Detail publikace

Construction of P1 Gradient from P0 Gradient by Averaging

Originální název

Construction of P1 Gradient from P0 Gradient by Averaging

Anglický název

Construction of P1 Gradient from P0 Gradient by Averaging

Jazyk

en

Originální abstrakt

Construction of nodal and element-wise linear (known as P1) gradient field from element-wise constant (known as P0) gradient field obtained by the P1 finite element methods on defined triangular mesh is based on works of J. Dalík et al. and it is briefly explained and numerically tested in this contribution. Nodal value of P1 gradient is computed by averaging of P0 gradients on elements sharing the node in a common patch.

Anglický abstrakt

Construction of nodal and element-wise linear (known as P1) gradient field from element-wise constant (known as P0) gradient field obtained by the P1 finite element methods on defined triangular mesh is based on works of J. Dalík et al. and it is briefly explained and numerically tested in this contribution. Nodal value of P1 gradient is computed by averaging of P0 gradients on elements sharing the node in a common patch.

BibTex


@inproceedings{BUT111568,
  author="Jiří {Kunovský} and Václav {Šátek} and Jan {Valdman} and Václav {Valenta}",
  title="Construction of P1 Gradient from P0 Gradient by Averaging",
  annote="Construction of nodal and element-wise linear (known as P1) gradient field from
element-wise constant (known as P0) gradient field obtained by the P1 finite
element methods on defined triangular mesh is based on works of J. Dalík et al.
and it is briefly explained and numerically tested in this contribution. Nodal
value of P1 gradient is computed by averaging of P0 gradients on elements sharing
the node in a common patch.",
  address="American Institute of Physics",
  booktitle="12th International Conference of Numerical Analysis and Applied Mathematics",
  chapter="111568",
  doi="10.1063/1.4913135",
  edition="NEUVEDEN",
  howpublished="print",
  institution="American Institute of Physics",
  number="1648",
  year="2015",
  month="may",
  pages="1--4",
  publisher="American Institute of Physics",
  type="conference paper"
}