2.1.1. Sample preparation

We used Lumbricus terrestris erythrocruorin (Hb) as a test sample. This 3.6 MDa extracellular respiratory protein complex, termed either erythrocruorins or hemoglobins (Royer et al., 2000, 2006), consists of 144 hemoglobin and 36 linker subunits. The hemoglobin subunits are organized into 12 dodecamers, each of which binds to a heterotrimer of linker proteins. Each dodecamer is a trimer of heterotetramers. The 12 dodecamers form a core complex with D₆ symmetry. The sample was prepared using a protocol adapted from Vinogradov & Sharma (1994). The harvested concentrated Hb solution was stored at 277 K in 50 mM ammonium acetate (measured pH of 6.5) until use. Protein A (a bacterial surface protein commonly used because of its ability to bind immunoglobins) conjugated with 5 nm colloidal gold particles (CMC-UMC, Utrecht, The Netherlands) was added as fiducial markers to the protein sample just before preparation of the EM grids. Aliquots of 3 µl samples at 0.5–1 mg ml⁻¹ protein concentration were applied to 200 mesh glow discharged C-flat^TM (Protochips Inc., NC, USA) grids (1.2 µm hole size) and blotted from both sides inside an FEI Vitrobot using 3 s blotting time with 100% relative humidity. Subsequently, the blotted grid was rapidly plunged into liquid ethane for vitrification. The grid was stored in liquid nitrogen pending examination in the electron microscope.

In addition to the low-salt control sample described above, three more solvent constituents were tested. The required amount of stock was dissolved to 0.5–1 mg ml⁻¹ final protein concentration in (i) 2 M ammonium acetate, (ii) 50% (v/v) glycerol and (iii) 0.2% (v/v) glutaraldehyde. The sample prepared in 2 M NH₄Ac (as high salt) and 50% (v/v) glycerol served as a model system for cryo-protectants commonly used in MX. Glutaraldehyde was chosen as it has been used as a stabilizing organic molecule for protein complexes studied in SP cryo-EM (Kastner et al., 2008; Stark, 2010). For the glutaraldehyde sample, the protein was incubated in a solution containing 0.2% (v/v) glutaraldehyde in 50 mM ammonium acetate for about 10 min prior to use. Grids were prepared as above.

2.1.2. Image acquisitions/data collection

Images were recorded on a 4k × 4k Eagle on-axis CCD camera using a FEI (https://www.fei.com/ ) TECNAI Biotwin electron microscope with a LaB₆ filament operating at 120 kV without using an energy filter. Other microscope settings used were: condenser aperture number 3 (size of 100 µm), objective aperture 3 (70 µm) and spot size index 6. The grid was kept in a Gatan 626 (Gatan Inc., USA) cryo-holder at a temperature of 103 K, as monitored by the temperature control unit. The magnification at the detector plane was ∼68000×, the requested defocus −3 µm and the exposure time 1 s. Images were hardware binned and consist of 2048 × 2048 pixels. The field of view was 0.9 µm × 0.9 µm, the pixel size 4.5 Å square. The incident flux was derived from the detector analog-to-digital units (ADUs) by taking 1 s exposures without sample and using conversion factors (in ADU/e⁻) as calibrated by Vulovic, Rieger et al. (2010) for these systems. Each exposure series was collected from a previously unexposed sample suspended across one of the holes in the C-flat grid. A series of 50 successive images was recorded with an incident flux density of 5 e Å⁻² s⁻¹ (medium flux), corresponding to an integrated flux density for the final images of 250 e Å⁻². Similarly, a series of 50 images was acquired with an incident flux density of 50 e Å⁻² s⁻¹ (high flux), and another series of 250 images with an incident flux density of 1 e Å⁻² s⁻¹ (low flux). In addition, 50 high-flux images (50 e Å⁻² s⁻¹) were collected with an exposure time of 0.1 s (high-flux short-exposure), resulting in an integrated flux density for the final images of 250 e Å⁻². The pre-specimen shutter was used for all the experiments: the specimen was only exposed during the data recording. The pre-specimen shutter response of the microscope was checked by comparing the median intensity of the sum of ten images with an exposure time of 0.1 s to the median intensity of one image with 1 s exposure time. The difference was less than 0.09%. All images were collected as fast as possible after each other, resulting in, on average, 13 images per minute.

2.1.3. Sample thickness measurements

In order to calculate the approximate sample thickness, tilt series were acquired and thickness was calculated from the reconstructed tomograms. Single-axis tilt series were recorded using FEI Inspect3D software for tilt angles from −52° to +52° in steps of 1° at a detector magnification of ∼68000×, and an incident flux density of 1.3 e Å⁻² s⁻¹. The defocus was set to −5 µm at 0° tilt angle. The IMOD software package (Kremer et al., 1996) was used for data processing and three-dimensional tomographic reconstruction. The approximate sample thickness was derived from the number of sample-containing tomogram slices in the beam direction.

2.2.1. Image alignment

Where relevant, images were corrected for statistical outliers (Vulovic, Rieger et al., 2010). Account was taken of sample drift by aligning the images to the first image of each series using a normalized cross-correlation function. The translation vectors were calculated with sub-pixel accuracy. The real-space images were translated by applying a corresponding phase shift in Fourier space.

2.2.2. Dose and heat calculations

The dose, in gray (Gy), was calculated based on the incident flux density, exposure time, electron beam size and energy, and the molecular weight and number of Hb particles, in a manner similar to the program RADDOSE (Murray et al., 2004, 2005; Paithankar & Garman, 2010). As the product of the dominant form of inelastic electron scattering, only plasmons were taken into account, depositing on average 20 eV per inelastic event into the sample (Langmore & Smith, 1992).

The temperature rise of the vitreous ice was estimated based on lumped model calculations (Kuzay et al., 2001). The total deposited energy as determined by the dose calculations was assumed to contribute to heating of the sample. In the `lumped system' the internal temperature spatial variations in the sample are neglected and the temperature changes only with time. The energy balance is given by (Kuzay et al., 2001)

where is the density of vitreous ice (0.93 g cm⁻³), V is the volume of the illuminated sample, P_dep is the deposited power (energy per time) to the specimen, A_s is the area through which heat is conducted, T₀ is the initial temperature of the sample (103 K) and h is the heat-transfer coefficient. The heat capacity of the sample (c_p) was taken to be 900 J kg⁻¹ K⁻¹ (Kriminski et al., 2003). In a lumped system with isolated walls (adiabatic model) this model predicts a rate of temperature increase of ≃ 61121 K s⁻¹ (Fig. 6a). This is unrealistic and shows the importance of incorporating the cooling from the ambient and grid into the model. The evolution of the temperature could be written as (Kuzay et al., 2001)

where

is the system time constant which characterizes the cooling rate. For a short time after the onset of the exposure the system acts like an adiabatic system and the temperature increases linearly with time (Kuzay et al., 2001). After a time corresponding to three system time constants (3 × t_sys), the sample reaches 95% of the final temperature. If the exposure is shorter than this, the final maximum temperature will not be reached.

In the `distributed system' the temperature is non-uniform both in time and position. The spatial and temporal thermal behavior of the system was simulated as heat diffusion in one dimension from the illuminated spot area to the cryo-cooled copper grid.

The temperature distribution is derived from the diffusion equation,

where k is the thermal conductivity of vitrified ice. For simplicity, k is assumed to be constant. The parameter is called the thermal diffusion coefficient and determines the rate of the diffusion process. ρ_HS is the power density of the heat source derived from equation (2)

In order to solve equation (6) numerically, time and space were discretized. Potential stability problems were overcome by using the Crank–Nicolson method (Crank & Nicolson, 1996). Since the thin cryo-EM samples are relative transparent to the electron beam, heat diffusion in the direction of the beam (axial) can be considered instantaneous. As boundary conditions, it was assumed that the supporting copper mesh was in perfect thermal contact with the liquid-nitrogen-cooled sample-holder rod, and kept at a constant temperature of 103 K. The illuminated specimen area |x| < d_b (d_b being beam diameter) was approximated as a lumped system. Simulations were performed for vitreous ice of 50 µm diameter and 0.15 µm thickness, a uniform beam (a top-hat function) with a diameter of 10 µm, an incident flux density of both 5 e Å⁻² s⁻¹ and 50 e Å⁻² s⁻¹ at 120 kV accelerating voltage, and a heat-transfer coefficient k = 1.1 W m⁻¹ K⁻¹ (Kriminski et al., 2003). Since the grid mesh is larger than the electron beam diameter, heat is transported from the illuminated region to the grid via the sample. Energy loss into the vacuum through black-body radiation has been neglected. The temperature difference between the grid and the edge of the illuminated specimen is given by , where l is the distance from illuminated area to the grid bars. If this is compared with the stationary case of the lumped system = P_dep/(hA_s), the heat-transfer coefficient h can be approximately expressed by k/l.

2.2.3. Mass loss

For each series the common subarea was defined and its mean intensity was calculated for each image. The slope of ΔI/I₀ (ΔI = I − I₀) versus dose was tabulated together with the intensity of the first image of each series, the estimated sample thickness, and the number of hemoglobin molecules per unit area.

2.2.4. Beam-induced movement

Fiducial gold particles in the aligned images were used to track beam-induced movements that might have occurred during data collection. Distance matrices were calculated from the gold marker positions for the first and last image of each series. The movement of the gold particles was measured by a change in these distance matrices within a series. The mean of the distance differences provides a metric for beam-induced movements (Chen, Sachse et al., 2008).

The gold marker detection was challenging because of several difficulties. The gold markers are on average 5 nm in diameter, but can vary significantly in shape and size. The different series showed differences in signal-to-noise ratio. Inspired by Lowe (2004) and Mikolajczyk et al. (2006) the above problems were overcome by using the Laplacian of Gaussian-filtered images. The Gaussian filtering was performed for a range of sigma values, varying around the gold size in pixels. The Laplacian of each of these Gaussian-filtered images were summed, which is defined here as the sum of the Laplacian of Gaussian functions (sLOG). Gold particles were detected as the brightest regions in the sLOG images. The centers of the gold particle positions were found from the center of mass of the brightest regions. For each gold particle in the reference image the vicinity of the area in the aligned image was used to locate the corresponding gold particle in that image.

2.2.5. Figure-of-merit as a measure of phase error

After alignment, a common subarea was defined for each exposure series. The Fourier transforms (FT) of these subimages were averaged to yield averaged complex structure factors. A figure-of-merit was defined as

where φ_j is the phase of the FT of individual subimage {j}, 〈φ〉 is the phase of the averaged complex structure factor described above, and the averaging is carried out for each pixel over N number of images within a series. N varied between 10 and 250 in our calculations. The FOM can vary between zero for random data and one for ideal noise-free data.

2.2.6. Defocus estimation

Periodogram-averaged power spectra were calculated as described previously (Fernández et al., 1997). The power spectra of the individual (medium- and low-dose) images were too noisy for defocus estimation through contrast transfer function (CTF) fitting.

The defocus could be derived from the radial averaging of the mean cosine of the difference phase, FOM (Karimi Nejadasl et al., unpublished data). These FOMs were calculated after splitting each data series into five parts, with each part corresponding to an integrated flux density of 50, 100, 150, 200 and 250 e Å⁻² respectively.

2.2.7. Fourier ring correlation and Fourier ring phase residual

The radiation damage was scrutinized closely by different similarity metrics. Two metrics were computed, the Fourier ring correlation (FRC) and the Fourier ring phase residual (FRPR; Van Heel, 1987; Liao & Frank, 2010). They are obtained from

where F_j, and are, respectively, the Fourier transform of the jth image for j = 1,2 and its magnitude and phase. The metrics were computed up to the first crossing of the CTF, namely 166–3.5 nm. Images were first aligned and then summed up to the specified integrated flux density.

4.2.1. Sample heating

Sample heating could cause dose-rate effects, since the balance between heating by the electron beam and cooling by conduction will depend on the rate the energy is deposited in the sample. Analogous to Kuzay et al. (2001) and Kriminski et al. (2003), we simulated the heating of the vitrified sample using a lumped and a distributed model for different values of the heat-transfer coefficient h. In the adiabatic case a thermally isolated sample of the same size as the beam would melt quickly (Fig. 6a). Both the lumped and the distributed models indicate that the temperature will rise most rapidly within the first milliseconds after exposure of the sample to the electron beam. Compared with MX, the system time constant [see equation (4)] is much smaller in SP cryo-EM due to the lower volume–surface ratio and the larger heat-transfer coefficient. Figs. 4(d) and 4(h) seem to indicate that fast (sub-100 ms) processes are indeed responsible for the observed dose-rate effects. The images from the series of Figs. 4(b) and 4(d) were recorded with the same integrated flux density per image, namely 5 e Å⁻²; however, the images from Fig. 4(b) were integrated over 1 s at 5 e Å⁻² s⁻¹ whereas the images from Fig. 4(d) were integrated over 0.1 s at 50 e Å⁻² s⁻¹. The latter images are clearly worse, indicating that the additional damage induced by the high flux occurs in less than 100 ms.

Only for very high dose rates and low values of h, representing, for example, poor thermal contact between the grid and the cryo-holder, is sample heating predicted to become an issue for SP cryo-EM, as the temperature of the sample is calculated to rise (Fig. 6c) above the glass transition (Weik et al., 2001; Weik & Colletier, 2010), triggering an exothermic ice crystallization process. In fact, for one high-flux series, radiation-induced ice crystallization was observed (Fig. 5). However, this result was exceptional, suggesting poor thermal contact for that particular grid.

The heat model presented here complements existing specimen heating models as used in TEM (see, for example, Reimer & Kohl, 2008) and could form the basis for an elaborate refinement that studies the influence of supporting mesh size, size and spacing of holes within the support film, distance of the beam with respect to the grid bars, etc. Some experimental verification of h for different combinations of grids and holders would be required (Reimer & Kohl, 2008). Such studies are beyond the scope of this manuscript; however, we can postulate that the effect of beam heating is felt within milliseconds after exposure, and beam heating is not expected to be a problem for cryo-EM samples with good thermal contact at medium- or low-flux densities.

4.2.2. Radical recombination

In MX it is believed that the photo-electric absorption of a ∼12 keV X-ray photon will produce ∼500 radicals, assuming 25 eV per ionization event (O'Neill et al., 2002). For our medium-flux data series taken at 5 e Å⁻², we estimated 1.9 × 10¹⁰ inelastic scattering events per frame within a volume of 11.8 fl. If each inelastic event acts on a different target and produces one radical and ignoring radical recombination processes, then the radical concentration at the end of the first exposure would be 2.6 M. We extrapolate that for typical SP cryo-EM data collections the biological molecules would be exposed to molar concentrations of radicals. Some of these radicals, in particular electrons, must be mobile (Ravelli & McSweeney, 2000) as the damage seems to accumulate at the interface of protein sites (see Movie S1 ; Fig. 8; Glaeser et al., 2007; Baker et al., 2010).

Ignoring radiation recombination processes, one would calculate 52 M as the radical concentration for the high-flux series after 2 s of exposure, which is comparable with the concentration of water within the sample. Such radical concentrations are unlikely to be present, thus radical recombination must play a role for our data.

Dose-rate effects could be caused by concentration-dependent radical chemistry and the diffusion of gas molecules within the sample. Supplementary Movie S1 illustrates the formation, diffusion, fusion and rupture of these bubbles. For high-intensity beams, the pressure can become so high that it generates mechanical fractures within the specimen (Chen, Sachse et al., 2008), and since this would negatively effect the conductive cooling of the sample it might lead to local beam heating. The absolute temperature of the sample could play a role for dose and dose-rate effects: recently, a temperature of 50 K instead of 100 K was shown to reduce specific damage in MX by a factor of three to four (Meents et al., 2010), whereas, for cryo-EM diffraction studies, 100 K was found to be the optimal temperature (Bammes et al., 2010). Higher dose rates could also lead to an inverse dose-rate effect, as radical recombination could become more important, in particular at elevated temperatures (Southworth-Davies et al., 2007). The dose rates used in this SP cryo-EM study varied between 1 and 56 MGy s⁻¹, which is very high compared with the dose-rate studies carried out in MX [e.g. Southworth-Davies et al. (2007) used 6–10 Gy s⁻¹; Cherezov et al. (2002) used 20–6400 Gy s⁻¹; Leiros et al. (2006) used 0.2 MGy s⁻¹]. The data recorded with 56 MGy s⁻¹ were inferior to the lower dose-rate series. This raises the question as to whether the typical dose rate used in SP cryo-EM (∼25 MGy s⁻¹) is optimal. It would be worth investigating whether further improvements could be obtained by lowering the dose rate in SP cryo-EM studies by another order of magnitude. Simulations suggest that it should be possible to align extremely low-dose images for essentially noise- and point-spread function-free detectors (Typke et al., 2007). Actual developments in detector technology yield promise for dose fractioning in SP cryo-EM.

The high dose rates used in SP cryo-EM make it likely that radiation chemistry will play an even larger role compared with MX. There are indications that scavengers could prolong the lifetime of cryo-cooled crystals in the X-ray beam (Kauffmann et al., 2006; Southworth-Davies & Garman, 2007; De la Mora et al., 2011) by neutralizing immobile ionized groups or quenching radical species. Unfortunately, the addition of a high concentration of scavengers can be harmful for fragile protein crystals. This difficulty does not exist in SP cryo-EM, although other problems, such as reduced sample contrast, might arise.

Hydrogen trapping was proposed (Meents et al., 2010) to be the cause of unit-cell volume expansion observed in MX (Ravelli et al., 2002). In SP cryo-EM the sample shrinks with dose, as radiolytic products, in particular hydrogen gas, diffuse out of the sample into the high-vacuum column of the electron microscope, resulting in mass loss. This process is linear with dose and seems to be highly reproducible among different samples tested (Fig. 1). The observed linear relationship between the relative intensity change and the dose could be a useful metric for studying the effects of scavengers.

Other metrics presented in this manuscript include FOM (Fig. 2), Fourier ring correlation and Fourier ring phase residual (Fig. 3), and beam-induced movements (Table 1). Here, radioprotectants were not tested but rather one fixative and two cryoprotectants, among which was glycerol, the most widely used cryoprotectant in MX. The 50% glycerol sample showed very little contrast between the protein and the solvent as its density (1.181 g cm⁻³ at 72 K; Alcorn & Juers, 2010) is comparable with the average density of protein molecules (1.35 g cm⁻³). Bubbling was observed throughout the glycerol sample, not only at the protein sites, consistent with the discussion by Meents et al. (2010) that hydrogen gas (Leapman & Sun, 1995) is formed upon radiolysis of organic molecules. Within 50 medium-flux images, the vitrified layer of the sample within the hole was completely sublimated (Fig. 7), unlike the other samples at medium-flux (Figs. 4e–4h). The gold fiducial markers showed large beam-induced movements (Table 1). The observed increased sensitivity to radiation damage upon addition of glycerol calls for further studies, in particular for MX.

The 2 M NH₄Ac sample did not show clear differences in radiation damage susceptibility: the relative intensity change (Fig. 1) and beam-induced movements (Table 1) were comparable with the low-salt samples. The distribution of the Hb particles within the sample was slightly different, as some Hb particles packed regularly. Similar to all the other samples, the 2 M NH₄Ac sample was vitrified in liquid ethane. High concentrations of salt are routinely used as cryoprotectants in MX: we could have vitrified this sample with liquid nitrogen, thus overcoming some of the disadvantages of using liquid ethane.

The localized appearance of gas bubbles was most obvious for the 0.2% glutaraldehyde sample (Fig. 8). Kastner et al. (2008) advocated the use of 0.2% glutaraldehyde for improving the sample quality for structure determination by SP cryo-EM. The described benefits of using a chemical fixation reagent in stabilizing individual macromolecules during sample preparation might also help in keeping the macromolecules together upon radiolysis.