(Created blank page) |
m (TestClara moved page Draft Test 395607766 to Bonizzoni Kanschat 2022a) |
||
(3 intermediate revisions by the same user not shown) | |||
Line 1: | Line 1: | ||
+ | |||
+ | ==Summary== | ||
+ | We develop tensor product finite element cochain complexes of arbitrary smoothness on Cartesian meshes of arbitrary dimension. The first step is the construction of a onedimensional Cm-conforming finite element cochain complex based on a modified Hermite interpolation operator, which is proved to commute with the exterior derivative by means of a general commutation lemma. Adhering to a strict tensor product construction we then derive finite element complexes in higher dimensions. | ||
+ | |||
+ | == Abstract == | ||
+ | <pdf>Media:Draft_Test_395607766824_abstract.pdf</pdf> | ||
+ | |||
+ | == Full Paper == | ||
+ | <pdf>Media:Draft_Test_395607766824_paper.pdf</pdf> |
We develop tensor product finite element cochain complexes of arbitrary smoothness on Cartesian meshes of arbitrary dimension. The first step is the construction of a onedimensional Cm-conforming finite element cochain complex based on a modified Hermite interpolation operator, which is proved to commute with the exterior derivative by means of a general commutation lemma. Adhering to a strict tensor product construction we then derive finite element complexes in higher dimensions.
Published on 25/11/22
Submitted on 25/11/22
Licence: CC BY-NC-SA license
Are you one of the authors of this document?