High order accurate conservative remapping scheme on polygonal meshes using a posteriori MOOD limiting. (10th September 2016)
- Record Type:
- Journal Article
- Title:
- High order accurate conservative remapping scheme on polygonal meshes using a posteriori MOOD limiting. (10th September 2016)
- Main Title:
- High order accurate conservative remapping scheme on polygonal meshes using a posteriori MOOD limiting
- Authors:
- Blanchard, Ghislain
Loubère, Raphaël - Abstract:
- Highlights: In this work we present a high accurate 2D conservative remapping method for general polygonal mesh. The main novelty of this works are a high accurate capability of the method to remap smooth solution (up to 6th order of accurary). an a posteriori treatment of discontinuous solutions which leads to robustness. which also permits to maintain physical properties (such as positivity). Abstract: In this article we present a high order accurate 2D conservative remapping method for a general polygonal mesh. This method conservatively projects piecewise constant data from an old mesh onto a possibly uncorrelated new one. First an arbitrary (high) accuracy polynomial reconstruction operator is built. Then, the exact intersection between the old and new mesh is constructed, leading to a submesh of old subcells paving any new cell. Last, a high order accurate quadrature rule is designed to integrate the arbitrary high order accurate polynomials on the subcells to get a final new piecewise constant cell average on any new cell. The technique is limited a posteriori in such a way that effective high accuracy is maintained on smooth solutions while an essentially non-oscillatory behavior is observed on an irregular solution. Moreover, intrinsic physical properties of the system of variables such as positivity can be ensured. Numerical results assess that such a method is effective on problems for scalar remapping (smooth and discontinuous). We have also considered theHighlights: In this work we present a high accurate 2D conservative remapping method for general polygonal mesh. The main novelty of this works are a high accurate capability of the method to remap smooth solution (up to 6th order of accurary). an a posteriori treatment of discontinuous solutions which leads to robustness. which also permits to maintain physical properties (such as positivity). Abstract: In this article we present a high order accurate 2D conservative remapping method for a general polygonal mesh. This method conservatively projects piecewise constant data from an old mesh onto a possibly uncorrelated new one. First an arbitrary (high) accuracy polynomial reconstruction operator is built. Then, the exact intersection between the old and new mesh is constructed, leading to a submesh of old subcells paving any new cell. Last, a high order accurate quadrature rule is designed to integrate the arbitrary high order accurate polynomials on the subcells to get a final new piecewise constant cell average on any new cell. The technique is limited a posteriori in such a way that effective high accuracy is maintained on smooth solutions while an essentially non-oscillatory behavior is observed on an irregular solution. Moreover, intrinsic physical properties of the system of variables such as positivity can be ensured. Numerical results assess that such a method is effective on problems for scalar remapping (smooth and discontinuous). We have also considered the remapping of multiple coupled quantities, such as mass, momentum and energy. The results confirm that this remap method is efficient in situations containing irregular/discontinuous profiles and smooth parts, for which some physical admissible constraints such as positivity must be ensured. … (more)
- Is Part Of:
- Computers & fluids. Volume 136(2016)
- Journal:
- Computers & fluids
- Issue:
- Volume 136(2016)
- Issue Display:
- Volume 136, Issue 2016 (2016)
- Year:
- 2016
- Volume:
- 136
- Issue:
- 2016
- Issue Sort Value:
- 2016-0136-2016-0000
- Page Start:
- 83
- Page End:
- 103
- Publication Date:
- 2016-09-10
- Subjects:
- Remapping -- Polynomial reconstruction -- A posteriori limiting -- High accuracy -- ALE -- Mesh intersection -- Hyperbolic conservation laws
Fluid dynamics -- Data processing -- Periodicals
532.050285 - Journal URLs:
- http://www.journals.elsevier.com/computers-and-fluids/ ↗
http://www.elsevier.com/journals ↗ - DOI:
- 10.1016/j.compfluid.2016.06.002 ↗
- Languages:
- English
- ISSNs:
- 0045-7930
- Deposit Type:
- Legaldeposit
- View Content:
- Available online (eLD content is only available in our Reading Rooms) ↗
- Physical Locations:
- British Library DSC - 3394.690000
British Library DSC - BLDSS-3PM
British Library HMNTS - ELD Digital store - Ingest File:
- 1760.xml