论文信息 - Analysis of some moving space-time finite element methods

Analysis of some moving space-time finite element methods

Two space-time finite element methods for solving time-dependent partial differential equations are defined and analyzed. The methods are based on the use of isoparametric finite elements to implicitly define the time discretization on a moving mesh in the space dimensions. One method allows for adding and deleting knots in a continuous fashion, while the other allows for discontinuous changes in the mesh (static rezone). A detailed convergence analysis for a model parabolic equation, with a possibly large convection term is presented. Here the authors obtain symmetric best approximation error estimates similar to those obtained by Dupont [Math. Comp., 39 (1982), pp. 85–107] for the semidiscrete case.

R. Bank | R. Santos

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