Skip to main content

Reduced description and modelling of small-scale turbulence by means of a tensorial turbulent viscosity

Publication ,  Conference
Cimarelli, A; Crivellini, A; Abbà, A; Germano, M
Published in: Springer Proceedings in Physics
January 1, 2019

Starting from an alternative decomposition of the subfilter stresses, we present a tensorial turbulent viscosity for a reduced description of small-scale turbulence. The formalism is based on velocity increments and, through the analysis of Direct Numerical Simulation data, is recognized to capture relevant flow features that are actually missed in scalar approaches.

Duke Scholars

Published In

Springer Proceedings in Physics

DOI

EISSN

1867-4941

ISSN

0930-8989

Publication Date

January 1, 2019

Volume

226

Start / End Page

21 / 26
 

Citation

APA
Chicago
ICMJE
MLA
NLM
Cimarelli, A., Crivellini, A., Abbà, A., & Germano, M. (2019). Reduced description and modelling of small-scale turbulence by means of a tensorial turbulent viscosity. In Springer Proceedings in Physics (Vol. 226, pp. 21–26). https://doi.org/10.1007/978-3-030-22196-6_4
Cimarelli, A., A. Crivellini, A. Abbà, and M. Germano. “Reduced description and modelling of small-scale turbulence by means of a tensorial turbulent viscosity.” In Springer Proceedings in Physics, 226:21–26, 2019. https://doi.org/10.1007/978-3-030-22196-6_4.
Cimarelli A, Crivellini A, Abbà A, Germano M. Reduced description and modelling of small-scale turbulence by means of a tensorial turbulent viscosity. In: Springer Proceedings in Physics. 2019. p. 21–6.
Cimarelli, A., et al. “Reduced description and modelling of small-scale turbulence by means of a tensorial turbulent viscosity.” Springer Proceedings in Physics, vol. 226, 2019, pp. 21–26. Scopus, doi:10.1007/978-3-030-22196-6_4.
Cimarelli A, Crivellini A, Abbà A, Germano M. Reduced description and modelling of small-scale turbulence by means of a tensorial turbulent viscosity. Springer Proceedings in Physics. 2019. p. 21–26.

Published In

Springer Proceedings in Physics

DOI

EISSN

1867-4941

ISSN

0930-8989

Publication Date

January 1, 2019

Volume

226

Start / End Page

21 / 26