The distinguishing capabilities of the HiFi code include adaptive spectral element spatial representation with flexible 3D geometry, highly parallelizable implicit time advance, and general flux-source form of the partial differential equations and boundary conditions that can be implemented in its framework. Early algorithm development and extensive verification studies of the two-dimensional version of the code have been previously described A.H. Glasser & X.Z. Tang, Comp. Phys. Comm., 164 (2004); V.S. Lukin, Ph.D. thesis, Princeton University (2008)].
Generated .xmf files are XDMF files (eXtensible Data Model and Format): http://www.xdmf.org/index.php/Main_Page
Leuven Seminar explaining Boundary Conditions
Stanier A.; Browning P.; Gordovskyy M.; McClements K.G.; Gryaznevich M.P.; Lukin V.S. Two-fluid simulations of driven reconnection in the Mega-Ampere Spherical Tokamak, Physics of Plasmas, Volume 20, Issue 12 (2013), p. 122302.
Ohia O.; Egedal J.; Lukin V.S.; Daughton W.; Le A. Demonstration of anisotropic fluid closure capturing the kinetic structure of magnetic reconnection, Physical Review Letters, Volume 109, Issue 11 (2012), p. 115004.
Lukin V.S. Stationary nontearing inertial scale electron magnetohydrodynamic instability, Physics of Plasmas, Volume 16 (2009), p. 122105