ATK comes with an extensive set of pseudopotentials (PPs). Those are norm-conserving PPs as parameterized by Troullier and Martins in the nonlocal form of Kleinman and Bylander, right? Are those PPs generated taking relativistic effects into account and what about nonlinear partial-core corrections?
Now, about basis sets: ATK uses the well established SIESTA-type pseudo-atomic orbitals. They are closely related to the famous Sankey-Fireballs (but with a more soft confinement), right? ATK provides parameters for the orbitals for many basis sets (SZ, SZP, ... for LDA, GGA) of all elements. Those parameters include conf. strength (V_0), conf. start (r_inn), conf. cutoff (r_c), split norm (r_split).
o r_split is found impirically to be 0.15. OK.
o V_0 is 20 Hartree. Why?
o How is r_c determined? (For the Fireballs it is the position of the first node of the PP eigenstate at a slightly excited energy (energy shift dE ~ +0.1 eV). The same here?)
o How is r_inn determined or optimized?
Is there a paper where those things are described?
(I know for example:
Soler et al. [J. Phys.: Condens. Matter 14 (2002) 2745–2779] where it is mentioned that that it is usually better to fix a common energy shift, rather than a common radius r_c.
Artacho et al. [phys. stat. sol. (b) 215, 809 (1999)] again enegry shift as single parameter.
Anglada et al. [PRB 66, 205101 (2002)] mention the soft confinement, discuss r_c but seem to miss any comment on r_inn.
Junquera et al. [PRB 64, 235111 (2001)] discuss an optimization precedure for V_0, r_c and r_inn.
)
I noticed that the definition of the confining potential in [PRB 66, 205101 (2002)] and [PRB 64, 235111 (2001)] (SIESTA) differs from the one in the ATK manual. Is the one in the manual indeed the one used in ATK?
Thanks for your help.
