3.1. Focusing properties of lens unit CRL1

At first, the X-ray beam spatial profile was characterized only with the upstream lens unit CRL1. The diffraction-limited monochromatic X-ray beam size with the CRL1 unit is ∼150–250 µm at interaction chamber 1 (IC1) (Zastrau et al., 2021). In our experiment, the beam was directly focused to IC1. In Fig. 2, an image of the beam measured at a photon energy of 9 keV is presented. It can be clearly seen that the beam size is consistent with theoretical considerations; however, the intensity profiles taken across vertical and horizontal directions has a small astigmatism with ratio FWHM_horiz/FWHM_vert = 160 µm/190 µm = 0.84 and the base of the intensity profile in the vertical direction is broader compared with the Gaussian one. The observed loss of the waist symmetry and spreading of the shape can be caused by mirror clipping due to beam drift and/or slight geometrical imperfections of the lens.

Figure 2 Image of the XFEL beam directly focused by the CRL1 lens measured by means of a LiF detector at IC1. The green profiles correspond to experiment; red profiles are Gaussian fits.

3.2. X-ray focus characterization after CRL3

To characterize the intensity distribution of the focused beam, the caustic was imaged in different planes along the beam propagation for different focusing conditions. The expected focal point was at Z = 0 mm. Fig. 3 shows sequences of LiF images recorded in a Z range of 240 mm for different sets of CRL1 and CRL3 units. In run #58 we clearly observe a double structure of the X-ray beam that diverges horizontally over the entire Z range. This indicates that single elements in the stack CRL3 were most likely misaligned or damaged. Indeed, by consequentially removing the elements one by one from the CRL3 stack, we found that the CRL3 unit provides a much better beam profile without the last lens cartridge (run #67). The beam has less astigmatism in comparison with run #58 and the double beam structure is gone. It is suspected that there may be some damage on the last element. The best intensity distribution in the beam was obtained in run #84 by the additional change of elements in CRL1 (see Fig. 3). At best the beam diameter in the focal plane (Z = 0 mm) was found to be 3.4 µm and 3.7 µm at the FWHM signal level in the vertical and horizontal directions, respectively [Figs. 4(a) and 4(b)]. By applying the PL response function to the LiF image obtained in the focal plane, it was found that about 50% of the energy is contained at a FWHM that agrees with the Gaussian intensity distribution inside the beam.

Figure 3 Sequences of LiF images measured along the XFEL beam propagation (with Z varied from Z = 24 mm to Z = −208 mm) for three runs with different configurations of CRL units.

Figure 4 Parameters of the beam obtained in run #84 with combinations of lenses CRL1 (2, 6) and CRL3 (3, 4, 6): intensity profile in the spot with the smallest size (waist at Z = 0) in the vertical direction (a) and horizontal direction (b); dependence of beam radius rz (FWHM = 2rz) on position Z in the vertical plane (c) and horizontal plane (d). Experimentally measured data (black squares) are compared with theoretical caustics (colored lines).

In addition, a comparison of the experimental beam caustic near the focal plane with the calculated one is presented in Figs. 4(c) and 4(d). The black dots show the measured spot sizes. Positive parts of the error bars correspond to the statistical error in determining the size of the spot which does not have a perfectly round shape. It should be emphasized that the measured distribution in the LiF images may be blurred by the secondary photoelectron cloud. In this case, the actual spot diameter is smaller than obtained as discussed in Section 2. Therefore, we introduce an error that determines the order of magnitude of the measurement uncertainty of the beam size in the negative part. Our estimates for the radius of the photoelectron cloud come from both theoretical estimates (Grum-Grzhimailo et al., 2017) and experimental measurements, which showed that the magnitude of this value does not exceed 300 nm. This value was taken into account by increasing a negative part of the error bars for the experimental points in Figs. 4(c) and 4(d). We found that the best fit of the experimental points in the vertical plane occurs in the case of Z_R = 175 mm and M² = 1.1 [olive solid curve in Fig. 4(c)]. From this point we can conclude that the real beam profile is not ideally Gaussian while the quality factor M² is not significantly different to 1. However, as can be seen in Fig. 4(d), the caustic in the horizontal plane does not look like a hyperbola and is evidently different from an ideal Gaussian. This most likely originates due to the lens errors, and possible clipping of the beam.

3.3. X-ray sub-micrometer focus characterization after CRL4

For some experimental applications the X-ray beam should be focused down to several tens of nanometers. To achieve such a tightly focused beam, the HED instrument is equipped with the CRL4 unit consisting of a stack of short focal length units (focal distances in the range 100–1000 mm are available), contributed by the Helmholtz International Beamline for Extreme Fields (HIBEF) user consortium (https://www.hibef.eu). The CRL4 unit is installed inside the IC1 experimental chamber due to the short focal distance. In this work, we used a CRL4 stack that provided a focal length of ∼300 mm at a photon energy of 9 keV. The expected size of the waist in the focal plane is of the order of 200 nm. This also involves using a custom-produced phase-correction plate. Details of the phase-correction plate are given by Seiboth et al. (2017).

Fig. 5 shows the intensity distribution of the focused X-ray beam measured by the LiF detector at sequences of planes near the expected focal point. As can be seen in the PL images, the X-ray beam is focused to the point Z = 0 mm and then diverges. Due to high sensitivity and large dynamic range of the LiF detector, it was possible without attenuation to measure both the intensity profile of the entire beam far out of focus and in the waist region, where the signal increases by several orders of magnitude. We want to draw attention to the intensity distribution within the cross sections of the focused beam. An interesting evolution of the beam spatial profile was observed along the beam propagation. It is seen in Fig. 5 that a dark spot in the central part of the beam intensity distribution upstream of the focal position (Z < 0) is transformed to a hot spot spike in the same area after the focus position (Z > 0). This indicates that Be lenses as the elements of the CRL4 stack have geometrical imperfection. Such structure of the beam distribution can appear due to deviations of the Be lens refractive surface from the ideal parabolic shape as discussed by Zverev et al. (2017) and Celestre et al. (2020).

Figure 5 Schematic drawing of intensity distribution measurements of the XFEL beam near the focus position, and sequence of PL images, obtained in one XFEL shot on the surface of the LiF detector in different planes. Lower images are intensity profiles for Z-positions of −8.8 mm, 0 mm and 7 mm.

The minimum beam diameter of 700 nm was measured at distance Z = 0 mm (see Fig. 5). This value is significantly larger than the theoretical value. As discussed in the previous section, we assume that the main reason for that discrepancy is the influence of the secondary electron cascade. To estimate the real beam diameter in the focal plane, we compared a Gaussian profile which fits the shape of experimental caustics in its wings observed out of the focal region (Fig. 6). The analysis of the caustics was done using equation (1). In Fig. 6 the dependence of the beam radius r_z, measured in the LiF images (Fig. 5), at position Z along the X-ray propagation axis is shown by black squares. In calculations, r₀ and the beam quality factor M² were varied. Considering the smallest beam size measured on the LiF image, a caustic of the Gaussian beam was calculated for parameters r₀ = 0.35 µm and M² = 1. As can be seen in Fig. 6, in this case, the corresponding curve (in blue) lies completely out of experimental data, with the exception of the area ±2 mm from the focal point. However, by taking into account the error bars, the beam size in the focal plane can correspond to a value of 2r₀ = 0.1 µm. We calculated the beam divergence on the assumption that the focal beam radius r₀ was in the range 0.05–0.35 µm and the beam quality factor M² = 1–4. We found that the best fit of the experimental results takes place in the case of 2r₀ = 0.41 µm and M² = 3 (green solid line). Thus, we may assume that the real focal beam diameter at the FWHM signal level is about 0.41 µm.

Figure 6 Comparison of the experimental radius r(z) for set CRL4 measured on the LiF images with the caustic calculated for different parameters r0 and M2.

The value of the focal spot determined in our experiment exceeds almost twice the value of ∼200 nm that the CRL4 unit is expected to satisfy according to the technical specifications. On the one hand, this may be due to the fact that the spatial resolution of the LiF is not sufficient to accurately determine the size of the beam in the focal plane; however, the beam caustics at distant points in Fig. 6 show that the size was still larger than 200 nm. Thus, the larger beam size is most likely related to lens aberrations and beam clipping. To test how lensing errors can affect the intensity distribution within a focused beam, we simulated the propagation of X-rays through the CRL4 stack as part of our study.

All simulations were made using the browser-based GUI framework Sirepo by RadiaSoft (Rakitin et al., 2018). It allows running beamline simulations on a personal computer via Synchrotron Radiation Workshop (SRW) code (Chubar & Elleaume, 1998). The capabilities of the SRW code for X-ray lens modeling have been presented, for example, by Celestre et al. (2020).

Schematically the optical elements used in the simulated beamline and watchpoints of the simulated images are shown in the upper part in Figs. 7 and 8. In our simulation, the Gaussian X-ray beam with a photon energy of 9 keV passes through the Be lens stack (refractive index decrement 4.20757 × 10⁻⁶, attenuation length 7.31 mm) which corresponds to the CRL4 unit used in our experiment with the following parameters: number of lenses N = 20, radius of parabolic curvature R = 50 µm, web thickness D = 30 µm, and aperture size = 316 µm (see Table 1). For this case, the focal length of the lens stack is 303 mm and the diffraction-limited spot size is ∼200 nm. The beam intensity distribution was obtained in the distance range ±24 mm from the focal plane.

Figure 7 Influence of CRL4 shape imperfection on intensity distribution in the focused XFEL beam. Comparison of experimental observation (upper row of images) with simulations performed for different degrees of parabolic shape imperfection.

Figure 8 Same as in Fig. 7 for modeling with a change in the thickness of the phase distorter in the range D = 5–20 µm (parameter FWHM = 30 µm fixed).

To reproduce manufacturing errors in the CRL4 stack and estimate a shape and phase imperfection, a thin beryllium slice (used as phase distorter) was placed directly behind the lens casing along the optical path in the simulated beamline. We consider commonly encountered fabrication errors in the optical imperfections in refractive lenses such as deviation of shape from parabolic as well as error in the wall thickness at the tip of the parabola. The thickness profile of the phase distorter from beryllium was set as the Gaussian shape distribution. This simple model allows the deviation of the lens from the ideal parabolic surface to be taken into account. We were able to simulate the effects of figure errors on beam shape and intensity along the optical axis. The width (FWHM) of the phase distorter determined the deviation of the shape lenses from the ideal parabolic, and the thickness (D) specified the total error in the wall thickness at the tip of the parabola along the beam propagation path.

At first, the SRW simulations were performed for X-ray beam propagation through an ideal CRL4 stack (without phase distorter). The image series `Perfect CRL' for this case is shown in Fig. 7. As can be seen, the modeled images differ from the experimental ones, in which aberration is observed. This is due to the imperfection of the parabolic shape for the refracting surface of CRL4. As the next step, a phase distorter after the CRL4 stack was used in the simulation. At first, the FWHM of the phase distorter only was varied from 10 µm up to the radius of curvature of the CRL4 lens, 50 µm. As seen from Fig. 7, the best fit is observed for the FWHM of 30 µm.

Fig. 8 shows the simulation results for when varying the thickness D of the phase distorter in the range 5–20 µm. Experimentally recorded images of shaped beams are in good agreement with computer calculations. Performed simulations for the phase distorter with parameters FWHM = 30 µm and D = 10 µm are in good agreement with experimental data. However, it is clearly seen that the experimentally observed beam distribution is far from the expected one for perfect CRL4. The value D = 10 µm corresponds to an imperfection in the total wall thickness in the CRL stack of less than 1%. These results confirm that the output intensity distribution of the focused beam is extremely sensitive to the quality of the manufacturing and precision of assembling the CRL elements.