A posteriori error bounds for classical and mixed FEM's for 4th-order elliptic equations with piece wise constant reaction coefficient having large jumps

Результат исследований: Научные публикации в периодических изданияхстатья в журнале по материалам конференциирецензирование

Аннотация

We present guaranteed, robust and computable a posteriori error bounds for approximate solutions of the equation ∆∆u + κ2u = f by classical and mixed Ciarlet-Raviart finite element methods. We concentrate on the case when the reaction coefficient κ2 is subdomain (finite element) wise constant and chaotically varies between subdomains in the sufficiently wide range. It is proved that the bounds for the classical FEM's are robust with respect to κ ∈ [0, ch2], where c = const and h is the maximal size of finite elements, and possess additional useful features. The coefficients in fronts of two typical norms in their right parts only insignificantly worse than those for κ ≡ const, and the bounds can be calculated without resorting to the equilibration procedures. Besides, they are sharp at least for low order methods, if the testing moments and deflection in their right parts are found by accurate recovery procedures. The technique of derivation of the bounds is based on the approach similar to one used in our preceding papers for simpler problems.

Язык оригиналаанглийский
Номер статьи012030
ЖурналJournal of Physics: Conference Series
Том1715
Номер выпуска1
DOI
СостояниеОпубликовано - 4 янв 2021
СобытиеInternational Conference on Marchuk Scientific Readings 2020, MSR 2020 - Akademgorodok, Novosibirsk, Российская Федерация
Продолжительность: 19 окт 202023 окт 2020

Предметные области Scopus

  • Физика и астрономия (все)

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