3.1. Single random-atom searching

In order to locate a single atom, this approach randomly generates thousands of positions in the asymmetric unit. E_c values and corresponding CCs are calculated for all reflections for each random position. The program saves the 1000 sets with highest CC as starting points. ACORN-PHASE will refine them in order until the solution is found. Normally, the solution is found in the top 100 sets. This approach can be used to determine a native protein structure from atomic resolution data if the structure contains at least one heavy atom (sulfur or heavier). Provided the heavy atom accounts for at least 5% of the total scattering power of the structure, then it will usually provide good enough initial phases for ACORN-PHASE to successfully refine the single-atom fragment phases. However, experience has shown that a solution may sometimes be found even if the scattering power of the single atom (or fragment) is as low as 1%. The ACORN approach can also used to determine substructures with anomalous scattering data or isomorphous replacement data at much lower resolutions. The smaller number of atoms in the substructure means that one random atom has proportionately more scattering power in a substructure than in a protein structure but, since the quality of anomalous scattering data is worse than that of native protein data, the CC will be smaller for the correct position.

3.2. Molecular replacement (MR) and random MR searching

For a many-atom fragment it is necessary to find both the position of a representative point and the orientation. ACORN splits the required six-dimensional search into two consecutive three-dimensional searches for reasons of speed (Rossmann & Blow, 1962). Therefore, MR (or random MR) first explores rotational space and then, for the highest values of CC from rotation alone, finds positions for different translations. MR is a step-by-step search process on a grid based on the rotation angles and random MR just searches a predetermined number of rotation angles generated randomly. To save CPU time, the process is divided into two parts. In the first part, the CC is calculated for only 10% of reflections for each rotation angle or each translation shift and the top 1000 sets with highest CCs are saved. The CC is then recalculated for all reflections and the top 1000 sets are ranked on the basis of the new CC. Normally, the correct orientation and position is at the top of the list.

4.1. Dynamic density modification (DDM)

DDM is the main phase-refinement approach in ACORN-PHASE and can develop an initial phase set with a mean phase error approaching 80° to a final mean phase error around 15°. Each cycle of DDM starts from a set of phases with weights and calculates a weighted E map with the strong E values. The map is modified and back-transformed by FFT to obtain a new set of structure factors. At the end of one cycle a new set of phases with weights is calculated for the next cycle and the CC is calculated for medium reflections to check if a solution has been found.

The initial map from the starting fragment contains a lot of noise. Fig. 3 shows a histogram of an initial map from a fragment for a known structure.

Since the test is on a known structure, one can divide the map into three parts: red densities are outside the protein region (or envelope), green densities are inside the fragment region and blue densities are in the protein region but outside the fragment region. The last category of densities is the one we want to develop and will grow through the cycles of DDM as the phases are evolving towards the true solution. The protein region contains densities higher than the `solvent' region densities and densities over 2σ(ρ) are the densities we want to enhance. The fragment region densities are what we put in and we do not want this part of the density to dominate the density-modification process, so the highest fragment-region densities are truncated to be comparable to protein-region densities. Therefore, DDM is designed to modify the densities in three steps:

(i) It sets all negative densities to zero. (ii) It modifies the positive densities according the ratio ρ/σ(ρ). (iii) It truncates the modified densities to a value of knσ(ρ), where k is a constant given by the user (default value is 3); n is the cycle number of DDM, but after five cycles n always equals 5.

These properties can be seen clearly from the DDM curve in Fig. 4. It will depress the densities around and less than 1σ(ρ), which are mostly noise, and truncate high densities to 3σ(ρ) in first cycle to relatively enhance the protein region densities in the range 2–3σ(ρ). In the second cycle it will truncate at 6σ(ρ) and after five cycles it will always truncate at 15σ(ρ) (default). The user can change this level by giving a different value of k.

Fig. 5 shows the histogram of the modified map after one cycle of DDM applied to the map corresponding to Fig. 3. The protein region (blue) densities are greatly increased and although the fragment region (green) densities are still there, they are much lower than in the initial map. The solvent region (red) densities have not changed very much. As the protein region densities become larger, the map will finally reveal the structure.

Since DDM modifies a map solely according the ratio ρ/σ(ρ), DDM can be used to modify not only an E map or an F map, but also a Patterson map or a sharpened Patterson map, for example in the Patterson superposition method in ACORN-PHASE (see below).

4.2. Real-space Sayre equation refinement (SER)

It has been found that a couple of cycles of Sayre equation refinement, SER, can help DDM to reach a global rather than local minimum (Foadi et al., 2000). When the CC for the medium-strength reflections no longer increases, or the phases change little on use of DDM, then one or two cycles of SER can be employed. In fact, the application of SER sometimes makes the CC lower, but thereafter DDM can lead to a higher CC than previously. SER is a real-space procedure carried out using the fast Fourier transform (FFT) and inverse FFT. No phase relationships are involved, so there is no practical limit to the number of reflections that can be included. Fig. 6 shows how the combination of DDM with SER re-solved the known structure of catalase starting from nine S-atom positions. SER was used for two cycles at cycle 25 when the CC was not increasing and was used again for two cycles at cycle 77 when the average phase change was less than 0.5°. Thereafter, the CC after each cycle of DDM always increased until it reached 0.49 and the mean phase error was 13°.

4.3. Patterson superposition method (SUPP)

A sum function is used for Patterson superposition on each atom in the fragment. The summation of each origin-shift Patterson map can be carried out in reciprocal space by the summation of contributions from each atom in the fragment. Therefore, a weighted semi-sharpened Patterson superposition map is calculated using Fourier coefficients |E_o||F_o||E_c| with phases from the fragment. The map shows high peaks corresponding to the fragment and some additional low densities that give a small but valuable phase improvement. The map is then modified by one cycle of DDM. The application of SUPP can improve the initial phases from the starting fragment by 1 or 2° when the fragment contains more than ten atoms.

5.1. Lysozyme

This P1 crystal form of lysozyme (PDB code 3lzt ) contains 1230 non-H atoms (Walsh et al., 1998) and could be solved by ACORN from three kinds of starting fragments. There are ten S atoms in this structure, but only two of them were needed as a starting fragment, giving an initial mean phase error of 75°. A total of 19 min was required for ACORN-MR and ACORN-PHASE to solve this structure, giving a final mean phase error of 15°. A single random-atom search could also solve this structure together with another atom at the origin (because the space group P1 needs at least two atoms to fix the origin). In this case, the mean phase error went from 79 to 19° after 6.4 h CPU time. The extra CPU time is compensated by not needing to collect the anomalous scattering data and locate the positions of S atoms. Since lysozyme contains α-­helices, a standard α-helix from the CCP4 fragment library could also be used as a starting fragment. Ten alanine residues (50 atoms) were taken from the library and random MR was used to find the correct orientation, no translation function being needed for space group P1. The mean phase error went from 76 to 15° using 15.3 h of CPU time. A second lysozyme study with 1093 non-H atoms and space group P4₃2₁2 (PDB code 1bwi ) was solved by a single random-atom search approach with a 15° mean phase error after 14.5 h CPU time.

5.2. Penicillopepsin (PDB code 1bxo )

Penicillopepsin (Ding et al., 1998) contains 2977 non-H atoms in the asymmetric unit with space group C2. This example illustrates the solution of a structure using ACORN where the only available information was a sequence. Sequence alignment against structures in the PDB was performed and 57 residues (398 atoms) were taken from a related structure with PDB code 1er8 (Pearl & Blundell, 1984). The first test assumed space group P1, reduced from C2, so that no translation function was needed. The correct orientation was found by ACORN-MR and provided an initial 76° mean phase error. ACORN-PHASE refined the initial phases to a mean phase error of 15°. The ACORN map was in P1 and the origin needed to be shifted to return to C2. The second test used the proper space group C2 and ACORN-MR found the correct orientation and position that resulted in a better initial mean phase error of 71° and a final mean phase error of 14°. Fig. 7 shows an E map from ACORN that was in very good agreement with the final model. QUANTA built the structure automatically from this map taking less than 20 s (Oldfield, 2002).

5.3. Catalase

This is the largest structure (Murshudov et al., 1992) that has been tested on ACORN. There are 4762 non-H atoms (502 residues plus a haem group) in the asymmetric unit with space group P4₂2₁2. The iron and sulfur positions are easily determined by direct methods or Patterson searches using anomalous scattering data. The data provided by Murshudov (unpublished results) reaches a resolution of 0.88 Å with excellent quality. ACORN used only data extending to 1.0 Å resolution and solved this structure using DDM and SER starting from nine S atoms or using DDM alone starting from the iron-containing haem group (43 atoms in total). The final mean phase error was 13° for both starting fragments.

6.1. Metalloproteinase deuterolysin (PDB code 1eb6 )

The data of metalloproteinase deuterolysin (McAuley et al., 2001) were collected to 1.0 Å resolution with synchrotron radiation. The structure contains 177 residues and one Zn atom in the asymmetric unit with space group P2₁. The position of the Zn atom was determined either from an anomalous difference Patterson or from a sharpened normal Patterson with native data. Starting from the zinc position, DDM solved the structure using 168.9 s CPU time. The single random-atom search procedure in ACORN also solved this structure using 494.1 s of CPU time using only native protein data. The searching region is restricted to the plane y = 0 because the origin can be anywhere along the y axis for this space group. The structure contained α-helices and could also be solved by ACORN starting from ten residues of a standard α-helix with random MR giving the correct orientation and position. DDM provided the same quality phases as for the other starting points. The model was built up automatically using ARP/wARP (Perrakis et al., 1999). Fig. 8 is an E map overlaid on the refined model. Most atoms appear in the map very clearly. The whole process, starting from the processed and merged data and ending with a refined model, required less than 6 h computation time.

6.2. C1 subunit of α-crustacyanin (PDB code 1i4u )

This structure (Gordon et al., 2001) contained 362 residues (3382 non-H atoms) in the asymmetric unit with space group P2₁2₁2₁. The native data were collected to 1.15 Å resolution and anomalous scattering data to 1.77 Å. The substructure of 12 S atoms was determined using SnB (Weeks & Miller, 1999) with anomalous scattering data. SnB and other methods were tried to solve this structure from the positions of S atoms, but could not obtain a density map that was good enough to be interpretable. The same positions of S atoms were taken as a starting fragment into ACORN and the initial phases were refined using DDM. A density map of excellent quality was provided immediately. The major part of the atomic model for the protein was built automatically using wARP.

6.3. A protein structure solved by Esnouf (2001)

The determination of this structure followed a similar pattern to that in §6.2. The structure contained 164 residues (1318 non-H atoms) in the asymmetric unit with space group P2₁2₁2₁. The data were collected at 0.9 Å resolution. SnB was used and located 16 S atoms, but could not give any further progress. ACORN started from these S positions and solved the structure by DDM using about 2 min CPU time.

6.4. A SeMet protein structure solved by Davies (2001)

This was an SeMet protein structure of 125 residues with space group P2₁2₁2₁ with data at 1.0 Å resolution. A single Se atom was located using the Patterson method and DDM in ACORN solved the structure in a few minutes.