Naturally curved quadrilateral mesh generation using an adaptive spectral element solver
Abstract
We describe an adaptive version of a method for generating valid naturally curved quadrilateral meshes. The method uses a guiding field, derived from the concept of a cross field, to create block decompositions of multiply connected two dimensional domains. The a priori curved quadrilateral blocks can be further split into a finer high-order mesh as needed. The guiding field is computed by a Laplace equation solver using a continuous Galerkin or discontinuous Galerkin spectral element formulation. This operation is aided by using -adaptation to achieve faster convergence of the solution with respect to the computational cost. From the guiding field, irregular nodes and separatrices can be accurately located. A first version of the code is implemented in the open source spectral element framework Nektar++ and its dedicated high order mesh generation platform NekMesh.
Cite
@article{arxiv.1908.04272,
title = {Naturally curved quadrilateral mesh generation using an adaptive spectral element solver},
author = {Julian Marcon and David A. Kopriva and Spencer J. Sherwin and Joaquim Peiró},
journal= {arXiv preprint arXiv:1908.04272},
year = {2020}
}
Comments
13 pages, 14 figures, accepted for publication in the Proceedings of 28th International Meshing Roundtable