2.1. Crystallization and data collection

The three test proteins used in the experiment are bovine pancreatic trypsin, hen egg-white lysozyme and Thaumatococcus deniellii thaumatin. The proteins were purchased from commercial sources and have been crystallized according to the conditions documented in the literature, with slight modifications (Bode & Schwager, 1975; Van der Wel et al., 1975). The crystallization conditions are listed in Table 1. In particular, the lysozyme was crystallized in the presence of KAu(CN)₂, which yields an orthorhombic crystal form (unpublished results; CSHL Macromolecular Crystallography Course).

In this experiment, one native trypsin crystal was used. Trypsin contains an intrinsic weak anomalous scatterer in the form of a structural Ca atom. At 1.54 Å wavelength (i.e. Cu Kα) calcium and selenium have very similar values of Δ of 1.286 and 1.139 electrons, respectively (International Tables for X-ray Crystallography, 1974).

Two crystals were used for each of the lysozyme and thaumatin determinations. The lysozyme orthorhombic crystal form grown for our studies incorporates an Au atom into the crystal lattice. It appears that this Au atom is lost as the crystals age. A relatively old `gold-depleted' crystal was used for a native diffraction data set, while a second similar crystal was soaked in the crystallization solution saturated with potassium dicyanoaurate, KAu(CN)₂, for 4 h in order to reincorporate the gold moiety. A thaumatin crystal was derivatized by soaking in 10 mM methylmercury chloride dissolved in crystallization solution overnight.

2.2. Phase determination

All the programs used in finding the locations of heavy atoms and anomalous scatterers and phase refinement were from the CCP4 suite (Collaborative Computational Project, Number 4, 1994). Every data set was treated equally through the DTREK2MTZ and TRUNCATE (French & Wilson, 1978) programs to calculate the amplitude of structure factors (|F|) and anomalous difference (ΔF) from the measured intensities (I). For all calculations described below, the diffraction data within the resolution range 15.0–2.5 Å was used.

The initial position of the Ca²⁺ ion in the trypsin crystal was located from inspection of Harker sections of an anomalous difference Patterson map. The position and anomalous occupancy of the Ca²⁺ were refined using the anomalous difference of the native crystal with MLPHARE (Otwinowski, 1991) before the initial single-wavelength anomalous scattering (SAS) phases were calculated using the position of Ca²⁺ only.

Anomalous difference Fourier maps (F⁺ − F⁻, φ_SAS − 90°) were generated using the FFT program (Ten Eyck, 1973). PEAKMAX (from the CCP4 suite) was employed to search for peaks in the anomalous difference Fourier map in order to locate the positions of anomalous scatterers such as S atoms. The potential positions of the anomalous scatterers were refined along with the parameters for Ca²⁺ and new SAS phases were calculated. This cycle was iterated several times. The details will be described in §3.

The positions of heavy atoms in the lysozyme and thaumatin crystals were located from their isomorphous difference Patterson maps. A similar procedure used in phasing the trypsin crystal structure was applied here. The positions of anomalous scatterers were also found by peak searching on the anomalous difference Fourier maps (F⁺ − F⁻, φ_SIRAS − 90°). The positions and anomalous occupancies of anomalous scatterers were refined using the anomalous difference of the native data as second derivative data. New phases were calculated with information from both the heavy-atom and the anomalous scatterers.

The improvement of electron-density maps was visualized with the program O (Jones et al., 1991). The map correlation coefficient of the F_o map was calculated using OVERLAPMAP (Jones & Stuart, 1991) with the 2F_o − F_c map (F_c from the final atomic model) used as the reference map.

3.1. Phasing orthorhombic trypsin structure using a single data set

More than a third of the current protein population is known as metalloproteins that contain one or more bound metal ions such as Fe, Co, Ca, Zn and Mn (The Metalloprotein Structure and Design Group, 1999). Some nonmetalloproteins can bind one or more metal ions during their crystallization process. The bovine pancreatic trypsin molecule has one noncovalently bound Ca²⁺ ion. In this experiment, a single data set of a native trypsin crystal was collected on a 5 kW laboratory source at Cu Kα wavelength (1.54 Å) and its structure was phased from the intrinsic anomalous scattering of Ca²⁺ and 14 S atoms.

The trypsin crystal was about 0.1 × 0.1 × 0.2 mm in size. It was crystallized in the expected space group P2₁2₁2₁. During X-ray diffraction data collection, the crystal was maintained at cryogenic temperatures and no noticeable decay was observed. The data-collection statistics are listed in Table 1.

The trypsin crystal diffracted beyond 1.6 Å resolution, but the data were collected and processed up to the edge of the detector (2.0 Å). The overall redundancy was about 14-fold with 98% overall completeness. The overall R_merge and that in the highest resolution (2.0–2.14 Å) shell are 5.6 and 23.6%, respectively. The overall 〈I/σ(I)〉 for the unaveraged observations is 22.1.

Two ratios of 〈|ΔF|〉/〈F〉 and 〈|ΔF|〉/σ〈|ΔF|〉 were used to evaluate the strength and significance of anomalous scattering. According to Hendrickson & Teeter (1981), the expected average ratio of 〈|ΔF|〉/〈F〉 can be calculated as 2^1/2. In the case of trypsin, the number of anomalous scatterers (N_A) in trypsin is 15, the number of total non-H protein atoms (N_P) is 1765 and the effective atomic number (Z_eff) is ∼6.7 for non-H protein atoms. One Ca²⁺ ion with = 1.283 electrons and 14 S atoms with = 0.563 electron results in a value of only 1.6% for the ratio of 〈|ΔF|〉/〈F〉 at the wavelength of Cu Kα radiation. The overall experimental ratio of 〈|ΔF|〉/〈F〉 is 1.9% up to the resolution of 2.0 Å because of the experimental errors in the measured intensities. The experimental ratios of 〈|ΔF|〉/〈F〉 and 〈|ΔF|〉/σ〈|ΔF|〉 are equal to 1.93 and 1.34%, respectively, in the resolution range 15.0–2.5 Å used to phase the trypsin data. At higher resolution, the ratio of 〈|ΔF|〉/〈F〉 increases, but the ratio of 〈|ΔF|〉/σ〈|ΔF|〉 decreases. It remains to be tested what resolution is optimal for phasing protein data with the anomalous scattering of S atoms.

Prior to locating the positions of S atoms of trypsin, the position of Ca²⁺ was located on the Harker sections of an anomalous difference Patterson map. The position and anomalous occupancy of the Ca²⁺ ion were initially refined using the anomalous difference of its native data for ten cycles while its B factor was set to 40 Ų. The error-prone weak data with |F_h| or |F_−h| < 2σ(I) were excluded. A total of 7698 anomalous differences up to the resolution of 2.5 Å were used. Since the Δ of Ca²⁺ is 1.286 electrons and there is one Ca²⁺ ion among 1765 non-H atoms, the overall figure of merit of SAS phasing of the Ca²⁺ ion was only 0.26. The solvent-flattening procedure DM (Cowtan, 1994) was employed to improve the quality of the electron-density map, but the electron density was still very noisy and the boundary of the molecule was still ambiguous because of low solvent content in the trypsin crystal (27%). One β-sheet of the core of trypsin structure was chosen as the reference to display the change in quality of the electron-density maps (Fig. 1), which consists of Ile47–Ala55, Ser86–His91 and Asn101–Lys109. The correlation coefficient between the F_o map and the 2F_o − F_c map of the final refined structure was as low as 0.15. This first electron-density map was uninterpretable (Fig. 1a).

Figure 1 Electron density for the reference β-sheet in trypsin, which consists of Ile47–Ala55, Ser86–His91 and Asn101–Lys109. The maps were calculated using SAS solvent-flattened phases. The maps are contoured at 1σ. SAS phases were calculated using (a) only Ca2+, (b) Ca2+ and nine S atoms deduced from the top ten peaks of the first list of Table 2, (c) Ca2+ and ten S atoms deduced from the top 11 peaks of the second list, (d) Ca2+ and ten S atoms deduced from the top 11 peaks of the third list, (e) Ca2+ and 14 S atoms after two S atoms were manually deduced from each disulfide bond.

When SAS phases calculated from the position of the Ca²⁺ ion were used to calculate the anomalous Fourier map (F⁺ − F⁻, φ_SAS − 90), some `anomalous' peaks with a considerable height were found by the program PEAKMAX. The highest peak has a value more than six standard deviations above the average value in the map. A trypsin molecule has S atoms from two methionine and 12 cysteine residues. The first peak list in Table 2 shows the 16 highest found `anomalous' peaks and their corresponding residues. No obvious decrease in peak height was seen between peaks 15 and 16. The positions of the first ten peaks after the peak of Ca²⁺ (>4σ) were input into the program MLPHARE as S-­atom positions. A second round of phase refinement and calculation were performed with a Ca²⁺ and ten S atoms deduced from first ten non-Ca²⁺ `anomalous' peaks of the first peak list. The figure of merit increased by 15% from 0.26 to 0.30 and the map correlation coefficient also improved. These second SAS phases were also modified by the solvent-flattening procedure (DM). The map of the reference β-sheet shown in Fig. 1(b) still appears to be noisy and uninterpretable.

The same procedure to generate the first list of anomalous peaks was used to produce the second list. Five noise peaks included in the second phase calculation were no longer present, while the peaks corresponding to the positions of S atoms remained with an increased height. An obvious decrease in height between peaks 11 and 12 was also seen in the second list of anomalous peaks in Table 2. The positions of top ten peaks below the Ca²⁺ peak in the second list were input (along with the Ca²⁺ position) to the program MLPHARE as the sulfur positions for a third round of SAS phase refinement and calculation. The overall figure of merit of the SAS phases was increased to 0.32. The boundary of the protein molecule became clear and some secondary structure became distinguishable, such as the electron density of the reference β-sheet shown in Fig. 1(c).

The same procedure was iterated twice more to produce a third and fourth list of anomalous peaks (Table 2). Ten anomalous peaks besides the Ca²⁺ peak remained with increased peak heights. The overall figure of merit of the fourth SAS phases was increased to 0.43. The map correlation coefficient reached 0.41 and the map became interpretable, but many discontinuous regions were still seen in the electron-density map. The electron density of the reference β-sheet is shown in Fig. 1(d).

The top eight out of ten anomalous peaks of the third list were found again in the fourth anomalous difference map (fourth list of Table 2). For most of the disulfide bonds, a single anomalous peak instead of two peaks for two S atoms can be found in an anomalous difference Fourier map at a low resolution. The peak position is usually referred to as the position of a `super S atom' (Chen et al., 2000) and located at the center of a disulfide bond (—SS—). Including higher resolution data can resolve the one peak into two peaks from which two sulfur positions can be deduced. The positions of six S atoms of crambin were recognized only on the anomalous difference Patterson maps at the resolution of 1.5 Å. It still remains to be investigated what resolution is high enough to deduce the positions of two S atoms of a disulfide bond on an anomalous difference Fourier map. In this experiment, an anomalous difference Fourier map up to the resolution of 2.5 Å was calculated using the fourth SAS phases. This map was visually inspected along with the position of anomalous peaks in the fourth list. In addition to the density of the Ca²⁺ ion, two individual spherical densities and six elongated ellipsoidal densities were seen (Fig. 2). One anomalous peak rests in each density. The two peaks in two individual spherical densities were recognized as the S atoms of Met180 and Met104. The peaks in the center of an ellipsoidal density were recognized as the —SS— atoms of a disulfide bond and replaced with two S atoms whose bond distance was 2 Å. Therefore, the positions of 14 S atoms and one Ca²⁺ were input into the fifth round of SAS phase refinement and calculation. The overall figure of merit increased to 0.46. The map correlation coefficient increased to 0.48. The map improved considerably, as evident in Fig. 1(e) which shows the electron density of the reference β-sheet. Fig. 3 displays the electron density of one β-strand (Gln51–Ala55) of the reference β-sheet with the side chains in place. The main chain of 245 amino acids was manually traced within a few hours. Fig. 4 shows the direct comparison between SAS phases from the Ca²⁺ ion only and from the Ca²⁺ ion and 14 S atoms. Fig. 4(a) displays the map of the C-terminal helix (Tyr234–Asn245) calculated using only SAS solvent-flattened phases derived from the anomalous scattering of the Ca²⁺ ion. It was the most recognizable region of the entire electron-density map. The density of the main chain was discontinuous and side chains were not covered by electron density at the 1σ level. It was very difficult to recognize the region as an α-helix. Fig. 4(b) shows the electron density of the same helix calculated with the anomalous scattering of the Ca²⁺ ion and 14 S atoms and solvent flattening. The density of the main chain can be easily recognized and almost every side chain was covered by well defined density, especially Tyr234 and Trp235.

Figure 2 Anomalous difference Fourier map generated using SAS solvent-flattened phases for trypsin (Cα backbone with Ca2+ and side chains of Cys and Met). The anomalous peaks of the fourth list were found on this map. The map was contoured at 5σ.

Figure 3 2.5 Å resolution electron density for one β-strand in trypsin (Gln51–Ala55) of the reference β-sheet with the side chains in the place. The map was contoured at 1σ.

Figure 4 2.5 Å resolution electron density for the C-terminal helix (model coordinates) generated using different SAS phases. The SAS phases were improved through solvent flattening. The maps were contoured at 1σ. (a) SAS phases were calculated using anomalous scattering of only Ca2+. (b). SAS phases were calculated using anomalous scattering of Ca2+ and 14 S atoms.

Trypsin (MW ≃ 26 kDa) is a good example for testing a new approach to the use of sulfur anomalous scattering in phasing protein structures. According to the values of the imaginary dispersion correction of atomic structure factors (Δ) for metal ions, the strength of the anomalous scattering of the Ca²⁺ ion is lower than the commonly used heavy atoms and many common metal ions of metalloproteins, such as Fe and Co atoms. A Ca atom has almost the same strength of anomalous scattering as an Se atom at the wavelength of 1.54 Å. The preparation of selenium protein has become a routine step for structural determination. The results of this experiment suggest the positions of Se atoms can be located using the data collected on a non-synchrotron source and the combination of anomalous scattering of S and Se atoms should be able to solve a protein structure without diffraction data from a synchrotron beamline.

3.2. Phasing the protein structures with one native and one derivative data set

SIR and SIRAS phasing are commonly used in solving protein structures. In this experiment, we demonstrate that including the sulfur anomalous scattering signal in the cases of SIR and SIRAS phasing can greatly improve the results. Known SIR or SIRAS phases were used to generate an anomalous difference Fourier map through which the positions of S atoms were located. The positions and anomalous occupancies of found S atoms were refined along with the positions of heavy atoms using the anomalous differences of native data. The addition of anomalous differences of native data in the phase refinement and calculation can enhance resolving the phase ambiguity of SIR and SIRAS phase distributions without introducing any lack-of-isomorphism error.

The two proteins, lysozyme and thaumatin, with molecular weights of 14 and 22 kDa, respectively, were crystallized in different crystal lattices and space groups (Table 1). The crystals diffracted to 2.0 Å resolution or better. In our study, all the refinements were performed using only 15.0–2.5 Å data to match that of many crystals currently collected with laboratory X-ray generators. An iterative procedure similar to that described for trypsin above was used with the lysozyme and thaumatin diffraction data. However, instead of a single diffraction data set as in the case of trypsin, heavy-atom derivative data were collected and used along with the native data.

The expected average ratios of 〈|ΔF|〉/〈F〉 of both lysozyme and thaumatin are ∼1.2% with Cu Kα radiation, lower than those calculated for trypsin and crambin. Experimentally derived 〈|ΔF|〉/〈F〉 ratios of native data of lysozyme and thaumatin are close to their expected value (1.2%) in the resolution range to 2.5 Å. These ratios increase at higher resolution owing to the increase in error of ΔF and F measurement. The datum of orthorhombic lysozyme has an overall R_merge of 4% and 〈I/σ(I)〉 for unaveraged observations of 42. Thaumatin datum has an overall R_merge of 6.8% and 〈I/σ(I)〉 of 36. The experimental ratio 〈|ΔF|〉/〈σΔF〉 of lysozyme and thaumatin native data are above 1.0 to 2.5 Å. The significance of the anomalous signal 〈|ΔF|〉/〈σΔF〉 appears to be closely correlated to the quality of data. Our experience shows that the redundancy of data can play a critical role in increasing the accuracy of the 〈|ΔF|〉 and 〈σΔF〉 measurement, especially when the data are collected at a non-synchrotron source. This is consistent with the observation by Weiss (2001) that data redundancy improves the accuracy of averaged intensities.

The attempt to find sulfur positions by inspection of an anomalous difference Patterson map calculated from the data of lysozyme and thaumatin in the resolution range 15.0–2.5 Å failed owing to the low ratios of 〈|ΔF|〉/〈F〉 and 〈|ΔF|〉/〈σΔF〉, although others have used more powerful procedures to do so (Dauter et al., 1999; Weiss, 2001). A gold derivative of lysozyme and a mercury derivative of thaumatin were prepared using the procedure described in §2. The heavy-atom positions were located by isomorphous difference Patterson maps. The SIRAS phases were calculated with the program MLPHARE. The figures of merit of the SIRAS phases of each test crystal are listed in Table 3.

Table 3 Phasing statistics   Trypsin Lysozyme Thaumatin Phase of Ca2+ Ca2+ +  14 S Au Au + (2 —SS—,  6 S, 7 Cl)† Hg Hg + (2 —SS—,  12 S)‡ Resolution (Å) FOM FOM FOM 15.00–9.23 0.22 0.30 0.65 0.66 0.58 0.59 9.23–6.67 0.25 0.45 0.65 0.74 0.54 0.65 6.67–5.22 0.26 0.49 0.70 0.80 0.56 0.69 5.22–4.29 0.29 0.47 0.66 0.75 0.52 0.65 4.29–3.64 0.30 0.49 0.53 0.70 0.47 0.62 3.64–3.16 0.29 0.49 0.49 0.69 0.40 0.58 3.16–2.79 0.26 0.46 0.41 0.61 0.34 0.54 2.79–2.50 0.22 0.40 0.34 0.54 0.28 0.50 15.0–2.50 0.26 0.46 0.48 0.67 0.39 0.57 Map correlation coefficient 0.15 0.48 0.48 0.67 0.52 0.56 †Two —SS—, six S and seven Cl atoms were deduced from the first 15 anomalous peaks of lysozyme in Table 4. They were used as individual S atoms in phase refinement. ‡Two —SS— and 12 S atoms were deduced from the first 14 anomalous peaks of thaumatin in Table 4. They were used as individual S atoms in phase refinement.

An anomalous difference Fourier map of each native data set from the lysozyme and thaumatin crystals was generated using SIR or SIRAS phases and the anomalous difference of the native data in the resolution range 15–2.5 Å. The peak-search program (PEAKMAX) was also used to find the peaks in the anomalous difference Fourier maps. Table 4 lists the found anomalous peaks and corresponding anomalous scatterers.

After the structure was aligned to the electron-density map, the height of the largest anomalous peak of the lysozyme data is 7.1σ above the average map value; this peak was found to be the —SS— of Cys6 and Cys127. In fact, the anomalous peaks of all S atoms except Cys204 and Met12 were greater than 4σ in height. Six anomalous peaks corresponding to bound chloride ions (Δ = 0.702) were also found along with those corresponding to S atoms (Table 4) and were originally included in the phase refinement as S atoms.

Lysozyme has eight cysteines and two methionines. Some noise peaks along with the real anomalous peaks were presumably found as top peaks because of the lack of accuracy of the initial phases and there may be also some unexpected anomalous scatterers in proteins. The peaks (>4σ) were usually used as those of anomalous scatterers. For lysozyme, the positions of the first 13 peaks (>4σ) were initially input to MLPHARE and treated as the positions of S atoms. The anomalous differences of the native data for lysozyme were used as the data for the second derivative to refine the position and anomalous occupancy of S atoms. The total number of reflections used was 4511. After ten cycles of refinement, the overall figure of merit increased from 0.48 to 0.67. The figure of merit showed more improvement at high resolution than at low resolution (Table 3). This resulted in significant improvement of the electron-density map. The map correlation coefficient of the electron-density map increased by 20% to 0.53 with the 2F_o −  F_c map of the final refined structure used as a reference map. Fig. 5 illustrates the difference of electron densities in the region Gln41–Asn44 in the presence and absence of S and Cl atoms as anomalous scatterers in the phase-calculation procedure.

Figure 5 Electron density for the residues of Gln41−Asn44 of lysozyme. The maps were computed using different phases. (a) SIRAS phases of one Au site. (b) MIR phases of one gold site and sulfur sites of protein. The maps are contoured at 1σ.

The improved phases produced an anomalous difference Fourier map with eight spherical and four strongly ellipsoidal densities. Since the quality of the electron density of lysozyme was significantly improved, resolving disulfide bonds into two individual S atoms was not necessary for the phasing calculation. When the electron-density map and anomalous difference Fourier maps were superimposed, two spherical and four ellipsoidal density peaks seemed to correspond to the S atoms of methionine and cysteine, as they overlaid the electron densities of side chains. These anomalous densities can be used as markers for chain tracing (Lehmann & Pebay-Peyroula, 1992; Hendrickson & Sheriff, 1987). Six spherical peaks in the anomalous difference Fourier map, corresponding to peaks 3, 5, 7, 8, 10 and 12 in Table 4, might arise from some other anomalous scatterers. They were located about 2 and 4 Å away from the side-chain and main-chain protein atoms. These peaks were nearly as strong as those attributed to the protein S atoms, which serve as an internal standard. Chloride ions were inferred to be the only species possible from the crystallization medium. The chloride ions were found in the same locations in the lysozyme structure (1lz8 ) in the PDB (Berman et al., 2000).

Diffraction data from a single mercury derivative and the native crystal of thaumatin were collected on a rotating-anode X-ray generator with Cu Kα radiation. The procedure used here was exactly the same as that used in phasing the lysozyme structure. The figure of merit of the SIRAS phases of the thaumatin structure was 0.39. The height of the first anomalous peak was 9.6σ (Table 4). The thaumatin sequence has 16 cysteine residues and one methionine residue. No obvious separation in peak height can be seen between peaks 17 and 18. The positions of the top 14 anomalous peaks (>5σ) were input to MLPHARE as the initial positions of S atoms when the anomalous difference of native thaumatin data was used as the data of the second derivative. The total number of unique reflections used was 9426. The overall figure of merit was improved by ∼46% to 0.57 by including these 14 anomalous signal peaks as S atoms in phase calculation. The overall map correlation coefficient increased by ∼8%. The better improvement of the figure of merit was also seen in the highest resolution shell (Table 3). Fig. 6(a) shows the electron density for the structure near Ala17 and Asp21 without any S atoms used in the phase calculation. A section of main chain could be mistakenly traced through the density between the side chains of Ser18 and Gly20. Fig. 6(b) displays a clear trend in the density of the main chain and well defined density for the Ser18 side chain.

Figure 6 Electron density for the residues of Ala17–Asp21 of thaumatin. The maps were computed using different phases. (a) SIRAS phases of one mercury site. (b) MIR phases of one mercury site and sulfur sites of protein. The maps are contoured at 1σ.

A new anomalous difference Fourier map displayed clearly eight strong ellipsoidal densities for eight disulfide bonds and one isolated spherical density for the one methionine sulfur after the phases were calculated including sulfur anomalous scattering. The first and fifth anomalous peaks in Table 3 corresponded to —SS— moieties. After replacing these —­SS— positions with individual S atoms, the overall figure of merit increased to 0.63. The overall map correlation coefficient rose by ∼15%.

Thus, it has been demonstrated in the examples of trypsin and thaumatin that resolving the —SS— of a disulfide bond into two individual S atoms is required to take full advantage of the strength of anomalous scattering signal of S atoms. It even may be essential in solving protein structures.