research papers
Suite of three protein crystallography beamlines with single superconducting bend magnet as the source
aAdvanced Light Source, Lawrence Berkeley National Laboratory, 1 Cyclotron Road, Berkeley, CA 94720, USA, bEngineering Division, Lawrence Berkeley National Laboratory, 1 Cyclotron Road, Berkeley, CA 94720, USA, cPhysical Biosciences, Lawrence Berkeley National Laboratory, 1 Cyclotron Road, Berkeley, CA 94720, USA, dDepartment of Molecular and Cell Biology, 229 Stanley Hall, University of Berkeley, Berkeley, CA 94720, USA, and eBiochemistry/Biophysics and Pharmaceutical Chemistry, University of San Francisco, San Francisco, CA 94143, USA
*Correspondence e-mail: aamacdowell@lbl.gov
At the Advanced Light Source, three protein crystallography beamlines have been built that use as a source one of the three 6 T single-pole superconducting bending magnets (superbends) that were recently installed in the ring. The use of such single-pole superconducting bend magnets enables the development of a hard X-ray program on a relatively low-energy 1.9 GeV ring without taking up insertion-device straight sections. The source is of relatively low power but, owing to the small electron beam emittance, it has high
X-ray optics are required to preserve the and to match the illumination requirements for protein crystallography. This was achieved by means of a collimating premirror bent to a plane parabola, a double-crystal monochromator followed by a toroidal mirror that focuses in the horizontal direction with a 2:1 demagnification. This optical arrangement partially balances aberrations from the collimating and toroidal mirrors such that a tight focused spot size is achieved. The optical properties of the beamline are an excellent match to those required by the small protein crystals that are typically measured. The design and performance of these new beamlines are described.Keywords: X-ray beamline; protein crystallography; superbend; invar mirror; double-crystal monochromator.
1. Introduction
The Advanced Light Source is a relatively low-energy third-generation synchrotron optimized for the production of VUV and soft X-ray light from undulators. However, it was realised early on in the development of the ALS that a multipole wiggler source with good optics would provide excellent performance for protein crystallography at up to 15 keV. Based on the needs of the local community, a wiggler beamline with one MAD (multiwavelength anomalous diffraction) central line and two fixed-wavelength side stations was constructed, with initial commissioning of the central station late in 1997 (Earnest et al., 1996). The success of this beamline 5.0.2 MAD station generated calls from the community for additional beamlines. Because additional straight sections for wigglers were not available, an alternative solution was required. One of the solutions considered was based on a research and development project at Lawrence Berkeley National Laboratory to produce superconducting replacements for some of the bend magnets of the ALS (Robin et al., 2001).
This early work showed that a magnet with a peak field of 6 T could be built and operated reliably in a storage-ring environment. The design allowed for four beamlines per magnet, with inboard and outboard pairs of tangent points at field strengths of 5.29 and 4.37 T. These fields increased the −9 to 1.2 × 10−8 m rad, but running with a small dispersion in the straights was shown to reduce this to close to the original value (6.8 × 10−9 m rad). Because installation of the high-field magnets reduced the symmetry of the machine from 12 to 3, significant additional work had to be done to ensure stable dynamics of the machine with good lifetime and injection efficiency (Steier et al., 2001).
from 3 keV for a 1.27 T normal conducting magnet to 11.5 and 12.7 keV, respectively. Introducing high-field bend magnets into the ALS lattice increased the horizontal emittance. To compensate for this effect, the number of high-field magnets was limited to three. This design resulted in a doubling of the horizontal emittance from 6 × 10A further milestone in establishing the viability of this source for protein crystallography was the validation of the radiation damage model of Henderson (1990) by Glaeser et al. (2000). This work showed that for `typical' crystals with 10 nm unit-cell size, at a wavelength of 0.1 nm, an integrated incident of 1010 photons µm−2 caused sufficient radiation damage to reduce the intensities of diffraction spots at 0.25 nm resolution by 50%. Typical sizes of protein crystals are 100 µm and the from a superbend source with optimized beamline through a 100 µm pinhole is calculated at ∼4 × 1011 photons s−1 with a horizontal convergence onto the sample of 3 mrad. These parameters indicate that the photon dose limit will be reached in ∼200 s. Considering the number of frames that could be recorded in this time, the readout time of state-of-the-art detector systems, and the time required to mount and align crystals, this performance was considered sufficient for the majority of systems that the community wished to study. However, it needs to be pointed out that the idea of a `typical' crystal is not particularly valid. Radiation damage in cryofrozen proteins illuminated with X-rays is actually quite variable. Although the Henderson limit reflects an average, different types of crystals differ in radiation damage rates by at least a factor of ten either way (Garman & Nave, 2002).
For crystals with very large unit cells where extreme collimation is required, the characteristics of undulators at high-energy storage rings offer the best performance. Even in these challenging cases, however, the measured performance of the superbend beamlines at the ALS is significantly higher than the original ALS 5.0.2 wiggler beamline that has been extensively and successfully used for the study of several large-unit-cell problems including the ribosome structure (Yusupov et al., 2001).
Based on the expected characteristics of the superbends and the calculated performance of the optical systems, a suite of three near-identical beamlines have been built over the last three years in sector 8 of the ALS. The design and performance of the beamlines and end-station systems are reported here.
2. The superconducting single-dipole bend-magnet source
The ALS storage-ring lattice is 12-fold symmetric with the basic magnet lattice of the triple-bend achromat type (LBNL, 1986). Three of the 36 1.27 T warm 10° bending magnets (critical energy = 3 keV) were replaced by 6 T superconducting 10° bending magnets (critical energy ≃ 12 keV) (Robin et al., 2002; Tamura & Robinson, 2002). Three symmetrically located sectors of the 12 sectors of the ALS were modified to accommodate the high-field magnets. A schematic of the modification is shown in Fig. 1. The central dipole, B2, in the sector was replaced by a superbend. The warm dipole magnets have a radial magnetic gradient and thus have a quadrupole focusing component. The superbend is a plain dipole, and two new quadrupoles were added on either side of the superbend to replace the vertical focusing provided previously by the gradient field. The superbend magnets themselves are of a warm bore construction, and they fit over slots machined into the existing sector arc chamber. A closed-cycle Sumitomo cryocooler was used to cool each magnet to liquid-helium temperature, eliminating the need for additional cryogens. In the event of a cryocooler failure, the system can be run from an external liquid-helium supply. The vertically integrated synchrotron power output from the superbend source is 58 W (horizontal mrad)−1 (400 mA)−1 at 1.9 GeV. The electron source size is approximately 230 µm × 30 µm full width at half-maximum (FWHM).
Retrofitting the storage ring with superconducting dipoles was the first ever operation of this type carried out on an operating synchrotron radiation source. The superbends are an essential part of the ring lattice and problems associated with them affect all users of the ring. The installation process involved two six-week shutdowns. All major components of the project except the superbend magnets (including the additional quadrupole magnets, cryogenics and control systems) were installed in the first shutdown. The superbend magnets were installed during the second shutdown. Extensive beam-dynamics studies were carried out beforehand, and all systems were modeled and tested prior to installation. The commissioning proved to be very successful. The first beam was injected within five minutes of the first attempt, and 100 mA was achieved within the first hour. After more than a year of use, the superbends appear transparent to the rest of the users on the ring.
3. Beamline design
The beamlines were designed to have the highest . It consists of the source, a vertically deflecting plane parabolic collimating mirror {grazing angle = 4.5 mrad, acceptance = 1.5 mrad × 0.5 mrad [horizontal (h) × vertical (v)]} that provides parallel radiation (in the vertical) for a double-crystal monochromator (two flat crystals), followed by a toroidal focusing mirror, the sample and back stop. For beamline 8.2.2 the various distances of the beamline components from the source were 6.5, 16.5, 19.53 and 29.3 m for the plane parabola, monochromator, toroid and sample, respectively. The two other beamlines use slightly different distances for spatial reasons, but are essentially identical. Such optical arrangements have been used extensively on second-generation sources where the larger source size reduces concerns about the large aberrations of the image due to the astigmatic nature of the source (infinity in the vertical and real in the horizontal, see Appendix A).
possible through a 100 µm-diameter pinhole with a 3 mrad convergence angle in the 6–16 keV energy range, consistent with reasonable cost and robust performance. Stable performance and rapid beam optimization were very important design considerations, given the expected high volume of use and rapid turnover of user groups. The 100 µm pinhole represents the typical size of protein crystals produced nowadays. The beamlines were also optimized for MAD crystallography that requires precise and rapid switching of X-ray energy with reproducible beam intensity through the pinhole. The beamline design is shown schematically in Fig. 2We found by ray tracing of perfect optics (optical slope errors = zero) using Shadow (Lai & Cerrina, 1986) that, when the toroidal mirror is used with parallel illumination in the vertical direction and a 2:1 demagnification in the horizontal, the main aberrations cancel and a high-quality image results. This is shown in Fig. 3, which shows the ray-traced focus for different demagnifications of the M2 toroid. Even though the horizontal and vertical demagnification reduces from left to right across the figure, the fidelity of the focus is optimum at a demagnification close to 2.0. Current work (Howells et al., 2004) (see Appendix A) indicates that this is due to the complete elimination of astigmatic coma for the 2:1 horizontal demagnification case. Using an electron source size of 230 µm × 37 µm FWHM (h × v), the focused spot size is ray traced to be 150 µm × 63 µm FWHM (h × v) with a beamline acceptance of 1.5 mrad × 0.5 mrad (h × v). Because diffraction-limited imaging with horizontal and vertical demagnifications of 2.0 and 0.62, respectively, should produce an image of size 115 µm × 48 µm FWHM (h × v), this optical layout results in some loss. With the sample phase space underfilled in the vertical, this loss is not significant. Moreover, the increase in exposure time needed to offset the reduction in is more than offset by the operation simplicity associated with the mechanical robustness of the design.
Other optical designs were considered. In particular, the leading alternative design comprised a standard sagittally focusing crystal arrangement with a vertically deflecting plane parabolic collimating mirror (as above) followed by a double-crystal monochromator (first crystal flat and second crystal sagittally focusing) and a plane parabolic focusing mirror. This design yielded an excellent theoretical optical focus. With 1:1 horizontal and 2:1 vertical focusing, a spot profile at the sample of 239 µm × 12 µm FWHM was ray traced. This is essentially just the geometrical source size, indicating that aberrations are very low in this design. The theoretical
at the image was about a factor of two better than the mirror-focused solution we adopted. Considerable discussion was put in to which of the two designs to implement. The very thin and dynamic nature of the sagittally focusing crystal was considered a major drawback, because this design would require significant operational care to ensure peak effectiveness all the time, especially during MAD scans requiring frequent energy changes. Instead of choosing this theoretically perfect design, we adopted the mirror-focused solution owing to its greater simplicity and robustness. It should be noted that the focusing of the mirror-focused solution can be improved to give a more theoretically perfect image, but at the expense of a non-toroidal M2 mirror. For instance, by making the M2 mirror a bent cone, near-perfect imaging can be achieved. We believe that the increasing capabilities of optical manufacturers through precise measurement and programmed polishing will make this a viable solution for a future upgrade.3.1. Optics
To retain the −1/2). Taking into account angle doubling on reflection and the 10 m image distance from M2, the tangential slope error budget for each of the three elements is 1.8 µrad FWHM (0.8 µrad r.m.s.). This specification is quite challenging but, as the rest of this section will show, it is practical with current water-cooled optical technology.
of the source, the optical slope errors need consideration. Tangential slope errors of all the optics will degrade the vertical image size. Sagittal slope errors have minimal effect on horizontal image size owing to the grazing-incident nature of the optics. Tangential slope errors of the M2 toroidal mirror will degrade the vertical image size by the product of the mirror-to-focus distance and twice the slope error. For the upstream optical elements, the effect of slope errors is to disperse the rays entering the toroidal focusing element. These photons will be focused in the vertical and differ from the correct focus by the product of the angular deviation and the M2 mirror-to-image distance. Therefore, slope errors on all four optical elements can contribute equally to degrading the focus. Thermal distortions will affect the slope errors of the M1 mirror and the first crystal. Manufacturing defects will affect the slope errors of the M1 and M2 mirrors. The second crystal, if mounted strain free, can be considered perfect for the slope error analysis. Ray tracing of slope-free optics indicated a vertical spot size of 150 µm × 63 µm FWHM at the typical image distance from M2 of 10 m for the three beamlines. If we are prepared to tolerate an optical slope error equal to the calculated theoretical vertical spot size, then the tangential slope error of the optics can contribute 63 µm FWHM; this leads to a vertical spot size some 1.41 times larger, which at 89 µm is still within the specification of 100 µm. If we assume that the three elements noted above contribute equally in a quadratic manner, then the slope error image contribution for each element would be 36 µm FWHM (63 × 3The M1 plane paraboloid mirror was made from a flat nickel-plated invar mirror bent to the shape of a plane parabola by means of a mechanical bender. Adequate cooling was achieved using five 6 mm holes, gun-drilled down the length of the mirror with a skin thickness of 2.5 mm. End caps were simply welded over the ends. The use of complicated water-to-vacuum joints was avoided by using two upstream 125 µm-thick beryllium windows to separate the storage ring and beamline vacuums. The invar used (36% Ni + 64% Fe) has a very low coefficient of −7 K−1). This stability allows it to perform favorably with an absorbed total heat load of 26.7 W, despite its rather poor (10.4 W m−1 K−1). Peak power density absorbed was 0.007 W mm−2 on-axis. A finite-element analysis of the slope error deviation indicated that it would change by 0.7 µrad r.m.s. between no beam and full beam (400 mA). Given that the ALS operates between 200 and 400 mA and that the thermal bump is monotonic (i.e. the slope deviation can be corrected by re-bending M2), this thermal bump was considered satisfactory.
in the neighborhood of room temperature (5 × 10The grazing angle used was 4.5 mrad, with a 8 nm coating of rhodium over 25 nm of platinum. The reflectivity of this bilayer is shown in Fig. 4, along with the reflectivity of single layers of rhodium and platinum at the same grazing angle. The reflectivity cut-off of this bilayer is extended by ∼2.5 keV past that for a simple rhodium mirror, because the harder radiation penetrates the rhodium and reflects from the platinum underlayer. The L edges of the platinum are highly suppressed, because at this lower energy the X-rays reflect principally from the upper rhodium surface. This bilayer concept enables higher mirror performance at a given grazing angle with only a minor increase in coating cost.
The invar mirrors were delivered from the manufacturer in two lots. The first lot, with slope errors of 1.3–1.6 µrad r.m.s. and a finish of 1.3–1.7 nm r.m.s., did not meet the required specification. To meet the construction schedule, however, they were pressed into service with hopes that the second batch would be more promising. The second batch, however, was shown by the ALS metrology group to have blisters on the surface due to nickel delamination from the invar substrate. This delamination was caused by improper cleaning and surface preparation. After a detailed review of how these mirrors should be fabricated (Howells et al., 2002), new optic vendors (InSync) and plating vendors (Acteron) were contracted to build a third batch of mirrors. Because this invar mirror technology was new to synchrotron radiation optics, we adopted in parallel a more conservative engineering strategy. This fall-back strategy employed a conventional side-cooled silicon mirror design. Cooling was achieved using water-cooled copper bars held along the mirror sides with a 50–100 µm gap filled with gallium–indium–tin eutectic liquid metal. Finite-element modeling indicated that this arrangement produced identical performance to the internally cooled invar mirrors with regard to the thermal bump, if the assumption was made that the of the mirror to the cooling-plate liquid-metal interface was negligible. Metrology measurements indicated that both the new batch of invar mirrors and the silicon mirrors met specifications. Beamline 8.3.1 had an invar M1 mirror installed with a slope error of 0.8 µrad r.m.s. and a finish of 0.9 nm r.m.s. Beamlines 8.2.1 and 8.2.2 had silicon M1 mirrors installed with slightly better slope errors of 0.65 µrad r.m.s. and a finish of 0.5 nm r.m.s.
The next optical elements are the two flat Si(111) crystals in a Kohzu APM-type double-crystal monochromator. The first crystal receives a total power load of 50 W with a maximum power density of 0.11 W mm−2 at 12.4 keV. At these power levels, internal water-cooling is adequate, but care has to be taken with the design of the water channels. For example, it was found that with a standard longitudinal configuration of cooling channels the thermal distortion was out of specification. Fig. 5 shows sections of the crystal. Five 1.5 mm-diameter holes were drilled through the crystal transverse to the beam direction. The minimum hot wall thickness was 1.5 mm for the central hole and increased for the outer holes. In this way, the Gaussian heat load on the crystal was dissipated more aggressively in the center where the power density is highest and less so in the wings. The separation and depth of the through holes was selected to minimize the thermal bump at 12.4 keV. A finite-element analysis of the slope error at 12.4 keV indicated that for the beam on/off situation the slope change is 0.7 µrad r.m.s. This value was within specification of the slope error. Owing to the very small angular size of the source, the slope errors required from the thermally distorted crystal are much less than that of the single-crystal rocking-curve width (30 µrad FWHM at 12.4 keV). In general, preserving on third-generation sources requires slope errors to be much less than rocking-curve widths. The diffracting face of the crystal was recessed between two 7 mm-thick silicon wings that run the length of the crystal. Invar water plenums were glued to both sides of the crystal with water circulated through the five small holes and returned through the large lower hole. The silicon wings provided a contact area for the glue. When using glue, the concern is failure due to radiation exposure. The glue used was a thermoconductive epoxy resin of type E707 from Épotecny. This adhesive has been used successfully at the ESRF (Freund, 2000) for one to two years. The glue radiation exposure due to Compton scattering was calculated (Howells, 1999) and the estimated glue lifetime was found to be >100 years with 24 h operations.
The second silicon crystal has the shape of a simple parallel piped and was presumed to have non-distorted Si(111) diffracting planes. With no thermal distortion, this optic was assumed to contribute nothing to the slope error tolerance.
The last optic was a silicon cylinder (Seso) bent into a toroid by a mechanical bender. Slope errors on these unbent optics were 0.7–0.9 µrad r.m.s. and with a roughness of 0.46–0.58 nm r.m.s. These values were within specifications. Both the M1 and M2 mirrors were bent with cantilever-style spring bending mechanisms (Howells et al., 2000).
3.2. End station
Protein crystallographers have perfected data collection to such a degree that the instrument arrangement around the sample can be defined completely, and the requirement for a large hutch that allows experimental flexibility can be eliminated. The end stations therefore used a mini-hutch configuration with access limited to sample changing through a 90 cm × 90 cm sliding door. The mini-hutch concept allows instant switch-on of the X-ray beam once the sliding door is closed, as the hutch is small enough not to require the usual search procedures. Having instant switching-on of the beam into the hutch has proved to be a nice feature for users and is similar to the operation of laboratory-based X-ray hutches. The sample is mounted on a motorized XYZ stage, which in turn is mounted on a single-axis air-bearing rotary drive. The air-bearing axis rotates much faster than 1 s per revolution and allows for rapid sample alignment. Being able to rotate the sample by 180° in <0.5 s allows the collection of true Friedel mates. No overhead is incurred when collecting data in this true `inverse beam' mode, because the detector readout takes longer. As a result, anomalous differences can be calculated from reflections measured in adjacent frames without sacrificing data-collection speed. This capability optimizes MAD analysis owing to the accuracy of the anomalous differences.
The diffracted X-rays are detected by large-area X-ray CCD cameras with active areas of 210 mm × 210 mm or 315 mm × 315 mm (Area Detector Systems Corporation). Fig. 6 shows the of the mini-hutch that supports the 315 mm × 315 mm area detector. Around this structure is constructed the separate steel mini-hutch radiation enclosure with a footprint of 3 m × 1.5 m. The detector is mounted off the gantry structure by means of motorized slides such that the detector face can be positioned between 7 and 100 cm from the sample with a 2θ range of −5 to 45°. The right-hand side of Fig. 6 shows the outline of the sample support, crystal viewing system and beam monitoring/shutter structure. This section of the mini-hutch is independent of the CCD support structure. A three-dimensional model is shown in more detail in Fig. 7, and a close-up view is shown in Fig. 8. A section through the last 100 mm of the X-ray path is shown in Fig. 9.
The monochromatic X-ray beam passes through a 50 µm-thick beryllium window upon entering the mini-hutch. The Be window seals a helium-filled box that contains the beamline photon shutter, beam-position monitors, ion chambers, filters and the fast CCD shutter. The beam then passes out into air through a second 50 µm-thick beryllium window (Fig. 9), through a hole in a large (15 mm) prism and then through a rapidly exchangeable collimator consisting of a tantalum sheet with pinhole. Collimators with limiting apertures of 100, 50 or 30 µm are used routinely. The limiting aperture in the collimator is followed 1 mm beyond by a 300 µm tantalum pinhole that acts as a scatter guard. The collimators are pre-aligned and slot in and out for rapid exchange. This arrangement minimizes the time required for users to increase signal-to-noise by matching the beam size to the crystal size.
The beam passes through a hole in the middle of a small (5 mm) prism located just in front of the sample. The undiffracted X-rays passing through the sample are trapped by a 0.3 mm-diameter gold back stop supported by a strip of expanded polystyrene packing foam. The diffracted X-rays are barely attenuated by this foam. The foam support is undetectable in the diffraction image, and it shows none of the usual shadows associated with back-stop support structures. This foam is in turn supported by a small XY stage that allows for back-stop positioning. The arrangement of the two prisms (Fig. 9) allows for sample viewing on-axis. This feature is particularly critical for alignment of very small crystals. The small prism just before the sample redirects visible light from the sample to a 10× long-working-distance microscope objective (Mitutoyo), which has a field of view on the TV camera of 580 µm × 460 µm. Back illumination is important to see sample contrast, and for this microscope a fiber-optic light is aimed at the strip of white polystyrene foam that supports the back stop. This material is an excellent scattering source, and it effectively back-illuminates the sample with the low coherence required by the imaging microscope. The positioning of the delicate items around the sample (such as the small prism, high-magnification microscope, the back stop and the collimator pinhole) are critical to the diffraction measurement. All four of these delicate items are mounted on a substantial XY slide (Fig. 7) that lowers them 200 mm out of the way prior to sample mounting. This feature allows the goniometer spindle to be completely accessible and sample changes are easily performed without disturbing the delicate components of the optical system, the back stop or the collimator. With the stage lowered, the large prism captures the sample image on-axis, and the image is relayed to a long-working-distance microscope with a field of view on the TV camera of 4.36 mm × 3.28 mm. This view allows for coarse alignment of the sample after initial mounting. When the pinhole/microscope/back-stop stage assembly is raised, the sample is viewed with the higher magnification system that enables more precise final alignment.
There are two pneumatic actuators that can insert devices into the beam in the sample region (Fig. 8). One actuator supports a silicon photodiode that enables monitoring and tune-up of the beam. The other supports a rear illuminator light consisting of a fiber optic, a polarization filter and a prism for redirecting the light at the sample. By placing a polarization filter on top of the Mitutoyo high-magnification lens, the sample can be viewed in crossed polarized light in order to help find the crystal and improve alignment accuracy.
3.3. Beam-position feedback scheme
The focused spot size at the sample is comparable with the 100 µm defining pinhole. This small beam size presents special problems, because the beam must remain fixed on the sample for long periods of time (hours). Over this time period, we observed slow thermal variations of various beamline components, beam drifts and various other unspecified environmental drifts that caused fluctuations in intensity. At facilities with a larger beam, the problem of drift can be less severe, because beam movements can cause little change in intensity through the limiting pinhole in the end station. To solve the drift problems, we initially adopted a feedback system based on the horizontal and vertical positional information from split ion chambers located just downstream of the beryllium window at the mini-hutch wall. The split ion chambers were located 63 cm before the focus at the sample. These split ion chambers, however, proved to have a non-linear response with both photon energy and beam width, leading them to give an erroneous signal on which to provide beam-position feedback. The source of this non-linear response is still under investigation.
An alternative feedback scheme was developed. We glued a cerium-doped yttrium aluminium garnet crystal (YAG scintillator) onto the shutter blade of the fast CCD shutter (NM Laser) located 17 cm before the sample. The shutter blade is inclined at 9° to the X-ray beam, and operates by flipping the blade in the vertical. The scintillator image of the beam was viewed with a TV camera which fed the image to a frame grabber that determines the beam-position parameters at 15 Hz. Owing to the 9° angle of the shutter blade and YAG screen with respect to the beam, the scintillator image provides a particularly sensitive and reliable signal for vertical beam-position feedback. The device is less sensitive in the horizontal plane, but as the beam is larger in this direction the system is less sensitive to small horizontal beam motions. Vertical beam position was effected by movement of the M2 tilt, and horizontal beam position effected by rolling the second monochromator crystal. Beam-position centroid stabilities of ±5 µm are typically achieved. The drawback of this control system is that it is only operational when the CCD shutter is closed. When the shutter is open, the system operates in open-loop mode. However, the CCD shutter is generally opened and closed many times per minute during standard data-collection runs for protein crystallography. Thus, the beam position is constantly optimized between each diffraction exposure. Such a feedback scheme would not work very well for an XAFS-type beamline or other beamlines where the shutter is required to remain open for long (several hours) periods of time.
4. Beamline performance
The calculated and measured fluxes arriving at the sample for all three end stations without a pinhole collimator are shown in Fig. 10. The calculated for the inboard and outboard sources is essentially the same up to ∼8 keV and diverges slightly to higher energies. At 12 keV the inboard (5.29 T) source has 10% more than the outboard (4.37 T) source. The absolute measured was determined by cross calibrating a silicon photodiode detector signal with that from a [NaI(Tl)] scintillator/photomultiplier-tube pulse-counting detector (Bicron model 1XMP.040B) operating at <105 Hz. The low rate of the scintillator detector allows for the assumption of zero and thus linear response. The scintillator is considered to be 1.0 (Holl et al., 1988)1. All the measured fluxes from the three beamlines are lower than the calculated as might be expected as the optics are not perfect. At 12 keV the measured-to-calculated ratio for the three beamlines is 0.73, 0.62 and 0.41 for beamlines 8.2.2, 8.2.1 and 8.3.1, respectively. Beamline 8.2.2 has the best performance with a profile similar to the calculated value but slightly lower overall. Beamline 8.2.1 has poorer performance at low energy, whereas 8.3.1 produces less at higher energies. The M1 mirror is the only major difference between the three beamlines. Beamline 8.3.1 has the invar M1 mirror, whereas the other two beamlines have silicon M1 mirrors. The metrology measurements indicated that the invar mirror is slightly rougher (0.9 nm) than the silicon mirrors (0.5 nm). This slight difference does not readily explain this reduction to high energy, because the slight roughness increase would reduce the Strehl ratio but the total arriving at the large area silicon photodiode detector (active area = 10 mm × 10 mm) would be expected to be unaffected. The exact nature of the measured loss is still unclear and continues to be investigated.
The focused spot sizes at 12 keV were measured and found to be 150 µm × 100 µm FWHM (h × v) for beamlines 8.2.1 and 8.2.2. These values are consistent with slope errors on M1, crystal 1 and M2 of 0.8 µrad r.m.s., as discussed in §3.1 above. For 8.3.1 the focused spot size was measured at 130 µm × 140 µm FWHM (h × v), larger in the vertical and smaller in the horizontal when compared with the values calculated by ray tracing. The slightly poorer figure specification of the invar M1 mirror (relative to the silicon M1 mirrors on 8.2.1 and 8.2.2) will contribute to the increased vertical spot size, although the magnitude of the figure error does not account for the size increase entirely. In this optical design, changing the M1 or M2 angle allows different aberrations to act against each other. The current optical scheme is designed to eliminate astigmatic coma, and so minimizes the vertical beam size. A small alteration of the M1 or M2 angle breaks this condition, resulting in growth of the vertical beam size. In some alignment conditions, a reduction of the horizontal beam size is also possible. This combination of effects may explain the dimensions of the beam on beamline 8.3.1.
Protein crystallography experiments require a small beam, which is produced by the insertion of a 100 µm-diameter pinhole just before the focus and sample. The measured and calculated . In general, the is less than the case with no pinhole as the focused spot size is larger than the pinhole size. Ray tracing indicates that 37% of the photons should pass through a 100 µm pinhole. Fig. 12 shows the measured percentage of the that passes through the 100 µm pinhole for the energy range of the beamline. For all three beamlines, there is a general reduction at lower energies. This effect is consistent with beam blow-up in the vertical owing to thermal deformation of the first crystal and increased optical aberrations as the vertical fan grows in extent. This explanation is consistent with the water channel distribution in the first monochromator crystal, which was optimized for the 12 keV diffraction angle (§3.1). Near 12 keV, the passing through the pinhole is close to the calculated value (37%). For beamline 8.3.1, the drops for high-energy X-rays, consistent with beam blow-up in the vertical owing to scattering and the reduction in the Strehl ratio owing to the slightly worse roughness of the invar mirror used on this beamline.
through the 100 µm pinhole is shown in Fig. 11It should be noted that the beamlines fully satisfy one of the important original goals – to provide as good a performance as beamline 5.0.2, a 37 pole 2 T wiggler MAD beamline, the first beamline built for protein crystallography at the ALS. The
through a 100 µm aperture in a 3 mrad convergence angle, at the new beamlines, is around a factor of three higher than at the wiggler beamline, even though the total power radiated into the beamline aperture is around a factor of 50 lower.5. Control system
The success of protein crystallography beamlines is becoming more dependent on their ease of use, which is strongly influenced by the control software. These beamlines employ separate control systems for the beamline and end station. The beamline is operated by a control system based on Labview (National Instruments), which is becoming standard for beamline control around the ALS. All hardware and software components are modular, because most beamlines contain a limited set of relatively standard components that are independent of the experimental end station. This beamline control system can operate stand-alone and be used to commission the beamline without a functioning end station. Following commissioning, the beamline control system can be put into a driven mode and receive control inputs via the local network from the end-station control system. Such commands can shift the energy, control the beam convergence onto the sample and tune-up the beamline. The end-station control code was developed along two directions. An in-house end-station control code was developed and deployed on beamlines 8.2.1 and 8.2.2. The `Blu-Ice' code, available from the Stanford Synchrotron Radiation laboratory (https://smb.slac.stanford.edu/blu-ice/) was deployed on 8.3.1. Both systems support routine data collection. For example, 43% of the beam time available in November 2002 was used to collect data on beamline 8.3.1. This percentage represents the total time that data were recorded (including the 3 s cycle time for downloading the diffraction image from the CCD) relative to the total time that photons are coming down the beamline. The remaining 57% of the time was spent changing samples and choosing experimental strategies.
6. Future developments
Automatic sample-change mechanisms that allow for automatic loading and alignment are currently being developed to improve throughput. Sample sizes have continued to shrink, and users routinely use 30 and 50 µm pinholes. Small crystals also drive the need to increase the
at the sample. To this end, planned improvements to the ALS ring, such as top-off mode injection, will provide two to three times the present average current with a smaller vertical beam size. To benefit from this improved source the possible options include replacing the M1 mirrors with internally cooled silicon mirrors, cryocooling the first monochromator crystal, and replacing the M2 mirrors with a conical design to provide improved vertical focusing.7. Conclusions
Three warm bend magnets at the ALS were replaced with superconducting 6 T bend magnets that produce synchrotron radiation with a 11 to 3 × 1011 photons s−1 (400 mA)−1 with 3 mrad horizontal divergence through a 100 µm pinhole. This is approximately three times higher than that of the ALS 5.0.2 wiggler beamline.
of 12 keV from the low-energy 1.9 GeV ALS ring. A suite of three protein crystallography beamlines was installed using a single superbend source. The low power of the source allows for relatively inexpensive beamline construction costs. The high of the source is well matched to the requirements of protein crystallography, such that the available photons are used efficiently. The beamlines are currently operating with rates at the sample of 2 × 10APPENDIX A
A new configuration for the X-ray toroid mirror
The focal lengths, f, of a toroidal mirror in the tangential and sagittal directions (indicated by subscripts s and t) are given by Coddington's equations,
where r and are the object and image distances, respectively, R is the major radius, ρ is the minor radius and θ is the angle of incidence measured from the normal. It is possible to choose R and ρ so that the tangential and sagittal foci coincide, in which case the image is said to be stigmatic. It has long been known that, for the special case of a toroidal mirror imaging a point source to a nominal point image, at unity magnification (rs = rt = = ), the image quality is exceptionally high. This is due to the fact that the comatic aberrations (sagittal and tangential) vanish under this condition. Now, based on a systematic ray-tracing study (Padmore, 2000), we have learned that a grazing-incidence toroidal mirror gives unusually good image quality for another, hitherto unsuspected, `magic' set of object and image conjugates. In the new magic configuration, the object-side beam is on-axis but astigmatic, which means in general that the source consists of two mutually perpendicular lines at different distances rs and rt from the mirror. The beneficial effect occurs under the following particular conditions,
in which one of the source lines is at infinity and the other lies in the symmetry plane of the toroidal mirror. These are just the conditions that are commonly used on X-ray beamlines, such as the one reported in this paper, where the sequence (i) vertically collimating cylinder mirror, (ii) double-crystal monochromator, (iii) toroidal focusing mirror, is used to deliver a stigmatic image to the experiment. For such beamlines, the toroidal-mirror has rt equal to infinity owing to collimation and rs equal to the collimator-mirror-to-synchrotron-source distance. We have studied this imaging scheme using an optical-path-function analysis and have shown that, for such a source configuration, the normal point-to-point path-function analysis (Padmore et al., 1998) is insufficient and an extension of the theory is required to describe the line source implied in (2). We have provided an appropriate extension of the theory and used it to show that the coma terms of the optical-path-function expansion under the magic conditions are as follows,
where α is the incidence angle to the normal and we have dropped the s and t subscripts for since the imaging is stigmatic on the image side. As can be seen, the principal aberration, the astigmatic coma, indeed vanishes at = rs/2 while the primary coma, although not exactly zero, can be sufficiently small. More specifically, the marginal-ray aberration owing to the primary coma, which is a very conservative measure, is 41 µm for the case of interest here. Thus, in summary, the good optical performance of this beamline is predicted by ray trace, explained by aberration analysis and delivered by the constructed beamline as shown by the X-ray measurements reported in the main text.
Footnotes
1Holl et al. (1988) indicate that the visible photon yield from a NaI(Tl) scintillator is 38 photons keV−1 when irradiated with X-rays. We assume a conservative light coupling of these photons into the of ∼50%. The efficiency of the Hamamatsu R580 is ∼25% (https://usa.hamamatsu.com) at the emission wavelength of NaI(Tl), 430 nm. 12 keV X-rays are expected to generate ∼57 electrons per X-ray from the photocathode before entering the electron multiplier section. The scintillator photomultiplier combination is thus expected to single count X-rays with a of 1.0 after absorption by the 125 µm-thick beryllium entrance window is taken into account.
Acknowledgements
The Advanced Light Source is supported by the Director, Office of Science, Office of Basic Energy Sciences, Materials Sciences Division, of the US Department of Energy under contract No. DE-AC03-76SF00098 at Lawrence Berkeley National Laboratory. The Howard Hughes Medical Institute provided funding for beamlines 8.2.1 and 8.2.2. Beamline 8.3.1 was funded by the National Science Foundation, the University of California, Berkeley, the University of California, San Francisco and Henry Wheeler.
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