2.1. Hardware improvements

One of the most time-consuming, and important, steps in the X-ray centring process is the initial mesh scan that locates and characterizes the crystal. When first implemented on MASSIF-1, a rotation of ω was included in the scan in order to avoid still images that can cause problems in processing. This implementation required that triggering of the acquisition of images was instigated by the ω axis, meaning that each line of the mesh was treated as a separate data collection. The preparation required between data collections led to additional time being taken for the scan. We have now implemented a scan that includes no rotation of the ω axis and only requires movements of the high-precision Y/Z stage beneath the RoboDiff (Nurizzo et al., 2016). This allows the triggering of acquisition to be made by the motor position, allowing the whole mesh to be launched as a single data collection (Aishima et al., 2010). This method was implemented in 2017, and analysis of data for two-month periods before and after its implementation showed that the time required for these scans has been reduced by an average of 1 min (Fig. 1).

Figure 1 The decrease in the time taken to perform the mesh scan after hardware improvements. Log-normal distribution of the elapsed time for mesh scans using the former protocol (black) and the new fast mesh (blue) for the two months preceding and following the implementation of the new protocol.

2.2. Dynamic beam sizing

One of the benefits of running a completely automated system is the ability to collect large amounts of data from samples and to use these data to improve strategies for data collection. We initially realized that the volumes of all crystals were determined during the X-ray centring routine, and this information was subsequently included in the strategy calculation, having the largest effect on the calculation of the maximum dose given to a crystal during data collection (Bowler et al., 2016; Svensson et al., 2015). Additionally, these measurements provided a distribution of crystal volumes, allowing us to use a default beam diameter of 50 µm, as this was the crystal dimension that was most frequently observed on the beamline. A specific beam diameter can be selected on a per-sample basis in the diffraction plan in ISPyB (Delagenière et al., 2011); however, this option is usually used when users are sure that the crystal volumes are significantly smaller than the default beam diameter (Fig. 2). Using the information gathered during the mesh scan, we can determine an optimized beam diameter. By accurately matching the beam diameter to the crystal, it has been shown that the background can be dramatically reduced (Moukhametzianov et al., 2008). This is particularly striking when the crystals are very small (Evans et al., 2011), but if a crystal is large the additional diffraction power should not be wasted. This also has to be balanced with the degree of variability within each crystal (Bowler & Bowler, 2014; Bowler et al., 2010; Pozharski, 2012).

Figure 2 Beam-diameter selections by users and the algorithm in 2017. The number of times a beam diameter was selected either by the user (black) or automatically (blue) is shown. 6877 data collections were performed with the beam diameter at the default value of 50 µm; as this is not changed by the software, the value is not shown.

We have now introduced a dynamic beam-diameter adjustment into all workflows running on MASSIF-1 where no value has been pre-selected by the user. The X-ray centring routine determines the crystal position relative to the beam and the crystal dimensions, and also determines the best homogenous volume within the crystal. The centre of mass of this volume is then used as the centring position and it is the dimensions of this volume that are used to select the beam diameter. There are five beam diameters available on MASSIF-1, 100, 50, 30, 15 and 10 µm (Bowler et al., 2015), and the smallest vertical volume dimension is used to select the aperture that matches most closely. In this way, the largest volume can be illuminated without increasing the background or `contaminating' the diffraction from variable areas. All steps during X-ray centring are performed with the 50 µm aperture. As the scans are performed with an overlap, the smallest dimension that can be measured is ∼20 µm, meaning that the 10 µm option is only used when selected by the user. Once X-ray centring is completed, the new aperture diameter is selected and characterization images are collected using this diameter. The strategy calculation will include the new flux for the aperture as well as the crystal volume determined during the centring procedure. Since introducing the adaptable beam diameter the system has selected the 30 µm beam size most frequently (Fig. 2), followed by the 100 and 15 µm diameter apertures. Half of all data collections are performed with a diameter of 50 µm, reinforcing its choice as the default value.

Can the advantages of dynamic beam adjustment be demonstrated in a consistent manner? It is always problematic to clearly show that one data-collection method is better than another. However, here we show that dynamic beam sizing makes a significant difference for weakly diffracting samples.

We initially tested the adaptive beam-diameter protocol on crystals of the β₁-adrenergic GPCR (Warne et al., 2008). These crystals diffract weakly, exhibit considerable variation in diffraction quality and tend to form as thin plates or needles. A total of 30 crystals were run on MASSIF-1, first using the classic protocol (Svensson et al., 2015), where a 50 µm beam diameter is the default, and then running a second protocol on the same crystal including the adaptive beam diameter. In many cases data sets were collected from the same crystal using both procedures; however, for some cases data sets were only processed where the beam diameter had been reduced to match the crystal size. Table 1 shows crystal dimensions and data-processing statistics for crystals where an automatically processed data set was produced (eight out of 30 crystals). Where crystals were of sufficient quality, data sets were mostly produced using both protocols, but it is for the smaller crystals that a difference is discernible. For crystals with a y dimension below 30 µm the data sets produced have a higher 〈I/σ(I)〉 or resolution limit (Table 1; adrcpt-For42, adrcpt-For48, adrcpt-For59 and adrcpt-For67) even though the crystals had already been exposed. For one of these crystals, adrcpt-For42, the data set collected with the smaller beam is significantly better (Table 2).

What effect has the protocol had on overall data collection? In order to analyse the difference, we looked at the average signal-to-noise ratios, 〈I/σ(I)〉, for all data sets processed automatically (Monaco et al., 2013; Vonrhein et al., 2011; Sparta et al., 2016; Winter, 2010) in the year preceding and following the introduction of the protocol. This amounts to data for approximately 22 000 samples. Fig. 3 shows the distributions of overall 〈I/σ(I)〉 for the data sets. While the distributions are similar for high 〈I/σ(I)〉 they diverge at lower values, with a significant shift lower for the adaptive beam-diameter data sets. The average before the procedure was put in place was 14.4 and it decreased to 12.2 after, with modal values of 8.55 before and 5.9 after (Fig. 3). We initially found this surprising as we had expected a general increase in 〈I/σ(I)〉. However, given the effect seen on the GPCR crystals, the distribution change is understandable. While the beam diameter is increased or decreased to match the diffraction volume, the 〈I/σ(I)〉 values for strongly diffracting crystals will remain the same given the dose to achieve a certain resolution without radiation damage, taking the crystal volume and changed flux into account. However, it was for the weakly diffracting crystals that the adaptive beam diameter had the most significant effect. Whether the diameter was increased or decreased, there was a large shift in the number of data sets that were processed that had rather low 〈I/σ(I)〉 after the adaptive beam-diameter protocol was implemented. This implies that by introducing this routine into the regular data-collection workflow, the beamline is able to increase the number of data sets processed from these samples by reducing the background noise.

Figure 3 Distribution of overall 〈I/σ(I)〉 for data sets processed in the year preceding implementation of the dynamic beam aperture (black) and the year after implementation of the dynamic beam aperture (blue). There was a significant shift in the number of data sets processed with lower 〈I/σ(I)〉 after dynamic beam-diameter adjustment was introduced.

2.3. Improved error handling

The correct handling of errors is paramount in an automated system. We initially introduced many error-handling routines at both a high level, such as the collection of a data set with default settings when indexing fails (Svensson et al., 2015), and a low level, such as escaping from small robotic errors (Nurizzo et al., 2016). After processing more than 42 000 samples we have now been able to observe most errors that may be encountered and have extended the processes to catch them.

2.3.2. Low-resolution data collection

Calculating an optimized strategy for low-resolution (>4 Å) data collection can be problematic, but is very important as useful information can be extracted from carefully collected data at these resolutions. Here, we used information from low-resolution data collections that had already been performed to improve how the routines deal with these samples. Unless a resolution is specified by the user, all mesh and characterization images are collected at 2 Å. If the predicted resolution extends beyond the corners of the detector (1.42 Å) the detector is moved to the new resolution and a further characterization is launched. This allows the highest possible resolution to be obtained and ensures that characterization is performed at an optimal detector distance (Svensson et al., 2015). However, for low resolution, the resolution determined by BEST is used and data collection proceeds according to the determined strategy. It would seem sensible that if very low diffraction resolution is determined, the characterization images should also be re-collected at this resolution. We therefore introduced a routine to re-collect the characterization images at 4 Å resolution for all samples where the determined resolution is below this value. This allows the distribution of intensity to be better estimated and should lead to better strategy calculations (Popov & Bourenkov, 2003).

By analysing the relationship between the predicted and the determined resolution from all data sets collected so far we can also try to improve the quality of the data collected on MASSIF-1 (Fig. 4). The distribution shows that the agreement is excellent, usually slightly underestimating the achievable resolution. This may well be due to the difference in the criterion for resolution-limit determination, which is 〈I/σ(I)〉 for characterization and CC_1/2 for complete data sets. A clear trend is that the strategy tends to underestimate the resolution for weakly diffracting crystals (Fig. 4). This is due to the difficulty in estimating a B factor at very low resolution. In addition to re-collecting the characterization images, the procedure now always sets the detector resolution to 4 Å for all data collections where the predicted resolution is lower than this value. In this way, we hope that higher resolution data will not be missed, if possible, as complete data to 4 Å resolution are more important than suboptimal data collection at 7 Å resolution.

Figure 4 Scatter plot of predicted resolutions for data collections against the resolutions determined by autoprocessing for all crystals processed so far on MASSIF-1 that resulted in a strategy and an automatically processed data set. The red line shows perfect agreement between predicted and achieved resolution and the gradient shows the density of data points.

2.4. Multiple-crystal and multiple-position data-collection strategies

The possibility to input a number of positions from which to collect data was introduced into the diffraction plan early in the operation of MASSIF-1 (Bowler et al., 2016; Svensson et al., 2015). This has allowed complete data sets to be collected either from separate crystals contained on a sample support or from multiple positions within a single crystal and has proved to be a popular option, with many samples received on MASSIF-1 having between two and 12 positions requested (Fig. 5). While extremely useful, this protocol does not cover the scenario where radiation-sensitive samples can benefit from a large dose being spread over multiple partial data sets, a procedure known generally as helical data collection (Flot et al., 2010) and that has been shown to be beneficial in many cases (Polsinelli et al., 2017). Radiation damage can often make it difficult to collect complete data, or data with sufficient anomalous signal, from a single crystal or a single position within a crystal. A new experiment type is now available on MASSIF-1 that will automatically collect multiple partial data sets from positions within a homogenous volume of a crystal. This can lead to improved data quality, increased resolution and higher anomalous peaks. This is the first fully automated helical data-collection protocol that also accounts for the heterogeneity of crystal diffraction quality.

Figure 5 Number of positions selected by users for multiple-crystal and multiple-position data collections in 2017. Multiple-position data collections were requested for 9% of samples.

Multiple-position/crystal experiments are selected either by specifying a number of positions in the diffraction plan for the sample or by requesting MXPressP or MXPressP_SAD (for a pseudohelical strategy or a pseudohelical with SAD strategy, respectively) in the `experiment type' field for the required samples in ISPyB (Delagenière et al., 2011). These new experiments operate in much the same way as the usual automated workflows on MASSIF-1 in that all of the current features are retained, such as resolution selection, strategy input, diffraction-volume calculation and smart beam sizing. If multiple positions are selected, the automesh algorithm, which determines the area to scan to locate the crystal (Svensson et al., 2015), uses the widest orientation of the sample support, rather than the smallest, in order to avoid overlapping crystals or positions in ω (Fig. 6a). After the mesh scan is complete, the map is analysed either for the number of peaks requested or, if no positions are specified for MXPressP, a default value of five. In the original procedure, a diffraction volume was selected by applying a threshold (50% of the maximum) to the diffraction signal and determining a centre of mass over connected regions (Svensson et al., 2015). For multi-position experiments the same thresholding is applied but is iterated over the whole crystal volume using the next highest point to start after each volume has been defined (Fig. 6). The determined volumes must be within 10% of the value of the peak for multiple-crystal data collection or 70% of the second highest peak for pseudohelical data collection. Additionally, any peaks that are closer than a beam diameter together or that will overlap in ω are eliminated. The number of allowed detected volumes is then specified by a comment in ISPyB. If multiple crystals have been selected, each point is then centred as usual and a complete data set is collected according to user input requirements. If MXPressP is selected, the top volume is centred and four characterization images are collected. A strategy is then calculated for a complete data set and the data are collected; for MXPressP_SAD the strategy is calculated for structure solution by SAD (Svensson et al., 2015). As usual, in the case of indexing failure a default data collection of 180° is collected (240° for triclinic and 360° for SAD data collection). Once completed, a strategy is then calculated to collect a complete data set from the N positions determined in the mesh scan that are within 70% of the value of position 2. The strategy, as usual, accounts for the volume of the positions, beam diameter etc. Again, in the case of a failure in indexing default data collections are performed at each position using a full dose and a rotation range determined by 180°/N (240°/N for triclinic and 360°/N for SAD). Each partial data set has a 5° overlap with the next to assist with scaling.

Figure 6 Multiple-crystal and multiple-position data collection. (a) automesh scan of a CrystalDirect (Zander, Hoffmann et al., 2016) support that has three crystals mounted. The widest orientation of the mount was selected. (b) Mesh scan of the mount shown in (a). Three positions were requested and three were detected. (c) Mesh scan for a βPGM crystal where a native pseudohelical data collection was requested, five positions were detected and a beam diameter of 30 µm was selected. (d) Mesh scan for an FAE crystal where a SAD pseudohelical data collection was requested, five positions were detected and a beam diameter of 100 µm was selected.

We are, for the moment, remaining cautious with pseudohelical data collection by collecting a full single-position complete data set from the best volume. The reason for this is twofold: (i) we have observed that crystal heterogeneity can often lead to a number of the partial data sets being of varying quality despite the stringent quality threshold that we have implemented and (ii) we are eager to compile a large amount of data on how and when helical data collection is superior to single-position data collection. This is extremely important as, so far, the few studies on helical data collection have not considered crystal heterogeneity (Bowler & Bowler, 2014; Bowler et al., 2010). Strategy parameters and data-processing statistics for two example systems using the pseudohelical routines for native and SAD data collections are shown in Table 3. Two proteins that tend to form crystals with a needle morphology were selected: β-phosphoglucomutase (βPGM) in an open conformation (Baxter et al., 2010) (Fig. 6c) and ferulic acid esterase (FAE, Fig. 6d), which contains eight Se atoms and five Cd²⁺ ions (Prates et al., 2001) with a significant anomalous signal at the MASSIF-1 wavelength of 0.966 Å. Comparing the single-position data collection with the merged multiple-position data sets shows that in these cases there is not a significant increase in data quality. However, in the SAD case the helical data set has considerably higher 〈I/σ(I)〉, anomalous correlation co­efficients and mid-slope of anomalous probability than the single-position data set. For the native data sets, the single position is slightly better. This may reflect the heterogeneity within the crystal and highlights the importance of this parameter in whether to select helical versus single position for a certain project. The ability to automatically run clustering algorithms (Giordano et al., 2012; Zander, Cianci et al., 2016) on these partial data sets may also improve the quality of the final data. We hope that by being able to analyse the variation in diffraction quality, and compare single-position data with multi-position data from the same crystal, a more general strategy for these types of data collection may emerge.