We present an efficient method for the numerical approximation of a general class of two dimensional semilinear parabolic problems on polygonal meshes. The proposed approach takes advantage of the properties of the serendipity version of the Virtual Element Method, which not only reduces the number of degrees of freedom compared to the original Virtual Element Method, but also allows for the introduction of an approximation of the nonlinear term that is computable from the degrees of freedom of the discrete solution with a low computational cost, thus significantly improving the efficiency of the method. An error analysis for the semi-discrete formulation is carried out, and an optimal estimate for the error in the L2-norm is obtained. The accuracy and efficiency of the proposed method when combined with a second order Strang operator splitting time discretization is illustrated in our numerical experiments, with approximations up to order 6.

Gomez, S. (2022). High-order interpolatory Serendipity Virtual Element Method for semilinear parabolic problems. CALCOLO, 59(3) [10.1007/s10092-022-00468-3].

High-order interpolatory Serendipity Virtual Element Method for semilinear parabolic problems

Sergio Gomez
Primo
2022

Abstract

We present an efficient method for the numerical approximation of a general class of two dimensional semilinear parabolic problems on polygonal meshes. The proposed approach takes advantage of the properties of the serendipity version of the Virtual Element Method, which not only reduces the number of degrees of freedom compared to the original Virtual Element Method, but also allows for the introduction of an approximation of the nonlinear term that is computable from the degrees of freedom of the discrete solution with a low computational cost, thus significantly improving the efficiency of the method. An error analysis for the semi-discrete formulation is carried out, and an optimal estimate for the error in the L2-norm is obtained. The accuracy and efficiency of the proposed method when combined with a second order Strang operator splitting time discretization is illustrated in our numerical experiments, with approximations up to order 6.
Articolo in rivista - Articolo scientifico
Interpolant operator; Operator splitting method; Semilinear parabolic equations; Serendipity Virtual Element Method;
English
14-giu-2022
2022
59
3
25
none
Gomez, S. (2022). High-order interpolatory Serendipity Virtual Element Method for semilinear parabolic problems. CALCOLO, 59(3) [10.1007/s10092-022-00468-3].
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/10281/442739
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