Spherical analyzers and monochromators for resonant inelastic hard X-ray scattering: a compilation of crystals and reflections

Gog, T.; Casa, D.M.; Said, A.H.; Upton, M.H.; Kim, J.; Kuzmenko, I.; Huang, X.; Khachatryan, R.

doi:10.1107/S0909049512043154

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JOURNAL OF
SYNCHROTRON
RADIATION

ISSN: 1600-5775

Volume 20| Part 1| January 2013| Pages 74-79

https://doi.org/10.1107/S0909049512043154

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Spherical analyzers and monochromators for resonant inelastic hard X-ray scattering: a compilation of crystals and reflections

Thomas Gog,^a ^* Diego M. Casa,^a Ayman H. Said,^a Mary H. Upton,^a Jungho Kim,^a Ivan Kuzmenko,^a XianRong Huang ^a and Ruben Khachatryan ^a ‡

^aAdvanced Photon Source, Argonne National Laboratory, 9700 South Cass Avenue, Argonne, IL 60439, USA
^*Correspondence e-mail: gog@aps.anl.gov

(Received 8 July 2012; accepted 16 October 2012; online 10 November 2012)

Resonant inelastic X-ray scattering (RIXS) experiments require special sets of near-backscattering spherical diced analyzers and high-resolution monochromators for every distinct absorption-edge energy and emission line. For the purpose of aiding the design and planning of efficient RIXS experiments, comprehensive lists of suitable analyzer reflections for silicon, germanium, α-quartz, sapphire and lithium niobate crystals were compiled for a multitude of absorption edges and emission lines. Analyzers made from lithium niobate, sapphire or α-quartz offer many choices of reflections with intrinsic resolutions currently unattainable from silicon or germanium. In some cases these materials offer higher intensities at comparable resolutions. While lithium niobate, sapphire or α-quartz analyzers are still in an early stage of development, the present compilation can serve as a computational basis for assessing expected and actual performance. With regard to high-resolution monochromators, bandpass and throughput calculations for combinations of double-crystal, high-heat-load and near-backscattering high-resolution channel-cuts were assembled. The compilation of these analyzer and monochromator data is publicly available on a website.

Keywords: resonant inelastic X-ray scattering (RIXS); spherical diced analyzers.

1. Introduction

With the advent of third-generation synchrotron radiation sources, resonant inelastic X-ray scattering (RIXS) has become a popular technique to study collective electron phenomena in materials of great scientific and technological significance. Near an absorption edge, the technique provides resonant enhancements of inelastic scattering signals and makes measurements feasible that would not yield enough intensity in a non-resonant mode. Most noteworthy, excitation spectra of transition metal oxides with their vast collection of novel and important properties, such as high-T_c superconductivity and multi-ferroic behavior, have been measured and interpreted very successfully with RIXS. For a comprehensive overview of the field, see a recent review article (Ament et al., 2011 ) and references therein.

Owing to its resonant character, one of the major technical challenges for RIXS measurements is the selection of analyzers and monochromators that provide the desired resolution and intensity at a specific absorption-edge or emission-line energy. Good energy resolution requires near-backscattering analyzer reflections combined with a matched monochromator bandpass. In order to assist with an appropriate selection of these, comprehensive tables for suitable analyzer reflections in various materials are presented here. In addition, bandpass and throughput calculations for a particular monochromator concept are tabulated.

In a typical RIXS experimental set-up (Gog et al., 2009 ; Schwoerer-Böhning et al., 1998 ), an incident monochromatic X-ray beam with an energy bandpass in the meV range is prepared by a succession of high-heat-load and high-resolution monochromators and micro-focused onto the sample by a set of focusing mirrors. Scattered radiation from the sample is collected by a diced spherically shaped crystal analyzer in near-backscattering configuration and redirected to a position-sensitive `strip' detector (Huotari et al., 2006 ). Sample, analyzer and detector are arranged in Rowland geometry. A schematic representation of this set-up is shown in Fig. 1. The overall energy resolution, ΔE_tot, of such a configuration is given by a convolution of all its resolution elements. For near-Gaussian characteristics this convolution can be approximated by a square sum of the incident bandpass, ΔE_i, corresponding to the selected monochromator combination, the intrinsic analyzer resolution, ΔE_a, and geometric factors, ΔE_g,

$[\Delta{E_{\rm tot}}=\left(\Delta{E_{\rm i}^{\,2}}+\Delta{E_{\rm a}^{\,2}}+\Delta{E_{\rm g}^{\,2}}\right)^{1/2}.\eqno(1)]$

A spherical RIXS analyzer typically consists of a flat wafer of an ideal crystal material, bonded to a glass or plastic substrate, diced into square pixels of millimeter size and bent into a spherical shape of radius R. Overall, the analyzer is thus an assembly of many flat unstrained crystallites tangent to a spherical surface. Ignoring possible deviations from a perfect spherical shape (figure errors), the intrinsic analyzer resolution, ΔE_a, is determined by the incident energy, E_i, the angular reflection (Darwin) width, W, of the crystal reflection and the Bragg angle, Θ_B. Namely,

$[\Delta{E_{\rm a}}=WE_{\rm i}\cot\Theta_{\rm B}.\eqno(2)]$

It is apparent that the energy resolution of such an analyzer is best for reflections with a small Darwin width and near-backscattering conditions, where the Bragg angle is close to 90° so that its cotangent approaches zero. The task is thus to identify near-backscattering crystal reflections for every absorption edge and emission line of interest in RIXS, yielding the best resolution at reasonable reflectivities. In the past, silicon and germanium were the preferred choices for spherical analyzers since these materials yield nearly perfect crystals. However, with advances in crystal growth, other materials are becoming viable, such as lithium niobate (LiNbO₃), sapphire (Al₂O₃) and α-quartz (SiO₂). These materials have crystal structures of lower symmetry and thus offer many more possible reflections than silicon or germanium, with numerous choices of intrinsic resolution and throughput. Fig. 2 displays a partial map of reflections for the various crystal materials in the energy versus intrinsic resolution plane, with the size of the symbols proportional to the integrated reflectivity. It is quite apparent that lithium niobate and sapphire offer both high-throughput as well as high-resolution reflections for the whole spectrum of energies. The fabrication of associated analyzers needs to be pursued to advance the technique.

Figure 1
Schematic layout of a typical RIXS experiment. The incident beam is first monochromated by a high-heat-load monochromator (Cryst 1). The beam is then passed through one or two channel-cut crystals (Cryst 2 and Cryst 3) and focused onto the sample. X-ray photons with energy E_i and bandpass ΔE_i are scattered from the sample and then reflected by a diced spherical analyzer towards the detector.

Figure 2
Partial map of the analyzer near-backscattering reflections. For the various relevant energies the intrinsic energy resolution is shown. The area of the markers is proportional to the integrated reflectivity.

The geometric term, ΔE_g, arises from the fact that both the spatial resolution of the detector and the beam footprint on the sample are not zero but of finite extent. These spatial extensions subtend angles, ΔΘ, which in turn translate into an energy spread, ΔE,

$[\Delta{E} = \Delta\Theta E_{\rm i}\cot\Theta_{\rm B}.\eqno(3)]$

For the detector portion, ΔΘ = p/2R, where p is the size of a detector element and R is the diameter of the Rowland circle. For the footprint, ΔΘ = s/R, where s is the size of beam on the sample projected towards the analyzer. The present calculations only lists the detector portion, since p and R are constant for a given experimental set-up. In contrast, s depends on the focusing and the orientation of the sample, which may vary throughout the measurement.

The observed energy resolution of a RIXS set-up may contain additional contributions arising from imperfections of the instrument or its performance. These contributions are not addressed in the current document.

Comprehensive lists of crystal reflections in silicon, germanium, lithium niobate, sapphire and α-quartz were compiled for a multitude of absorption edges and emission lines of interest in RIXS, together with auxiliary information and geometric factors. In the same vein, data for near-backscattering silicon channel-cut crystals as one appropriate choice for high-resolution monochromators were assembled. For this monochromator concept the large angular acceptance associated with near-backscattering reflections offers optimal throughput for the incident X-ray beam with bandpass choices matched to the intrinsic resolution of selected analyzers. The compilation of these analyzer and monochromator data are made available on a publicly accessible website described in §3 and §4, respectively.

2. Dynamical diffraction calculations

In this article, dynamical diffraction calculations for both analyzer and monochromator crystals are based on a formulation by Authier (2001 $[Authier, A. (2001). Dynamical Theory of X-ray Diffraction, IUCr Monographs on Crystallography #11. Oxford University Press.]$ ), and were executed using the software package Mathematica (Wolfram, 2009 ). The reflectivity I_R of a crystal reflection is described as

$[I_{\rm R}(\Delta\Theta)=\left|{{F_H}\over{F_{\overline H}}}\right|\left|\eta(\Delta\Theta)\pm\left\{\left[\eta(\Delta\Theta)\right]^2-1\right\}^{1/2}\right|^2.\eqno(4)]$

In this expression, η(ΔΘ) is a generalized angular parameter, itself a function of the deviation ΔΘ of the angle of incidence from the Bragg angle, Θ_B. For a symmetric reflection and photon polarization perpendicular to the diffraction plane (σ-polarization), η is given by

$[\eta(\Delta\Theta)= {{ \Delta\Theta\sin(2\Theta_{\rm B})-\Gamma F_0 }\over{ \Gamma(F_HF_{\overline H})^{1/2} }}\eqno(5)]$

with Γ = r_eλ²/πV. Here r_e is the classical electron radius, λ the wavelength and V the volume of the crystal unit cell. F₀ and F_H are unit-cell structure factors associated with reciprocal lattice vectors 0 and H, respectively. These in turn can be written as

$[F_h=\textstyle\sum\limits_j\left(\,f_j+f_j^{\,\prime}+if_j^{\,\prime\prime}\right)\left[\exp\left(-2M_j\right)\right]^{1/2}\exp\left(-2\pi ih\!\cdot\!r_j\right),\eqno(6)]$

where the sum extends over all atoms of the unit cell and consists of atomic scattering factors f_j, their anomalous dispersion corrections $[f_j^{\,\prime}+if_j^{\,\prime\prime}]$ , a Debye–Waller factor exp(−2M_j) and a geometric component.

For the purpose of the present tables, structure factors were determined for room temperature (RT = 293.15 K) to reflect realistic operating conditions in an experiment. Calculations of f_j follow the algorithm used in the software package XOP (del Rio & Dejus, 2004 ). A Waasmaier & Kirfel-like parametrization is employed (Waasmaier & Kirfel, 1995 ), as evaluated by Kissel (2000 ) using modified relativistic form factors. Dispersion corrections $[f_j^{\,\prime}+if_j^{\,\prime\prime}]$ were taken from the database at the Center for X-ray Optics (CXRO) at Lawrence Berkeley National Laboratory (Henke et al., 1993 ). Debye–Waller factors in the form of (see Als-Nielsen & McMorrow, 2001 , or other text books on X-ray physics)

$[\exp(-M)=\left[\exp(-2M)\right]^{1/2}=\exp\left[-B_{\rm RT}\left(\sin\Theta_{\rm B}/\lambda\right)^2\right]\eqno(7)]$

are considered, where (sinΘ_B/λ) is proportional to the momentum transfer and mean-square atomic vibrational amplitudes at room temperature, B_RT, were derived from X-ray diffraction measurements. In particular, the vibrational amplitudes and associated Debye temperatures, Θ_D, assembled in Table 1, were used. For the geometric portion of the structure factors, some crystallographic data from XOP were used.

Table 1
Atomic vibrational amplitudes and Debye temperatures used in the dynamical diffraction calculations

The origin of these data are indicated by the references.

Crystal material	B_RT (Å²)	Θ_D (K)
Si	0.4632^a	530.82
Ge	0.5661^b	290.03
LiNbO₃	Li: 0.5264^c	1118.44
	Nb: 0.4174	298.90
	O: 0.5738	643.27
Al₂O₃	Al: 0.1921^d	897.40
	O: 0.2271	1122.51
SiO₂	Si: 0.4874^e	516.38
	O: 0.9949	476.16
^aDeutsch & Hart (1985 ). ^bDeutsch et al. (1990 ). ^cEtschmann & Ishizawa (2001 ). ^dKirfel & Eichhorn (1990 ). ^eLePage et al. (1980 ).

An important parameter in the present context is the Darwin width of a reflection. It is given by

$[W={{ 2\Gamma\left(F_HF_{\overline H}\right)^{1/2} }/{ \sin(2\Theta_{\rm B}) }}.\eqno(8)]$

3. Spherical analyzer tables

The tables for the spherical analyzer are located at https://www.aps.anl.gov/Sectors/Sector30/AnalyzerAtlas/AnalyzerAtlas.html and constitute a compilation of near-backscattering reflections in silicon, germanium, lithium niobate (LiNbO₃), sapphire (Al₂O₃) and quartz (SiO₂) for Bragg angles in the range 70° to 90°.¹ Absorption edges and emission lines for a selection of chemical elements of interest in RIXS, which are included in the present compilation, are indicated in Fig. 3.

Figure 3
Absorption edges and emission lines for a selection of chemical elements included in the present data compilation.

Partial screenshots for the top-level menu and an example of a listing for the Cu K-edge are shown in Figs. 4 and 5. These tables are divided into two groups of crystals with Si and Ge at the top (highlighted in yellow), lithium niobate, sapphire and quartz at the bottom. Within these two groups reflections are arranged from top to bottom by strength, according to the integrated reflectivity $[\textstyle\int I_{\rm R}\,{\rm{d}}\Theta]$ . For lithium niobate, sapphire and quartz all equivalent reflections are listed, while for Si and Ge equivalent reflections are only listed if their indices are not simple permutations or inversions of the parent reflection. The following quantities are included in the tables:

Figure 4
Partial screenshot of the top-level spherical analyzer compilation. Pointing to an element highlighted in yellow will open a menu with available absorption-edge or emission-line data.

Figure 5
Partial screenshot of the spherical analyzer listing for an absorption-edge energy of 8.9805 keV (Cu K-edge).

Backscattering energy, E_B (keV). X-ray energy for which the incident beam is reflected at a Bragg angle of Θ_B = 90°. It is given by

$[E_{\rm B}=hc/2d_{hkl},\eqno(9)]$

where h is Planck's constant, c is the speed of light and d_hkl is the diffraction plane spacing. These are the lowest-energy photons that can be reflected by a particular analyzer.

Integrated reflectivity, $[\textstyle\int I_{\rm R}\,{\rm{d}}\Theta]$ (µrad). As a measure of the reflection strength this quantity represents a numerical integration of the dynamical reflectivity over the entire rocking curve.

Angular reflection (Darwin) width, W (µrad). Intrinsic, dynamical (Darwin) width associated with the symmetric reflection.

Change in energy with angle, dE/dΘ = E_icotΘ (meV µrad⁻¹). From the differential Bragg law, this quantity serves as the conversion factor from angular to energy width in convenient units and is included for guidance.

Intrinsic energy resolution, ΔE_a (meV). Energy resolution of the analyzer reflection owing to its intrinsic (Darwin) width, ΔE_a = WE_icotΘ_B.

Geometric contribution, ΔE_g (meV). Geometric contribution to the energy resolution, based on the analyzer radius R and the detector pitch p: ΔE_g = E_icot(Θ_B)p/2R. For the present tables the detector pitch is assumed to be p = 50 µm (Dectris `Mythen' detector) while the analyzer radius is R = 2 m.

Combined intrinsic and geometric energy resolution, ΔE_t (meV). ΔE_t = ( $[\Delta E_{\rm a}^{\,2}]$ + $[\Delta E_{\rm g}^{\,2}]$ )^1/2.

4. High-resolution monochromator tables

The tables for high-resolution channel-cut monochromator crystals are located at https://www.aps.anl.gov/Sectors/Sector30/AnalyzerAtlas/MonoAtlas.html and were assembled for combinations of a Si or diamond high-heat-load monochromator followed by one or two pairs of high-resolution Si channel-cut crystals, as indicated in Fig. 1.² The rationale for this crystal arrangement is inspired by the fact that the angular acceptance of the high-resolution portion is proportional to 1/sin(2Θ_B) [equation (5)]. This term becomes large for near-backscattering conditions and thus guarantees an optimal throughput, while many choices of reflections arise to closely match the bandpass to the analyzer resolution. The bandpass and throughput data were calculated by multiplying a Gaussian X-ray source distribution with all pertinent dynamical crystal reflectivities as shown in Fig. 6. The source distribution is given by

$[G(\Theta)=\exp\left(-\Theta^2/2\Sigma_v^{\prime\,2}\right),\eqno(10)]$

where

$[\Sigma_v^\prime=\left(\sigma_v^{\prime\,2}+\sigma_r^{\prime\,2}\right)^{1/2},\quad\sigma_v^{\prime\,2}\quad{\rm and}\quad\sigma_r^{\prime\,2}=hc/E_{\rm i}L_{\rm u}\eqno(11)]$

are the vertical combined, electron and photon beam divergences, respectively. For a typical undulator beamline at the Advanced Photon Source (APS), $[\sigma_y^{\prime}]$ = 3.3 µrad and the undulator length L_u is 4.8 m.

Figure 6
The product of a typical Gaussian source distribution and crystal reflectivities (left panel) leads to a reflectivity profile (right panel), which is the basis for the bandpass and throughput calculations.

The intensity profile resulting from the product is numerically integrated over angle and energy. A partial screenshot of a listing at the Cu K-edge is shown in Fig. 7. The following quantities are included in the tables:

Figure 7
Partial screenshot of a monochromator listing for an absorption-edge energy of 8.9805 keV (Cu K-edge).

Overall energy resolution, ΔE (meV), for the entire four- or six-bounce combination of crystals (FWHM).

Integrated throughput, $[\textstyle\int I_{\rm R}\,{\rm{d}}\Theta\,{\rm{d}}E]$ (µrad meV).

Figure-of-merit (FOM) (µrad), ratio of throughput per energy resolution.

While parts of the calculations presented here involve parameters specific to a particular beamline or facility, the resulting tables are general enough to be a useful guide for RIXS beamlines everywhere. In the spherical analyzer section only the last two columns contain such parameters. Here the term ΔE_g scales linearly with p and 1/2R as prescribed above and can easily be modified for a different geometry. In the same vein, the term ΔE_t can be expanded to include additional terms in a square-sum fashion. The monochromator tables involve source parameters specific to the APS. Nevertheless, they still provide useful guidance generally in as much as source characteristics of third-generation synchrotron sources are rather similar.

5. Example of the utility of the tables: 5d TMOs at the Ir L₃ absorption edge

For the purpose of illustrating the utility of the analyzer and monochromator tables presented here, a specific example of an optical configuration for RIXS measurements at the Ir L₃ absorption edge (E = 11.215 keV) is discussed. In recent years there has been a rapidly increasing interest in 5d transition metal oxides (TMOs), in particular the iridium compounds. These materials feature a rich spectrum of exotic electronic excitations, which are expected to lead to many novel phenomena of scientific and technological significance (Kim et al., 2012 ; Liu et al., 2012 ). In order to observe these excitations with RIXS, an energy resolution of 30 to 40 meV or better is required, substantially exceeding the typical conditions for this technique prior to this effort.

As explained in §1, the total energy resolution of the experimental set-up shown in Fig. 1 is chiefly given by the square root of a sum of squares, consisting of monochromator bandwidth, intrinsic analyzer resolution and geometric contributions owing to the detector pitch and source size at the sample. According to the present tables, a monochromator as shown in Fig. 1 and using a combination of Si(111) followed by either one or two Si(448) channel-cut crystals has a bandwidth of ΔE_i = 15.8 meV and 8.956 meV, respectively. Furthermore, a Si(448) reflection at 11.215 keV has an intrinsic resolution of ΔE = 14.57 meV, and a geometric detector contribution of ΔE_g = 10.47 meV, given a Rowland circle with a diameter of 2 m and a detector pitch of 50 µm. The associated source contribution from a beam size of 50 µm is ΔE_s = 20.95 meV. Altogether, the predicted energy resolution for such an experimental RIXS set-up is then ΔE_tot = 31.8 meV and 29.0 meV for the single and double monochromator combinations, respectively.

The two configurations described above have been implemented on RIXS instruments at the undulator beamlines 9-ID and 30-ID at the APS at Argonne National Laboratory. Measurements of elastic lines from a `standard' scatterer, Scotch Brand #810 Magic Mending Tape, which is composed of a cellulose acetate carrier and an acrylic polymer adhesive, are shown in Fig. 8. The dots represent measured data and the line is a Voigt-function fit. The full width at half-maximum was determined to be 34.4 meV and 33.8 meV, respectively, for the single and double monochromator, well within 10% of what was predicted based on the tables.

Figure 8
Measurements of elastic lines from a `standard' scatterer, Scotch Brand #810 Magic Mending Tape. Measured FWHM and calculated values based on present tables are well within 10% of each other.

6. Conclusions

Identifying near-backscattering reflections for spherical analyzers combined with matching monochromator characteristics, yielding a required energy-resolution with optimal throughput, has been a daunting challenge for RIXS experiments. The present compilation of analyzer reflections and channel-cut monochromator combinations was designed to aid the selection of crystals suitable for RIXS measurements at a particular absorption edge or for a particular emission line. In addition, the inclusion of lithium niobate, sapphire and α-quartz for spherical analyzers provides a theoretical basis for the characteristics that can be expected from these unusual crystal materials and can help to assess their actual performance in an experiment.

Supporting information

Spherical analyzer tables. DOI: https://doi.org/10.1107/S0909049512043154/ie5087sup1.pdf

High-resolution monochromator tables. DOI: https://doi.org/10.1107/S0909049512043154/ie5087sup2.pdf

Footnotes

‡Deceased.

¹The spherical analyzer tables are available in pdf format from the IUCr electronic archives (Reference: IE5087). Services for accessing these data are described at the back of the journal.

²The high-resolution monochromator tables are available in pdf format from the IUCr electronic archives (Reference: IE5087). Services for accessing these data are described at the back of the journal.

Acknowledgements

Use of the Advanced Photon Source at Argonne National Laboratory is supported by the US Department of Energy, Office of Science, Office of Basic Energy Sciences, under Contract No. DE-AC02-06CH11357.

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