2.1. Neutron total scattering measurements

Neutron total scattering experiments were undertaken using the NOVA neutron total scattering instrument (BL21 beamline) with a decoupled liquid hydrogen moderator, an incident flight path of 15 m and a scattered flight path of 1.2–1.3 m at the 90° detector bank [0.08 < d < 6.3 Å; d = 2π/Q = λ/(2sinθ)] connected to the 400 kW spallation neutron source at the Japan Proton Accelerator Research Complex. Contamination from the background intensities of the sample container and the instrument was subtracted, and the neutron attenuation factors of the sample and sample container were calibrated. Structural refinement of the diffraction data in reciprocal space and real space was carried out by Rietveld refinement using the computer program Z-Rietveld (Oishi et al., 2009; Oishi-Tomiyasu, 2012) and PDF refinement using PDFgui (Farrow et al., 2007), respectively. Si powder (NIST SRM 640d) was used as a standard to determine the relationship between lattice spacing d and time of flight, and to evaluate the accuracy of the crystal and local structural analyses. Palladium powder was purchased from Kojima Chemicals Co. Ltd. NaAlD₄–TiCl₃ was synthesized as described in a previous study (Ikeda et al., 2021). LaNi_4.5Al_0.5 was provided by Nippon Denko Co. Ltd and prepared as described in a previous study (Sakaki et al., 2009). Crystal and local structure analyses were performed using sapphire, which is chemically stable but contaminated with diffraction signals that should be excluded, and vanadium, which requires caution in high-temperature experiments in a hydrogen atmosphere.

2.2. Reverse Monte Carlo modeling

The atomic arrangements of LaNi_4.5Al_0.5 before and after hydrogen absorption were investigated by fitting to the diffraction pattern and its Fourier transform as a PDF using GSAS-II (Toby & Von Dreele, 2013) in conjunction with RMCProfile (Tucker et al., 2007). The method used 16 × 16 × 20 superlattices (La₅₁₂₀Ni₂₃₁₇₃Al₂₄₂₇ in 80.7 × 80.7 × 80.5 ų and La₅₁₃₁Ni₂₃₂₀₇Al₂₄₁₉D₂₇₁₀₈ in 85.6 × 85.6 × 85.4 ų) for the RMC structural modeling using diffraction patterns and a PDF of [c_i and b_i are the concentration and coherent bound scattering length, respectively, of atom i, and g_ij(r) is the partial pair distribution function of atoms i and j, respectively]. Initial structures were created in which each atom was randomly placed to match the Rietveld refinement results described above and reproduced by modeling. During the modeling, translation, deuterium and vacancy swaps, and Ni and Al swaps were attempted with probabilities of 0.6, 0.2 and 0.2, respectively. The maximum translation distances were restricted to 0.10 Å for deuterium and 0.05 Å for the metals. The atoms were constrained to move no closer together than the predefined cut-off distances of 2.20 Å in LaNi_4.53Al_0.47 and 1.30 Å in LaNi_4.53Al_0.47D_5.27.

3.1. Sapphire container

A single-crystal sapphire container (Orbe Pioneer Ltd) with an inner diameter of 5.8 mm, a wall thickness of 2.5 mm and a base thickness of 5.0 mm was fabricated to meet the study's requirements for safety and in situ neutron diffraction measurements [Fig. 1(a)]. First, the quality of the single-crystal sapphire container was investigated by neutron diffraction. NOVA is a neutron total scattering instrument that uses the time-of-flight method and consists of five position-sensitive detector (PSD) banks. As shown in Fig. S1(a) in the supporting information, the Laue pattern detected in the 90° bank confirmed that the single crystal was of good quality: the Laue spots were only detected at wavelength and scattering angle conditions that satisfied the Bragg equation. Since single crystals have a significantly higher Bragg peak intensity at specific detection pixels of the two-dimensionally arranged PSD, the diffraction signals (coherent scattering components) of such single crystals alone can be removed by setting an upper threshold value. In contrast, the diffraction signal of the powder inserted into the single-crystal container is uniformly distributed across the detector [Fig. S1(b)] and therefore a powder diffraction pattern is obtained from the region from which the single-crystal signals have been excluded.

Figure 1 Setups for (a) the single-crystal sapphire sample container with powder sample (NaAlD4–0.02TiCl3) and (b) the vanadium sample container for the in situ neutron total scattering experiments.

We performed neutron powder diffraction measurements on Si to compare the quality of the data obtained from the single-crystal sapphire container and an ex situ atmospheric-pressure vanadium container (with an inner diameter of 5.8 mm and a wall thickness of 0.1 mm) [Fig. 2(a)]. Data for the Si powder inserted into the single-crystal sapphire container and the empty container were obtained by the method described above. The 001 axis of the single crystal grew along the axis of the cylinder, but the crystal axis was not important. As shown in Fig. S1, the two containers had different crystallographic axes in the radial direction, but the total scattering curve structure factor S(Q) was obtained by typical data reduction, such as absorption correction and subtraction. However, this data processing method makes it difficult to distinguish between diffraction signals originating from the single-crystal sapphire and the Si powder in the high-Q region; therefore, an averaged crystal structure refinement was performed over a lattice spacing range of 0.6–4.0 Å (Table S1).

Figure 2 (a) Neutron diffraction patterns and Rietveld refinements, and (b) the PDF refinements for Si powder sealed in the single-crystal sapphire, in situ vanadium and ex situ vanadium sample containers. Rietveld refinement results: observed (circles), calculated (line) and residual (line below the vertical bars) diffraction profiles. PDF refinement results: observed (circles), calculated (line) and residual PDF profiles.

The FWHMs of the Si 111 diffraction peak from Gaussian fitting were 0.1805 (7) and 0.1802 (7) Å, respectively, for the single-crystal sapphire and ex situ vanadium containers. Since the design resolution of the NOVA 90° bank is approximately 0.5% (FWHM 0.016 Å), the peak widths derived from the sample could be evaluated. The atomic displacement parameter for the data from the single-crystal sapphire container was slightly larger than that for the ex situ vanadium container, but the reliability factors were comparable. Another advantage of two-dimensionally arranged detectors for the time-of-flight method is that the lattice spacing can be detected over a wide range of scattering angles, which produces a diffraction pattern with no missing signals. In contrast, for detectors placed at limited scattering angles in one dimension, the removal of single-crystal signals leads to discontinuities in the diffraction curve.

Before the experiment under hydrogen gas pressure, a pressure resistance test was conducted for the single-crystal sapphire container. No pressure drop was detected at 40 MPa of air at room temperature. The container flange was connected to the high-pressure gas piping through a copper holder (Pretech Co. Ltd) that could be sealed with a polyether ether ketone resin ring, and a vanadium radiation shield was placed around the container. The top surface of the holder was thermally connected to a copper component with an embedded cartridge heater (50 W) and a Gifford–McMahon refrigerator, allowing in situ neutron scattering experiments at temperatures up to 473 K and hydrogen/deuterium gas pressures up to 10 MPa. The copper holder had a built-in valve, and by connecting the sealed sample container in a glove box, drawing a vacuum inside the piping and then opening the valve, the sample could be used for the experiments without exposure to air.

Next, to confirm the validity of this container for in situ experiments, the deuterium absorption process of palladium was measured by neutron diffraction. Palladium inserted into the single-crystal sapphire container was maintained at 393 K, and deuterium was introduced stepwise up to 0.7 MPa to form a solid-solution phase followed by a hydride phase. A deuterium solid-solution phase (α-PdD_0.04) with a lattice expansion of 0.3% relative to metallic palladium was formed at an equilibrium pressure of 0.15 MPa, and a diffraction pattern of the deuteride phase (β-PdD_0.65) with periodically arranged deuterium atoms was reversibly obtained at 0.68 MPa [Fig. 3(b)] in conjunction with the measurement of the deuterium pressure–composition (p–c) isotherms (Fig. S2) (Flanagan & Oates, 1991). Data were obtained at 1 s intervals after introducing the deuterium gas all at once, which eventually reached an equilibrium pressure of 1 MPa to complete the deuterium absorption reaction of palladium within 10 s [Fig. 3(a)]. The structural change from metallic palladium to the deuteride phase via the deuterium solid-solution phase could be detected within seconds. These diffraction patterns appropriately excluded Al₂O₃ diffraction peaks originating from the sapphire. Although the diffraction peaks of the thermocouple were included around d = 2.1 Å in the current data, a diffraction pattern without any thermocouple impurity peaks can be obtained by controlling the sample temperature using a calibration curve between the set temperature and the sample section temperature of the copper holder. Structural analysis was also performed with LaMg₂Ni–D (Sato et al., 2017).

Figure 3 (a) Time transient (1 s intervals) and (b) static neutron diffraction patterns of palladium powder sealed in the single-crystal sapphire container.

PDF data can also be obtained by Fourier transformation of the total scattering curve [Fig. 2(b)]. Since the real-space resolution of the PDF is proportional to the inverse of Q_max (Nield & Keen, 2001; Egami & Billinge, 2003), and the single-crystal sapphire container was limited to about Q = 10 Å⁻¹, the standard deviations of the lattice constants and atomic displacements were relatively large (Table S1). Furthermore, second-by-second measurements may still be insufficient to obtain PDF data with sufficient statistical accuracy. Nevertheless, it is shown for the first time that chemically rigid single-crystal sapphire containers are effective for hydrogen gas experiments, and the PDF can also be derived.

3.2. In situ vanadium container

To compensate for the limited real-space resolution of the PDF measured by the single-crystal sapphire container, other materials were considered. Thin-walled vanadium-based containers with low coherent scattering lengths are often used for neutron diffraction measurements. Therefore, we designed a thick-walled in situ vanadium container with an inner diameter of 8.0 mm, a wall thickness of 1.5 mm and a bottom thickness of 4.0 mm to provide a pressure resistance of 40 MPa. Vanadium is inherently embrittled when reacted with hydrogen to form hydrides, but the hydrogen absorption reaction proceeds at around room temperature only after being baked in a vacuum above 473 K (Fig. S3). This is presumably due to the passivation of the surface oxide layer, so the surface of the container was intentionally oxidized by holding it at 773 K for 12 h in air. The powder sample was inserted into an open and thin-walled ex situ vanadium container and then sealed into the thick-walled in situ container to form a double structure. A typical hydrogen storage metal/alloy will expand in volume by about 30% due to hydrogen absorption, generating tens of megapascals of stress on the inner walls of the vessel (Okumura et al., 2021). Therefore, sample-derived stresses must be considered in addition to the high-pressure gas. If the inner ex situ vessel fails due to volume expansion caused by the sample absorbing hydrogen, the vanadium in the newborn surface will instantly react with hydrogen/deuterium gas (diffraction peaks of VD_0.5 or VD₂ will be detected), thus avoiding damage (gas leakage) to the outer container. The thick-walled in situ vanadium container was mounted in a valved copper holder (Pretech Co. Ltd) with an embedded cartridge heater (50 W) to provide the setup for in situ neutron scattering experiments at temperatures up to 423 K and hydrogen/deuterium gas pressures up to 10 MPa [Fig. 1(b)].

Next, we evaluated the diffraction pattern and the PDF of Si powder inserted into the in situ vanadium container by neutron total scattering measurements (Fig. 2). Compared with the ex situ containers, the vanadium thickness had little effect on the diffraction pattern and the PDF was observed. To avoid problems measuring at high temperatures, the in situ neutron total scattering pattern (Fig. S4) and P–C–T curve of NaAlD₄–TiCl₃ up to 10 MPa at 403 K were measured simultaneously (Ikeda et al., 2021). NaAlD₄, identified at room temperature after synthesis, decomposed to NaD and Al by desorbing deuterium under a vacuum at 403 K. Later, when the deuterium pressure was increased, the NaAlD₄ was reversibly combined via Na₃AlD₆. Equilibrium determination when measuring this system's P–C–T curve took about 3 h, but there was no leakage of high-pressure gas over several days of step-by-step airtightness. The Q region equivalent to that of the ex situ vanadium is available (Table S1), and other measurements have already been made for Y_0.8Mg_1.2Ni₄D_3.4 and Y_1.1Mg_0.9Ni₄D_3.9 at 5 MPa D₂ and 323 K (Sato et al., 2020).

3.3. In situ neutron total scattering experiments of LaNi_4.5Al_0.5

Since the thick-walled in situ vanadium container could be used up to the high-Q region and was expected to provide high resolution in real space in the PDF data, a detailed structural analysis of AB₅ alloy deuterides was carried out. AB₅ alloy hydrides, typically LaNi₅, have long been known as hydrogen storage alloys, and the results of many crystal structure analyses have been reported (Fischer et al., 1977; Percheron-Guégan et al., 1980; Yartys et al., 1982; Thompson et al., 1986; Lartigue et al., 1987; Latroche et al., 2004; Joubert et al., 2021). The symmetry is hexagonal, with the hydrogen occupying the O (A2B4) and T sites (A2B2, AB3, B4). Metal B sites are substituted with aluminium or other metals to control the hydrogen storage and charge–discharge characteristics of the Ni–MH battery's negative electrode (Achard et al., 1982; Crowder et al., 1982; Westlake, 1983b; Percheron-Guégan et al., 1985; Latroche et al., 1992; Du et al., 2003; Nakamura et al., 2004). On the basis of abundant information on the crystal structure of AB₅ alloy hydrides and on the Switendick criterion (Switendick, 1979) and the Westlake empirical rule (Westlake, 1983a; Rao & Jena, 1985), the H—H shortest distance and the minimum space have been deduced, and the hydrogen occupation sites have been analyzed. However, since no PDF has been studied for the AB₅ series of crystalline hydrides, in situ neutron total scattering measurements were performed to investigate in detail the atomic arrangement of the metal and hydrogen atoms.

The results of the Rietveld refinement in space group P6/mmm (No. 191) for the diffraction patterns of LaNi_4.5Al_0.5 before and after deuterium absorption at room temperature are shown in Fig. 4 and Table S2. The Rietveld refinement before deuterium absorption shows that this structural model works well, and the crystal structure information for a single phase of LaNi_4.6Al_0.4 and lattice constants of a = 5.042911 (9) Å and c = 4.027995 (11) Å were obtained. After deuterium absorption up to an equilibrium pressure of 1.8 MPa at room temperature, the lattice spacings lengthened [to a = 5.354025 (15) Å and c = 4.274487 (18) Å] and no new peaks appeared. The lattice is expanded by about 20% due to deuterium absorption, but no superlattice diffraction was detected and the single phase was maintained. These results are consistent with previously reported results (Percheron-Guégan et al., 1980).

Figure 4 Neutron diffraction patterns and Rietveld refinements for LaNi4.5Al0.5 (a) before, (b)–(i) during (10 s intervals) and (j) after deuterium absorption at room temperature. Rietveld refinement results: observed (circles), calculated (line) and residual (line below the vertical bars) diffraction profiles. Bragg reflection positions are from LaNi4.60Al0.40 and LaNi4.64Al0.36D4.99.

The Rietveld refinements show that the atomic displacement factors of La and Ni/Al are increased slightly and significantly, respectively, by deuterium absorption [U_La 0.00613 (6) Ų → 0.00786 (7) Ų and U_Ni/Al 0.00438 (4) Ų → 0.01545 (4) Ų]. These results suggest that the atomic positions have deviated from their average positions upon deuterium absorption. The atomic displacements of deuterium obtained from the Rietveld refinement were quite large; therefore, the deuterium occupation of the 6i site (A2B4 site in the AB₅ system) at (1/2, 0, 0.11996 (6)) could be split into the 12n site at (0.471 (3), 0, 0.103 (1)). The two models with deuterium on the 6i and 12n sites were compared, but the reliability factor improved by only 0.02%; therefore, the model with the 6i sites of higher symmetry was chosen for this study.

The transition process from the deuterium solid-solution phase to the deuteride phase up to an equilibrium pressure of 1.8 MPa at room temperature was investigated every 10 s, but a metastable intermediate phase was not detected (Fig. 4) (Joubert et al., 2006; Gray et al., 2011; Mohammadshahi et al., 2017). The lattice constant of the intermediate phase is close to that of the hydride (Machida et al., 2014) and it is difficult to distinguish between them in neutron diffraction, where the main scattering factor is the diffraction peak of deuterium, whose atomic displacement is larger than that of the metal. Additionally, the low fraction of the intermediate phase formed in aluminium-substituted LaNi₅ may be the reason why it was not detected (Nakamura & Akiba, 2000).

The refinement results with the initial structure of the Rietveld refinement parameters for the PDF for LaNi_4.5Al_0.5 before and after hydrogen absorption are shown in Fig. 5 and Table S2. The PDF patterns have changed drastically with deuterium absorption, indicating that deuterium with its large neutron scattering length has dissolved in the interstitial structure. The lattice constants increased from a = 5.04210 (2) Å and c = 4.02472 (4) Å to a = 5.35283 (5) Å and c = 4.27084 (7) Å. Similarly to the Rietveld results, the atomic displacements of the metal elements were increased by deuterium absorption [U_La 0.013 (1) Ų → 0.014 (1) Ų, U_Ni1 0.013 (1) Ų → 0.021 (1) Ų and U_Ni2/Al2 0.010 (1) Ų → 0.016 (1) Ų], suggesting that the metal atom positions have deviated from their average positions.

Figure 5 PDF refinements of LaNi4.5Al0.5 (a) before and (b) after deuterium absorption at room temperature. PDF refinement results: observed (circles), calculated (line) and residual PDF profiles.

The diffuse scattering component in S(Q) was properly reduced, resulting in a slight change in composition relative to the Rietveld refinement, which improved the accuracy of the subsequent analysis. A partial PDF simulation pattern was then evaluated on the basis of the refined crystal structure (Fig. S5). Since the PDF refinement uses an averaged structure based on the crystal structure information of the unit cell, there were D–D correlations even at r < 1 Å due to simultaneous deuterium occupation with low occupancy. In other words, the slightly insufficient refinement of LaNi_4.53Al_0.47D_5.27 at r < 2.1 Å was due to the inclusion of D–D correlations that were not present, in addition to D–Ni. The function used for the PDF refinement was [g(r) − 1] multiplied by r, which emphasizes the structural information in the medium range and de-emphasizes the short-range region. However, g(r) accurately extracted information in the short range, allowing for a detailed discussion of the intrinsic local structure around the deuterium.

For this situation, RMC structural modeling of 16 × 16 × 20 superlattices (La₅₁₂₀Ni₂₃₁₇₃Al₂₄₂₇ in 80.7 × 80.7 × 80.5 ų and La₅₁₃₁Ni₂₃₂₀₇Al₂₄₁₉D₂₇₁₀₈ in 85.6 × 85.6 × 85.4 ų) was performed to investigate the detailed local structure (Fig. S6). Although the atomic arrangement is finite, unlike an ideal crystal, the model was constructed to reproduce the measured information in reciprocal and real space. Note that to separate the first (D–Ni/Al) and second (D–La, Ni–Ni and Ni–Al) pair correlation peaks of LaNi_4.53Al_0.47D_5.27, a Fourier transform using S(Q) up to Q_max = 50 Å⁻¹ was required, as shown in Fig. S7, and in situ neutron total scattering experiments using double-walled vanadium containers can provide such data.

The partial correlations obtained from the modeling are shown in Fig. 6. Both metal–metal correlations are elongated and have broadened distributions due to deuterium absorption, which is consistent with the Rietveld and PDF refinement results. The initial structure, with about 12% of the 3g site Ni partially substituted for Al in the Rietveld refinement, shows that Al–Al correlations appear at the same distance (r ≃ 2.5 Å) as the Ni–Ni correlations with composition-dependent intensity in the averaged structure. However, by swapping Ni for Al in the random configuration as the initial structure, no possible first nearest Al–Al correlation at the 3g site appears. Such correlations, which only appear at r > 3.5 Å after the modeling, could properly characterize the atomic arrangement. The model with crystal structure information for the metal–metal correlations approaching r < 1 Å in the LaNi₅-based system was rejected because the pair correlation had not been measured. Similarly, the D–D correlations expressed in the PDF refinement by the average structural model for r < 1 Å were almost non-existent in the RMC modeling results, confirming the Switendick criteria and the Westlake empirical rule that D–D cannot be closer than 2 Å (Switendick, 1979; Westlake, 1983a), as shown in the experimental results. While an average structural analysis can only guess the nearest-neighbor distance from the sites occupied by atoms and their occupancies, the local structure analysis presented in the current study allows experimental conclusions to be drawn.

Figure 6 Partial PDF of LaNi4.5Al0.5 before and after deuterium absorption at room temperature.

The local structure around hydrogen, which is directly related to hydrogen storage properties, is characterized by the first nearest pair correlations of D–Ni and D–Al (r ≃ 1.7 Å) and D–La (r ≃ 2.5 Å). From these atomic coordinates and the atomic radii of Ni (1.246 Å), Al (1.432 Å) and La (1.877 Å) (Westlake, 1983b), the space occupied by deuterium was further analyzed in detail. In the atomic arrangement after modeling, the deuterium occupying 27 108 sites forms 124 510 deuterium–metal correlations, and the ratio of each correlation to the total is shown for each occupied site (Fig. 7). The empirical rule estimates that the hole sizes are greater than 0.4 Å, but the current study indicates that they are longer than 0.3 Å. The average structural analyses of neutron diffraction measurements indicate that deuterium occupies the A2B4, A2B2, AB3 and B4 sites in the AB₅ system, but the B4 site has the lowest occupancy (Percheron-Guégan et al., 1980; Achard et al., 1982; Du et al., 2003; Nakamura et al., 2004). Theoretical investigations have similarly claimed that hydrogen occupies the A2B4, A2B2 and AB3 sites, but not the B4 site (Zhang et al., 2006; Chen et al., 2007; Zhang et al., 2008). In the current study, the deuterium occupancy (ratio of deuterium to metal, D/M) in the initial structure was 0.57 at A2B4 and 0.31 at A2B2, while the modeling resulted in D/M of 0.26 at A2B4, 0.32 at A2B2, 0.27 at AB3 and 0.03 at B4 (Table 1). However, the A2B4 site is composed of three short (r ≃ 1.7 Å, hole size ≃ 0.5 Å) and one unusually long (r ≃ 2.5 Å, hole size ≃ 1.3 Å) D–B correlations, as shown in Fig. 7. By excluding the longest correlation, the occupied polyhedron was regarded as bipyramidal A2B3 (Guénée et al., 2003) and the space larger than 1.2 Å in the distribution shown in Fig. 7 disappeared, thus approaching a normal distribution (Fig. S8).

Figure 7 (a) Crystal structure with space group P6/mmm (No. 191) and (b) hole-size distribution of the deuterium occupation sites A2B4, A2B2, AB3 and B4 for LaNi4.5Al0.5 after deuterium absorption, indicated using the ratio of each D–M correlation to the total. The distribution using the ratio to constituent elements is also shown.

Although the current model was analyzed without assuming empirical rules or the symmetry of the crystal structure, the obtained atomic arrangements are consistent with those previously reported. In addition, the Al ratios of the polyhedra occupied by deuterium are all lower than the compositional average (Table 1). There is no bias in the occupancy and hole sizes of the A2B4, A2B2 and AB3 sites occupied by deuterium, and the compositions are lower than the Al average composition of 0.0948, suggesting that deuterium is avoiding Al for chemical reasons. Theoretical calculations indicate that hydrogen tends to avoid aluminium atoms and would not be stationed at those interstitial sites partly surrounded by Al (Zhang et al., 2006). This is in good agreement with the experimental finding that the hydrogen content of hydrides is reduced with the substitution of Al for Ni (Percheron-Guégan et al., 1985), which is also consistent with the trend observed in the current study. Average structural analysis using Rietveld or PDF refinements does not provide this information because they cannot distinguish between elements occupying the same site, and they only address small differences in atomic displacement. Local structural analysis, such as that carried out in the current study, provides essential information for the future development of hydrogen storage materials.