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RESEARCH PRODUCT
New degrees of freedom for differential forms on cubical meshes
Jonni Lohisubject
degrees of freedomFOS: Mathematicscochainsdifferential formsMathematics - Numerical AnalysisNumerical Analysis (math.NA)differentiaalilaskentacubical meshdiscrete exterior calculusdescription
We consider new degrees of freedom for higher order differential forms on cubical meshes. The approach is inspired by the idea of Rapetti and Bossavit to define higher order Whitney forms and their degrees of freedom using small simplices. We show that higher order differential forms on cubical meshes can be defined analogously using small cubes and prove that these small cubes yield unisolvent degrees of freedom. Significantly, this approach is compatible with discrete exterior calculus and expands the framework to cover higher order methods on cubical meshes, complementing the earlier strategy based on simplices.
year | journal | country | edition | language |
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2022-09-05 |