Reducing errors caused by geometrical inaccuracy to solve partial differential equations with moving frames on curvilinear domain

Reducing errors caused by geometrical inaccuracy to solve partial differential equations with moving frames on curvilinear domain

In the numerical discretization of partial differential equations (PDEs) with moving frames on curved surfaces, the discretization error does not converge for a high p≥5. Moreover, the conservation error remains significant even in a refined mesh and does not converge as the polynomial order p incre...

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Bibliographic Details
Main Authors: Chun, S. (Author), Marcon, J. (Author), Peiró, J. (Author), Sherwin, S.J (Author)
Format: Article
Language:English
Published: Elsevier B.V. 2022
Subjects:
Conservation error
Conservation errors
Curved surface
Curved surfaces
Curvilinear domains
Curvilinear mesh
Curvilinear meshes
Discretization errors
Errors
Geometrical inaccuracies
Internal points
Mathematical operators
Mesh generation
Moving frame
Moving frames
Numerical discretization
Partial differential equation on the sphere
Partial differential equations
PDEs on the sphere
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