@inproceedings{8e01aa35b17b487ba2105e74cab26ed6,
title = "A Scheme Using the Wave Structure of Second-Moment Turbulent Models for Incompressible Flows",
abstract = "We focus herein on the analysis of the one-dimensional Riemann problem arising from the convective subset of a second-moment turbulent non-conservative model for incompressible flows. The sketch of proof of existence and uniqueness of the solution is given, assuming a set of approximate jump conditions. Some first numerical simulations applying for the Finite Volume method are given and compared with another scheme classically used in CFD codes. This suggests to implement standard projection schemes to cope with the complete model.",
keywords = "Hyperbolic systems, Incompressible turbulent flows, Riemann problem, Second-moment turbulent closure",
author = "Martin Ferrand and H{\'e}rard, \{Jean Marc\} and Thomas Norddine and Simon Ruget",
note = "Publisher Copyright: {\textcopyright} 2023, The Author(s), under exclusive license to Springer Nature Switzerland AG.; 10th International Symposium on Finite Volumes for Complex Applications, FVCA 2023 ; Conference date: 30-10-2023 Through 03-11-2023",
year = "2023",
month = jan,
day = "1",
doi = "10.1007/978-3-031-40860-1\_12",
language = "English",
isbn = "9783031408595",
series = "Springer Proceedings in Mathematics and Statistics",
publisher = "Springer",
pages = "111--119",
editor = "Emmanuel Franck and Victor Michel-Dansac and Laurent Navoret and J{\"u}rgen Fuhrmann",
booktitle = "Finite Volumes for Complex Applications 10th—Volume 2, Hyperbolic and Related Problems - FVCA10 2023",
}