Author:
Bertoluzza Silvia,Pennacchio Micol,Prada Daniele
Abstract
AbstractWe analyze the local accuracy of the virtual element method. More precisely, we prove an error bound similar to the one holding for the finite element method, namely, that the local $$H^1$$
H
1
error in a interior subdomain is bounded by a term behaving like the best approximation allowed by the local smoothness of the solution in a larger interior subdomain plus the global error measured in a negative norm.
Funder
Consiglio Nazionale Delle Ricerche
Publisher
Springer Science and Business Media LLC