1. Introduction

A wide range of commercial and non-commercial reaction cells have been developed for studying chemical reactions in situ by X-ray or neutron diffraction (Van Beek & Pattison, 2019), but so far hydrothermal reactions have been studied using such techniques exclusively in transmission geometry (Norby, 2006). Such transmission cells can be obtained by modifications of laboratory autoclaves (Van Beek & Pattison, 2019) and are suited to studying the formation of tobermorite and other calcium silicate hydrates at saturated vapour temperatures of 463 K (Bernstein, 2011), 463–583 K (Shaw et al., 2000) and 463 K (Kikuma et al., 2010; Matsui et al., 2011). However, beamline time is limited and the lengths of these experiments vary between 5 h (Shaw et al., 2000) and 13.5 h (Matsui et al., 2011). Cells used to study these hydrothermal reactions with conventional laboratory X-ray diffractometers and reflection geometry have not yet been documented. This laboratory note details such a cell, which was developed by Anton Paar (Anton Paar GmbH, Graz, Austria), and the accompanying analytical setup used for in situ monitoring of tobermorite formation in association with the production of autoclaved aerated concrete (AAC).

2. Experimentation

2.1. The device

The autoclave chamber (Fig. 1) is a device constructed by Anton Paar for temperatures <483 K and saturated vapour pressure <2 MPa. It is a flat-plate chamber comprising a stainless steel body, thermal insulation and a front face screw-on lid. X-rays are able to pass through beryllium windows protected by Kapton polyimide foil; the associated intensity loss is ca 45% under ambient conditions. The formation of condensate droplets on the inside is minimized by applying a surfactant solution prior to each experiment. The chamber is mounted in the middle of the goniometer and can be adjusted in height by ±3 mm to compensate for different specimen thicknesses [Fig. S1(e) in the supporting information]. Because of the design the temperature has no significant influence on the Bragg–Brentano geometry. A slight tilt can be corrected by adjusting the θ offset.

Figure 1 A schematic cross section through the autoclave chamber, a flat-plate chamber for temperatures <483 K and saturated vapour pressure <2 MPa. The front face screw-on lid is not shown in this figure.

Saturated steam is supplied from an external boiler equipped with a tray of calcium hydroxide for scrubbing carbon dioxide. As the steam enters the chamber through the stainless steel body, a homogeneous temperature is maintained, which is measured below the specimen by a PT100 sensor. Constant conditions can be achieved with a precision of ±0.5 K. Pressure is measured at the condensate outlet by an analogue gauge with an accuracy of ±0.025 MPa. Condensate can drain through a vent or reflux to the steam supply boiler supported by an oscillation pump. Separate tubing within the stainless steel body is connected to an external circulation thermostat. The respective pipes are fitted to the diffractometer (in this case a Bruker D8 Advance) without modification of the safety enclosure (here a D8 Discover enclosure).

In the Bragg–Brentano geometry an even specimen surface is crucial for obtaining valid X-ray diffraction (XRD) data. Cracking, buckling or tilting of the surface may obstruct ideal focusing conditions. Therefore cementitious mixtures are favourable to achieve these conditions. A stable surface is generally obtained after 12 h of hydration prior to measurement. The sample trays constructed for the device are 40 × 40 × 14 mm, made out of nickel, and available with specimen depths of either 12 or 2 mm. The 12 mm deep trays can be partially filled with hollow stainless steel cylinders [Fig. S1(a)] to reduce the amount of sample needed and to improve surface stability. Condensate leaching is prevented by a curved sample cover made out of 0.5 mm poly(tetrafluorethylene) foil featuring a 40 × 13 mm slot for X-rays.

3. Results and discussion

Fig. 2 shows four diffractograms ranging from 26 to 29.3° 2θ, close to and at 466 K (>230 min). Changes in the reflection intensities of quartz 101 [SiO₂, Powder Diffraction File (PDF; International Centre for Diffraction Data, Newtown Square, Pennsylvania, USA; https://www.icdd.com) card 46-1045; Kern & Eysel, 1993] and tobermorite 110 [Ca_4.5Si₆O₁₄(OH)₃ 2H₂O, PDF card 83-1520; Hamid, 1981] indicate that a hydrothermal reaction takes place. Fluorite 111 (CaF₂, PDF card 35-0816; Swanson et al., 1985) is seen to be essentially inert and serves as an internal standard.

Figure 2 X-ray diffraction results close to and after reaching constant hydrothermal conditions at 466 K and 1.35 MPa (230 min). The tobermorite 110 reflection intensity increases as the quartz 101 reflection intensity decreases. Fluorite serves as internal standard. (See Fig. S2 in the supporting information for the full range.)

In Fig. 3 normalized reflection intensities are shown. Below 443 K the fluorite and quartz intensities decrease proportionally in response to increasing temperature and pressure. The steam density inside the autoclave chamber changes from 0.59 kg m⁻³ at 373 K to 6.86 kg m⁻³ at 466 K (Harvey, 1998), which is accompanied by an increase in X-ray absorption. Up to 466 K (230 min) the fluorite reflection intensity decreases by ca 50%. It is fitted by an empirical exponential function (dashed line) and used to make a temperature correction. Above 443 K, the quartz intensity decreases significantly faster than the fluorite intensity, which marks the beginning of hydrothermal dissolution. The quartz dissolution can be approximated as a first-order reaction behaviour after temperature correction (k = 7.8 × 10⁻⁵ s⁻¹, solid line). The intensities in the 2θ range of tobermorite reflections start to increase at >443 K (>130 min), with a distinct increase of the 110 reflection starting at 210 min, and then a continuous increase according to a first-order reaction behaviour (k = 6.1 × 10⁻⁵ s⁻¹, solid line). In compliance with previous studies, tobermorite forms via poorly crystalline calcium silicate hydrates, initially limited by the dissolution of quartz (Matsui et al., 2011).

Figure 3 Time-resolved normalized reflection intensities from 373 K (0 min) to constant conditions at 466 K and 1.35 MPa (>230 min). Below 443 K, the fluorite and quartz intensities decrease proportionally in response to increasing temperature and pressure, while above 443 K further decrease of the quartz intensities is related to hydrothermal dissolution. The approximation (solid line) is a combination of temperature correction (dashed line) and a first-order reaction behaviour. Distinct tobermorite crystallization starts at 210 min and a first-order reaction behaviour can be assumed (solid line).

To interpret these reaction rates, surface sensitivity has to be considered. At an incident angle of 20° the penetration depth is expected to be less than 120 µm. Despite a constant steam density at 466 K (>230 min), Fig. 3 shows a slight decrease in the fluorite 111 reflection intensity. This may reflect the preferred growth of tobermorite crystals on the sample surface, which could mask fluorite and quartz. Accordingly, in Fig. 4 the intensity of the fluorite 111 reflection after hydrothermal reaction is lower than before. Upon homogenization, fluorite 111 regains its original reflection intensity while tobermorite 110 remains lower in intensity. Homogenization is accompanied by a notable increase in the intensity of the quartz 101 reflection, which could be related to the initial gravitational settling of larger less-reactive quartz grains. Therefore, the reaction rates derived from the decrease of quartz 101 reflection intensities could be overestimated.

Figure 4 Plots of θ-corrected X-ray diffraction results before (11 min) and after hydrothermal reaction. Homogenization significantly increases the intensity of the quartz 101 reflection, indicating some surface sensitivity of the in situ measurements. (See Fig. S3 for the full range)

4. Conclusions

This reflection setup is suitable for in situ monitoring of hydrothermal reactions and can provide routine information for time-resolved phase quantification. However, in contrast with transmission setups, there are limitations in time resolution, lower signal-to-noise ratios, additional temperature influences and limitations in penetration depth. An internal standard can be used to reveal migration within the sample, correct the influence of temperature on reflection intensities or quantify amorphous content by Rietveld analysis. Due to differences in experimental setup, reaction rates might differ from previous studies of cementitious mixtures in association with the production of autoclaved aerated concrete (Kikuma et al., 2010; Matsui et al., 2011). However, the surface sensitivity of this reflection setup could provide additional spatial information on the nature of hydrothermal reactions at interfaces. In situ monitoring of other systems is possible if, in accordance with Bragg–Brentano geometry, a stable and even surface can be obtained.

5. Supporting data

Measurement data are available at https://drive.google.com/open?id=1vKxa3fHu92Cc03_U3eGD43c5m2R5EMpK.