Bulletin of the American Physical Society
60th Annual Meeting of the APS Division of Plasma Physics
Volume 63, Number 11
Monday–Friday, November 5–9, 2018; Portland, Oregon
Session PP11: Poster Session VI: Relativistic Laser Plasma Interaction and Beam Physics; Boundary; MHD and Stability, Transients; FRC; Dusty Plasmas; Basic Studies; Computational and Diagnostic Methods (2:00pm-5:00pm)
Wednesday, November 7, 2018
OCC
Room: Exhibit Hall A1&A
Abstract ID: BAPS.2018.DPP.PP11.39
Abstract: PP11.00039 : A Landau Fluid Closure for Arbitrary Frequency and Its Implementation in Numerical Code*
Presenter:
Libo Wang
(Peking Univ)
Authors:
Libo Wang
(Peking Univ)
Xueqiao Xu
(Lawrence Livermore Natl Lab)
The perturbed heat flux and temperature for Landau damping case are calculated directly. The relationship between these two physical quantities is the same as Hammett-Perkins’ closure in low frequency limit. Another method to get Landau fluid (LF) closure, such as Chapman-Enskog-like (CEL) method, is analyzed. It shows that the CEL method produces the same closure as that of kinetic method only when background distribution is Maxwellian. To bridge the low and high frequency limit, the harmonic average form of kinetic LF closure is developed which shows that the transport is non-local both on space and time. The harmonic average closure depends on wave frequency and yields a better agreement with kinetic response function than that of Hammett-Perkins’ closure. The implementation in numerical code is also presented, based on an approximation by a sum of diffusion-convection solves (SDCS). The three moment Landau-fluid model has been implemented in the BOUT++ code using the SDCS method for the harmonic average form of LF closure. Good agreement has been obtained for the response function between driven initial-value calculations using this implementation and matrix eigenvalue calculations using SDCS implementation of the LF closure.
*Prepared by LLNL under Contract DE-AC52-07NA27344
To cite this abstract, use the following reference: http://meetings.aps.org/link/BAPS.2018.DPP.PP11.39
Follow Us |
Engage
Become an APS Member |
My APS
Renew Membership |
Information for |
About APSThe American Physical Society (APS) is a non-profit membership organization working to advance the knowledge of physics. |
© 2024 American Physical Society
| All rights reserved | Terms of Use
| Contact Us
Headquarters
1 Physics Ellipse, College Park, MD 20740-3844
(301) 209-3200
Editorial Office
100 Motor Pkwy, Suite 110, Hauppauge, NY 11788
(631) 591-4000
Office of Public Affairs
529 14th St NW, Suite 1050, Washington, D.C. 20045-2001
(202) 662-8700