1887
banner image
No data available.
Please log in to see this content.
You have no subscription access to this content.
No metrics data to plot.
The attempt to load metrics for this article has failed.
The attempt to plot a graph for these metrics has failed.
f
Energy dissipation rate and energy spectrum in high resolution direct numerical simulations of turbulence in a periodic box
Rent:
Rent this article for
Access full text Article
/content/aip/journal/pof2/15/2/10.1063/1.1539855
1.
1.K. R. Sreenivasan, “On the universality of the Kolmogorov constant,” Phys. Fluids 7, 2778 (1995).
2.
2.Y. Yamazaki, T. Ishihara, and Y. Kaneda, “Effects of wavenumber truncation on high-resolution direct numerical simulation of turbulence,” J. Phys. Soc. Jpn. 71, 777 (2002).
3.
3.T. Ishihara and Y. Kaneda, “High resolution DNS of incompressible homogeneous forced turbulence time dependence of the statistics,” in Proceedings of the International Workshop on Statistical Theories and Computational Approaches to Turbulence, edited by Y. Kaneda and T. Gotoh (Springer, Berlin, 2002), p. 179.
4.
4.M. Yokokawa, K. Itakura, A. Uno, T. Ishihara, and Y. Kaneda, “16.4-Tflops direct numerical simulation of turbulence by a Fourier spectral method on the Earth Simulator,” http://www.sc-2002.org/paperpdfs/pap.pap273.pdf (2002). The energy spectrum for Run 4096-1 in Ref. 4 is from the data at
5.
5.K. R. Sreenivasan, “An update on the energy dissipation rate in isotropic turbulence,” Phys. Fluids 10, 528 (1998).
6.
6.L. P. Wang, S. Chen, J. G. Brasseur, and J. C. Wyngaard, “Examination of hypotheses in the Kolmogorov refined turbulence theory through high-resolution simulations,” J. Fluid Mech. 309, 113 (1996).
7.
7.J. Jiménez, A. A. Wray, P. G. Saffman, and R. S. Rogallo, “The structure of intense vorticity in isotropic turbulence,” J. Fluid Mech. 255, 65 (1993).
8.
8.N. Cao, S. Chen, and G. D. Doolen, “Statistics and structures of pressure in isotropic turbulence,” Phys. Fluids 11, 2235 (1999).
9.
9.P. K. Yeung and Y. Zhou, “On the universality of the Kolmogorov constant in numerical simulations of turbulence,” Phys. Rev. E 56, 1746 (1997).
10.
10.T. Gotoh, D. Fukayama, and T. Nakano, “Velocity field statistics in homogeneous steady turbulence obtained using a high-resolution direct numerical simulation,” Phys. Fluids 14, 1065 (2002).
11.
11.G. Boffetta and G. P. Romano, “Structure functions and energy dissipation dependence on Reynolds number,” Phys. Fluids 14, 3453 (2002).
12.
12.I. Arad, B. Druvah, S. Kurien, V. S. L’vov, I. Procaccia, and K. R. Sreenivasan, “The extraction of anisotropic contributions in turbulent flows,” Phys. Rev. Lett. 81, 5330 (1998).
http://aip.metastore.ingenta.com/content/aip/journal/pof2/15/2/10.1063/1.1539855
Loading
/content/aip/journal/pof2/15/2/10.1063/1.1539855
Loading

Data & Media loading...

Loading

Article metrics loading...

/content/aip/journal/pof2/15/2/10.1063/1.1539855
2003-01-08
2014-07-12
Loading

Full text loading...

true
This is a required field
Please enter a valid email address
This feature is disabled while Scitation upgrades its access control system.
This feature is disabled while Scitation upgrades its access control system.
752b84549af89a08dbdd7fdb8b9568b5 journal.articlezxybnytfddd
Scitation: Energy dissipation rate and energy spectrum in high resolution direct numerical simulations of turbulence in a periodic box
http://aip.metastore.ingenta.com/content/aip/journal/pof2/15/2/10.1063/1.1539855
10.1063/1.1539855
SEARCH_EXPAND_ITEM