High order shock-capturing TENO (targeted ENO) schemes
Maybe have a try of TENO (targeted ENO) schemes for your CFD solver.The details can be found in:
https://www.researchgate.net/project/High-order-TENO-scheme-Targeted-ENO-for-Hyperbolic-Conservation-Laws
The reference source code of the fifth-order TENO schemes.
Comparisons of high-order TENO schemes
Fundmental differences between WENO and TENO scheme
References of high-order TENO schemes by Dr. Lin Fu 傅林
TENO schemes for implicit LES (ILES Lin Fu 傅林)
MHD flow simulations with high-order TENO schemes, Lin Fu 傅林 Thanks to the collaborative work of Haibo Dong, Fan Zhang and et al., we have extended the high-order TENO schemes to very complex detonation simulations, e.g. the two-dimensional detonation with TENO scheme.
Comparisons between WENO and TENO schemes,
https://www.researchgate.net/publication/325967352_Detonation_simulations_with_a_fifth-order_TENO_scheme
The latest version TENO8-A scheme for large eddy simulations:
A targeted ENO scheme as implicit model for turbulent and genuine subgrid scales
https://www.researchgate.net/publication/326188637_A_targeted_ENO_scheme_as_implicit_model_for_turbulent_and_genuine_subgrid_scales My latest high-order TENO scheme for hyperbolic conservation laws is online
https://www.researchgate.net/publication/326551500_A_new_class_of_adaptive_high-order_targeted_ENO_schemes_for_hyperbolic_conservation_laws
https://www.sciencedirect.com/science/article/pii/S0021999118305047#! Thanks to the work of Prof. N.D. Sandham's group, the standard TENO5 and TENO6 scheme are employed to simulate transitional shock-boundary-laryer interaction. The performance of TENO schemes is verified.
http://www.iccfd.org/iccfd10/papers/ICCFD10-088-Paper.pdf
Thanks to the work of Dr. Ory Haimovich, the TENO scheme is extended for 3D multi-phase simulation
http://www.delegia.com/app/data/8684/Abstract/28285/ETC16_Haimovich.pdf
The latest references of TENO schemes from Lin Fu
Thanks for sharing the information.
What is your opinion on the scheme by Colella and Woodward (Piecewise Parabolic Method), for P. Colella is also at UC Berkeley.