Nonlinear ELM simulations based on a nonideal peeling–ballooning model using the BOUT++ code

• Published in: Nuclear fusion Vol. 51; no. 10; pp. 103040 - 10
• Main Authors: Xu, X.Q, Dudson, B.D, Snyder, P.B, Umansky, M.V, Wilson, H.R, Casper, T
• Format: Journal Article
• Language: English
• Published: United States IOP Publishing 01.10.2011; IOP Science
• Subjects: 70 PLASMA PHYSICS AND FUSION; Collapse; Computer simulation; Diamagnetism; Drift; Electrical resistivity; Elm; Nonlinearity; Viscosity
• ISSN: 0029-5515; 1741-4326
• DOI: 10.1088/0029-5515/51/10/103040

A minimum set of equations based on the peeling–ballooning (P–B) model with nonideal physics effects (diamagnetic drift, E × B drift, resistivity and anomalous electron viscosity) is found to simulate pedestal collapse when using the BOUT++ simulation code, developed in part from the original fluid edge code BOUT. Linear simulations of P–B modes find good agreement in growth rate and mode structure with ELITE calculations. The influence of the E × B drift, diamagnetic drift, resistivity, anomalous electron viscosity, ion viscosity and parallel thermal diffusivity on P–B modes is being studied; we find that (1) the diamagnetic drift and E × B drift stabilize the P–B mode in a manner consistent with theoretical expectations; (2) resistivity destabilizes the P–B mode, leading to resistive P–B mode; (3) anomalous electron and parallel ion viscosities destabilize the P–B mode, leading to a viscous P–B mode; (4) perpendicular ion viscosity and parallel thermal diffusivity stabilize the P–B mode. With addition of the anomalous electron viscosity under the assumption that the anomalous kinematic electron viscosity is comparable to the anomalous electron perpendicular thermal diffusivity, or the Prandtl number is close to unity, it is found from nonlinear simulations using a realistic high Lundquist number that the pedestal collapse is limited to the edge region and the ELM size is about 5–10% of the pedestal stored energy. This is consistent with many observations of large ELMs. The estimated island size is consistent with the size of fast pedestal pressure collapse. In the stable α-zones of ideal P–B modes, nonlinear simulations of viscous ballooning modes or current-diffusive ballooning mode (CDBM) for ITER H-mode scenarios are presented.