Nonlinear quasisteady state benchmark of global gyrokinetic codes
暂无分享,去创建一个
Laurent Villard | Frank Jenko | Stephan Brunner | B. F. McMillan | X. Lapillonne | T. Dannert | F. Jenko | T. Dannert | L. Villard | S. Brunner | B. McMillan | X. Lapillonne | F. Merz | F. Merz | Tobias Görler | T. Görler
[1] Frank Jenko,et al. Characterizing electron temperature gradient turbulence via numerical simulation , 2006 .
[2] Frank Jenko,et al. The European turbulence code benchmarking effort: turbulence driven by thermal gradients in magnetically confined plasmas , 2008 .
[3] A. G. Peeters,et al. The effect of a uniform radial electric field on the toroidal ion temperature gradients mode , 2004 .
[4] L. Villard,et al. Avalanchelike bursts in global gyrokinetic simulations , 2009 .
[5] Mike Kotschenreuther,et al. Comparison of initial value and eigenvalue codes for kinetic toroidal plasma instabilities , 1995 .
[6] Charlson C. Kim,et al. Comparisons and physics basis of tokamak transport models and turbulence simulations , 2000 .
[7] B. Scott,et al. Global Nonlinear Electromagnetic Simulations of Tokamak Turbulence , 2010, IEEE Transactions on Plasma Science.
[8] X. Garbet,et al. Global full-f gyrokinetic simulations of plasma turbulence , 2007 .
[9] Verification of gyrokinetic δf simulations of electron temperature gradient turbulence , 2007 .
[10] Williams,et al. Scalings of Ion-Temperature-Gradient-Driven Anomalous Transport in Tokamaks. , 1996, Physical review letters.
[11] T. S. Hahm,et al. Zonal flows in plasma—a review , 2005 .
[12] Frank Jenko,et al. The global version of the gyrokinetic turbulence code GENE , 2011, J. Comput. Phys..
[13] Marshall N. Rosenbluth,et al. POLOIDAL FLOW DRIVEN BY ION-TEMPERATURE-GRADIENT TURBULENCE IN TOKAMAKS , 1998 .
[14] John M. Dawson,et al. Geodesic Acoustic Waves in Hydromagnetic Systems , 1968 .
[15] Laurent Villard,et al. Gyrokinetic simulations of turbulent transport: size scaling and chaotic behaviour , 2010 .
[16] D. P. Stotler,et al. Validation in fusion research: Towards guidelines and best practices , 2008, 0801.2787.
[17] Frank Jenko,et al. Electron temperature gradient driven turbulence , 1999 .
[18] Shinji Tokuda,et al. Global gyrokinetic simulation of ion temperature gradient driven turbulence in plasmas using a canonical Maxwellian distribution , 2003 .
[19] S. Parker,et al. A fully nonlinear characteristic method for gyrokinetic simulation , 1993 .
[20] Laurent Villard,et al. Gyrokinetic simulations of turbulent transport , 2010 .
[21] Laurent Villard,et al. On the definition of a kinetic equilibrium in global gyrokinetic simulations , 2006 .
[22] T. S. Hahm,et al. Nonlinear gyrokinetic equations for tokamak microturbulence , 1988 .
[23] Laurent Villard,et al. Clarifications to the limitations of the s-α equilibrium model for gyrokinetic computations of turbulence , 2009 .
[24] F Jenko,et al. System size effects on gyrokinetic turbulence. , 2010, Physical review letters.
[25] Laurent Villard,et al. A global collisionless PIC code in magnetic coordinates , 2007, Comput. Phys. Commun..
[26] Richard D. Sydora,et al. Toroidal gyrokinetic particle simulations of core fluctuations and transport , 1995 .
[27] Laurent Villard,et al. Long global gyrokinetic simulations: Source terms and particle noise control , 2008 .
[28] E. Frieman,et al. Nonlinear gyrokinetic equations for low-frequency electromagnetic waves in general plasma equilibria , 1981 .
[29] T. Hahm,et al. Turbulent transport reduction by zonal flows: massively parallel simulations , 1998, Science.
[30] Gregory W. Hammett,et al. Field‐aligned coordinates for nonlinear simulations of tokamak turbulence , 1995 .