English

Improved Wall-Normal Derivative Formulae for Anisotropic Adaptive Simplex-Element Grids

Numerical Analysis 2021-01-28 v1 Numerical Analysis Computational Physics Fluid Dynamics

Abstract

In this paper, we explore methods for computing wall-normal derivatives used for calculating wall skin friction and heat transfer over a solid wall in unstructured simplex-element (triangular/tetrahedral) grids generated by anisotropic grid adaptation. Simplex-element grids are considered as efficient and suitable for automatic grid generation and adaptation, but present a challenge to accurately predict wall-normal derivatives. For example, wall-normal derivatives computed by a simple finite-difference approximation, as typically done in practical fluid-dynamics simulation codes, are often contaminated with numerical noise. To address this issue, we propose an improved method based on a common step-length for the finite-difference approximation, which is otherwise random due to grid irregularity and thus expected to smooth the wall-normal derivative distribution over a boundary. Also, we consider using least-squares gradients to compute the wall-normal derivatives and discuss their possible improvements. Numerical results show that the improved methods greatly reduce the noise in the wall-normal derivatives for irregular simplex-element grids.

Keywords

Cite

@article{arxiv.2101.11475,
  title  = {Improved Wall-Normal Derivative Formulae for Anisotropic Adaptive Simplex-Element Grids},
  author = {Hiroaki Nishikawa},
  journal= {arXiv preprint arXiv:2101.11475},
  year   = {2021}
}
R2 v1 2026-06-23T22:35:23.288Z