thalhammer@uibk.ac.at

DOI: 10.1090/S0025-5718-01-01330-8
PII: S 0025-5718(01)01330-8
Keywords: Nonlinear parabolic problems, time discretization, backward Euler method, convergence estimates, stability bounds, asymptotic stability, hyperbolic equilibrium.
Received by editor(s): January 6, 2000
Posted: July 22, 2001
Additional Notes: The authors acknowledge financial support from Acciones Integradas Hispano-Austríacas 1998/99
Copyright of article: Copyright 2001, American Mathematical Society

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