In the original virtual element space with degree of accuracy kk, projector operators in the H1H1-seminorm onto polynomials of degree <=k<=k can be easily computed. On the other hand, projections in the L2L2 norm are available only on polynomials of degree <=k-2<=k-2 (directly from the degrees of freedom). Here, we present a variant of the virtual element method that allows the exact computations of the L2L2 projections on all polynomials of degree <=k<=k. The interest of this construction is illustrated with some simple examples, including the construction of three-dimensional virtual elements, the treatment of lower-order terms, the treatment of the right-hand side, and the L2L2 error estimates.
Equivalent projectors for virtual element methods
F Brezzi;LD Marini;A Russo
2013
Abstract
In the original virtual element space with degree of accuracy kk, projector operators in the H1H1-seminorm onto polynomials of degree <=k<=k can be easily computed. On the other hand, projections in the L2L2 norm are available only on polynomials of degree <=k-2<=k-2 (directly from the degrees of freedom). Here, we present a variant of the virtual element method that allows the exact computations of the L2L2 projections on all polynomials of degree <=k<=k. The interest of this construction is illustrated with some simple examples, including the construction of three-dimensional virtual elements, the treatment of lower-order terms, the treatment of the right-hand side, and the L2L2 error estimates.| File | Dimensione | Formato | |
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