Table 4 Energy levels of tetragonal bulk Si structures Basis Number of Number of LUMO CBM type layers k-pts at Γ (at ΔFCC)     in k z (eV) (eV) PW 4 12 0.7517   (vasp) 8 6 0.7517     16 3 0.6506     32 2 0.6170     40 1 0.6179     64 1 0.6137     80

1 0.6107 0.6102 DZP 40 1 0.6218   (siesta) 60 1 0.6194     80 1 0.6154     120 1 0.6145     160 1 0.6151 0.6145 SZP 40 1 0.8392   (siesta) 60 1 0.8349     80 1 0.8315     120 1 0.8311     160 1 0.8315     200 1 0.8310 0.8309 For details of the calculation parameters, see the ‘Methods’ section. Bindarit All methods considered in Table 4 show the LUMO at Γ (folded in along ± k z ) approaching the CBM value as the amount of cladding increases; at 80 layers, the LUMO at Γ is within 1 meV of the CBM value. It is also of note that the PW indirect bandgap agrees well with the DZP value and less so with the SZP model. This is an indication that, although the behaviour of the LUMO with respect to the cell shape is well replicated, the SZP basis set is demonstrably incomplete. Conversely, pairwise comparisons between the PW and DZP results show agreement to within 5 meV. It is important click here to distinguish effects indicating convergence with respect to cladding for doped cells

(i.e. elimination of layer-layer interactions) from those mentioned previously derived from the shape and size of the supercell. Strictly, the convergence (with respect to the amount of encapsulating Si) of those results we wish to study in Y27632 detail, such as the differences in

energy between occupied levels in what was the bulk bandgap, provides the most appropriate measure of whether sufficient cladding has been applied. Appendix 3 Valley splitting Ceramide glucosyltransferase Here, we discuss the origins of valley splitting, in the context of phosphorus donors in silicon. Following on from the discussion of Si band minima in Appendices 1 and 2, we have, via elongation of the supercell and consequent band folding, a situation where, instead of the sixfold degeneracy (due to the underlying symmetries of the Si crystal lattice), we see an apparent splitting of these states into two groups (6 → 2 + 4, or 2 Γ + 4 ∆ minima). We now consider what happens in perfectly ordered δ-doped monolayers, as per the main text. Here, we break the underlying Si crystal lattice symmetries by including foreign elements in the lattice. By placing the donors regularly (according to the original Si lattice pattern) in one [001] monolayer, we reduce the symmetry of the system to tetragonal, with the odd dimension being transverse to the plane of donors. This dimension can be periodic (as in the supercells described earlier), infinite (as in the EMT model of Drumm et al. [40]) or extremely long on the atomic scale (as the experiments are). Immediately, therefore, we expect the same apparent 2 + 4 breaking of the original sixfold degenerate conduction band minima.