Galerkin-Type Approximations which are Discontinuous in Time for Parabolic Equations in a Variable Domain

Galerkin-Type Approximations which are Discontinuous in Time for Parabolic Equations in a Variable Domain

We consider general linear parabolic equations in a given time dependent domain and we describe a general class of Galerkin-type approximations which are continuous with respect to the space variables, but which admit discontinuities with respect to time at each step. Unconditional stability is prov...

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Bibliographic Details
Published in:SIAM journal on numerical analysis Vol. 15; no. 5; pp. 912 - 928
Main Author: Jamet, Pierre
Format: Journal Article
Language:English
Published: Philadelphia Society for Industrial and Applied Mathematics 01-10-1978
Subjects:
Approximation
Discrete problems
Finite element method
Integers
Interpolation
Mathematical discontinuity
Methods
Numerical analysis
Numerical methods
Partial differential equations
Spacetime
Uniqueness
Variables
Vertices
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Summary:We consider general linear parabolic equations in a given time dependent domain and we describe a general class of Galerkin-type approximations which are continuous with respect to the space variables, but which admit discontinuities with respect to time at each step. Unconditional stability is proved and a general error estimate is established. These results are applied to certain finite element methods based on space-time finite elements.
ISSN:0036-1429
1095-7170
DOI:10.1137/0715059