1. Introduction

The most commonly used methods to obtain experimental phases are the following.

(i) Isomorphous replacement, developed by Green et al. (1954). The phasing information is extracted from the differences in diffracted intensities between the native protein structure and one or several heavy-atom derivatives. Good isomorphism between the native and derivative crystal forms is essential for the success of IR experiments. (ii) Multi- or single-wavelength anomalous dispersion (MAD or SAD). This method exploits the differences in diffracted intensities arising from changes in the scattering properties of heavy atoms as a function of incident X-ray wavelength or energy around their absorption edges (James, 1948). The variation in scattering properties results both in differences between reflection intensities at different wavelengths (known as dispersive differences) as well as differences between Friedel-related intensities at the same wavelength (anomalous, Friedel or Bijvoet differences).1 (iii) Direct methods, based on direct analysis of the structure-factor amplitudes (reviewed by Usón & Sheldrick, 1999). Although direct methods are routinely used to extract initial phase information (i.e. the heavy-atom sites) necessary to proceed with anomalous dispersion or isomorphous replacement phasing, their application as a stand-alone method to solve protein structures is limited mainly by insufficient high-resolution diffraction from many crystals.

Anomalous dispersion is currently the fastest growing phasing method (Hendrickson, 1999; Ealick, 2000). Although the theoretical foundations of anomalous dispersion phasing were established even before those for isomorphous replacement (Bijvoet, 1949), the practical application of the method to macromolecular structure solution is a more recent development (Guss et al., 1988; Hendrickson, 1991). The reason for this time delay is the difficulty of the experiment from the technical point of view. While isomorphous replacement does not require a particularly sophisticated experimental setup, the development of adequate synchrotron beamline instrumentation was critical in exploiting the anomalous dispersion method to its full potential. The advances in beamline design make it possible in principle to solve new structures from a single crystal in a single experiment with no non-isomorphism problems.

Recent efforts to use anomalous differences measured at a single wavelength have proved that SAD phasing using solvent flattening (Wang, 1985) or direct methods (Fan et al., 1984) to resolve the SAD phase ambiguity can be successful at solving macromolecular structures (Dauter et al., 2002). SAD phasing is especially useful when the source or sample characteristics make multiwavelength experiments impractical and when lack of isomorphism rules out isomorphous replacement phasing.

Although dedicated synchrotron-radiation beamlines make it possible to maximize the anomalous signal in the data, the anomalous contribution to the total scattering factor f(λ) = f₀ + f^A(λ), where f^A(λ) = (λ) + i(λ) is intrinsically small compared with the elastic scattering contribution f₀. Collection of redundant data at different wavelengths can provide the desired accuracy, but it can result in an experiment several times longer than is required to collect a single complete data set. A longer data collection will result in a higher radiation dose absorbed by the sample and an increased probability of significant radiation damage. It has been demonstrated that ionizing radiation causes an expansion of the unit-cell dimensions (Ravelli et al., 2002; Murray & Garman, 2002) and can induce specific structural changes (Burmeister, 2000; Ravelli & McSweeney, 2000) even before the intensity of the diffracted intensities is significantly reduced. These effects result in a loss of isomorphism during the experiment. If the magnitude of the resultant errors in the calculated anomalous and dispersive differences is larger than the differences themselves it may become impossible to solve the structure, despite the use of cryogenic techniques (Garman, 1999). To reduce the total dose absorbed by the crystal during the experiment, we must make a careful choice of strategy aiming at acquiring a maximum of phasing information with a minimum amount of data. The optimal strategy should be based on the anomalous scattering properties of the sample and the characteristics of the beamline where the experiment is to be carried out.

2. Synchrotron beamline characteristics

The characteristics of the synchrotron beamline will determine to a large extent whether a particular data-collection strategy will be feasible or likely to succeed. The most relevant properties from the point of view of experimental phasing are the effective wavelength range of the beamline, the bandpass and the stability and reproducibility of the selected wavelength.

3. Optimal choice of wavelengths

In order to optimize both anomalous and dispersive wavelengths in MAD experiments, data collection at three wavelengths is necessary in the general case. Although the location of the absorption edge and the characteristics of the beamline, as described in §2, should ultimately decide exactly where to collect data, in many cases these wavelengths are as follows.

(i) A wavelength above the absorption edge (short-wavelength or high-energy side of the edge), often referred to as `peak wavelength' even when the edge of interest does not have a white-line feature. For L edges without a white line (Au, Hg, Pb etc.) the maximum is reached above the LI edge. This is also the optimal wavelength for single-wavelength experiments (SAD or SIRAS). (ii) The wavelength at the inflection point of the edge. In the case of L edges, the LIII edge is the one where the minimum is reached. (iii) A wavelength away from the edge (`remote wavelength'). The choice of the remote wavelength is discussed in more depth below.

In two-wavelength MAD experiments, the best strategy is to optimize the dispersive, rather than the anomalous differences (González et al., 1999; Peterson et al., 1996). This means that data collection at the inflection and remote wavelengths is preferred in this case.

4. Data redundancy and completeness

Experimental phasing will be more successful the more reflections are accurately phased. Often, a unique completeness of at least 90% is needed and even greater completeness is required for poorly diffracting crystals or low anomalous signal (González, 2003). The data sets must contain a high proportion of Friedel-related reflections. The Friedel completeness usually must be close to 100% for SAD phasing, where anomalous differences provide all the phase information. For MAD, the Friedel pair completeness can be lower. For most cases studied, values between 45 and 80% have been found to be sufficient for two- or three-wavelength MAD phasing (González, 2003). Thus, although the experimental phases will always be significantly better with collection of a complete Friedel set, this should not be strictly necessary when minimizing the radiation damage or finishing an experiment in a short time is the highest priority.

Additional data redundancy improves the experimental phases by decreasing the error in the merged data and thus in the calculated amplitude differences. Having said that, it is better to collect few good well resolved intense diffraction spots for each reflection than many poor ones that overlap with neighboring reflections or are barely above the background intensity of the image. Ensuring that the exposure time is adequate and the sample-to-detector distance is appropriate is important in order to obtain a high I/σ(I) for the measured intensities. For multiwavelength experiments, it is very important to collect each reflection under similar conditions at each wavelength (Hendrickson, 1985, 1991). This is easily achieved by the standard practice of using the same crystal and oscillation range for data collection. This procedure causes systematic errors in the measured intensities to partially cancel out when calculating the dispersive differences. Achieving a systematic error reduction to the same extent for anomalous measurements appears to be more difficult. Setting the crystal so that Bijvoet-related reflections are collected in the same diffraction image is not always possible. Collecting an `inverse-beam' oscillation pass (with the crystal rotated 180° with respect to the original pass) can lengthen the experiment considerably, particularly when the crystal symmetry and orientation makes it possible to optimize Friedel and unique completeness with the same rotation angle (Dauter, 1997); in this particular case, an inverse-beam pass will most likely be superfluous for MAD phasing. For unfavorable crystal symmetry and orientations, extremely small anomalous signals and for SAD phasing inverse-beam collection is useful, although sophisticated scaling methods (Evans, 1997; Friedman et al., 1995) make it possible to obtain a similar result when collecting all the needed data in a continuous rotation wedge. As a precaution against radiation damage, inverse-beam data collection should only be undertaken for a MAD experiment once the pass providing good unique completeness has been collected at all the wavelengths (Rice et al., 2000).

5. Data-collection sequence

For MAD data collection it is possible to collect a full data set at each wavelength at once or collect the data progressively at all wavelengths in wedges of a few degrees. The advantage of the first method is that having a complete or almost complete data set may facilitate structure solution with just one wavelength if severe radiation damage takes place or if the data collection has to be interrupted for any reason. The best wavelength to start with would be the `peak' wavelength in order to provide optimized SAD phasing. On the other hand, if the structure cannot be solved by SAD with the data available, this strategy often prevents use of the dispersive differences, either because not enough reflections have been collected or because the radiation damage makes it impossible to scale together the intensities measured at different wavelengths.

Data collection in wedges results in better preservation of the dispersive differences because the effects of radiation damage would be similarly spread over the data at all wavelengths and it would be easier to scale the data sets and treat the radiation damage like an additional source of systematic error. However, wedge data collection at three wavelengths will demand the collection of more frames than are actually needed to solve the structure with two or one wavelengths (González, 2003). For low-symmetry space groups, there would be a high risk of ending up with three incomplete data sets from which no interpretable maps could be calculated. A good compromise would be to collect complete data sets in wedges at two wavelengths and then, if still possible, continue with collection at a third wavelength. As stated in §3, the best wavelengths to collect simultaneously would be the inflection and the remote wavelengths.

6. Data resolution

Data collection to the maximum diffraction resolution limit improves map interpretability, facilitating automated model building (Morris et al., 2002) and making it possible to observe fine structural details resulting from unbiased experimental phases (Burling et al., 1996; Schmidt et al., 2002). When the purpose of the experiment is to solve the structure de novo, however, high-resolution experimental phases are not necessary to obtain high-resolution maps. A more time-efficient strategy is to collect medium- or low-resolution data for phasing and use phase extension to extend the phases to the resolution limit of the crystal. This is straightforward when the high-resolution data are collected from the same crystal (collection at the last wavelength in a three-wavelength MAD data would be an ideal point to try to extend the data resolution). However, if the crystal deteriorates quickly, data from a different crystal or the native can also be used. Lack of isomorphism is usually not a concern once good experimental phases have been obtained. In the most difficult cases, molecular replacement is often successful in locating the molecule in a different cell or space group. This approach has been successful with experimental phases to a resolution as low as 5 Å (Bass et al., 2002).

7. Minimizing radiation damage: SAD or two-wavelength MAD?

In cases when the crystal is very sensitive to radiation damage or there is a limited time for the experiment, both one- or two-wavelength experiments will be a better option than the three-wavelength counterpart because they require fewer data for phasing. As Table 3 shows, for many examples SAD and two-wavelength MAD require a similar amount of data for phasing, making it difficult to predict which will be the best strategy to shorten the experiment on a case-by-case basis. In terms of total dose absorbed during the experiment, which appears to be the ultimate factor determining radiation damage (Garman & Nave, 2002), two-wavelength data collection at the inflection and remote wavelengths offers the advantage of avoiding data collection at the maximum wavelength, which is where the maximum absorption per incident photon takes place. This suggests that this strategy would be better than SAD, where the entire collection is performed at a wavelength with a high value.

Regarding map quality, MAD experiments also appear to be the better strategy. Although SAD maps experience a relatively greater improvement after density modification (Table 3), SAD phases are more likely to lack the accuracy required to determine an accurate molecular envelope. This translates into disconnected density areas in the maps after solvent flattening (see Fig. 3).

On the other hand, a single-wavelength experiment may be further shortened and therefore the preferred strategy to reduce radiation damage if the SAD method is complemented by existing phase information from additional sources (for example, with isomorphous differences with a native data set, direct methods (Langs et al., 1999; Foadi et al., 2000) or a partial model of the structure.

8. Summary

The optimal strategy for anomalous dispersion experiments depends on the properties of the sample, beamline characteristics and ultimately on the purpose of the experiment. When the data-collection objective is to obtain a very accurate picture of structural details, a fairly redundant (with an average multiplicity of 4 or higher) data collection to high resolution at three wavelengths is the best option.

When radiation damage is a serious concern (small, weakly diffracting, very radiation sensitive or low-symmetry crystals), a reasonably strategy would be to collect a complete data to low resolution at the remote and inflection wavelengths in wedges of a few degrees at each wavelength. The total oscillation range would be chosen to maximize the unique completeness of the data and when the symmetry allows it, the Friedel-pair completeness. The Friedel completeness can then be optimized for at least one of the wavelengths if the crystal is still diffracting well once a complete set of phases is secured. The phases can be further improved by collection of the peak wavelength or additional data redundancy at the first two wavelengths. Finally, collection of additional data to higher resolution might also be advantageous. A fully capable MAD beamline, delivering a very stable beam over a sufficiently wide wavelength spectrum, is required for this strategy to give optimal results.

Another alternative procedure would be data collection at the peak wavelength for SAD phasing. In this case, Friedel completeness is more important than for the two-wavelength MAD strategy. Selecting a strategy which maximizes the number of Friedel-related reflections in the least time is important and inverse-beam mode collection can be very useful. If the stability of the beamline cannot be guaranteed or if the energy range available is not wide enough to access a good remote energy, this strategy would be the preferred option. The two-wavelength MAD strategy will provide better maps, comparable in quality to three-wavelength MAD phases and it is possible that by avoiding data collection at the maximum , the dose absorbed by the crystal will also be minimized, although more experiments are necessary to prove this.