Resonant inelastic x-ray scattering of magnetic excitations under pressure
Matteo Rossi, Christian Henriquet, Jeroen Jacobs, Christian Donnerer,, Stefano Boseggia, Ali Al-Zein, Roberto Fumagalli, Yi Yao, James G. Vale,, Emily C. Hunter, Robin S. Perry, Innokenty Kantor, Gaston Garbarino, Wilson, Crichton, Giulio Monaco, Desmond F. McMorrow

TL;DR
This paper develops a high-pressure, low-temperature RIXS setup to study magnetic excitations, demonstrated by probing Sr$_3$Ir$_2$O$_7$ at pressures up to 12 GPa, advancing experimental capabilities in magnetic excitation research.
Contribution
It introduces a novel high-pressure, low-temperature RIXS experimental setup for studying low-energy magnetic excitations.
Findings
Successfully probed magnetic excitations of Sr$_3$Ir$_2$O$_7$ at 12 GPa
Demonstrated feasibility of high-pressure RIXS measurements
Enhanced experimental conditions for magnetic excitation studies
Abstract
Resonant inelastic x-ray scattering (RIXS) is an extremely valuable tool for the study of elementary, including magnetic, excitations in matter. Latest developments of this technique mostly aimed at improving the energy resolution and performing polarization analysis of the scattered radiation, with a great impact on the interpretation and applicability of RIXS. Instead, this article focuses on the sample environment and presents a setup for high-pressure low-temperature RIXS measurements of low-energy excitations. The feasibility of these experiments is proved by probing the magnetic excitations of the bilayer iridate SrIrO at pressures up to 12 GPa.
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Present address: ]Stanford Institute for Materials and Energy Sciences, SLAC National Accelerator Laboratory and Stanford University, 2575 Sand Hill Road, Menlo Park, California 94025, USA.
Present address: ]Department of Physics, Faculty of Sciences, University of Balamand, P.O. Box 100, Tripoli, Lebanon.
Present address: ]Dipartimento di Fisica, Politecnico di Milano, Piazza Leonardo da Vinci 32, I-20133 Milano, Italy.
Present address: ]Karlsruher Institut für Technologie, Institut für Festkörperphysik, Hermann-v.-Helmholtz-Platz 1, D-76344 Eggenstein-Leopoldshafen, Germany.
Present address: ]MAX IV Laboratory, Lund University, SE-221 00 Lund, Sweden.
Present address: ]Dipartimento di Fisica, Università di Trento, via Sommarive 14, I-38123 Povo (TN), Italy.
Present address: ]Dipartimento di Fisica, Politecnico di Milano, Piazza Leonardo da Vinci 32, I-20133 Milano, Italy.
Resonant inelastic x-ray scattering of magnetic excitations under pressure
Matteo Rossi
[
ESRF – The European Synchrotron, 71 Avenue des Martyrs, CS 40220, F-38043, Grenoble, France
Christian Henriquet
ESRF – The European Synchrotron, 71 Avenue des Martyrs, CS 40220, F-38043, Grenoble, France
Jeroen Jacobs
ESRF – The European Synchrotron, 71 Avenue des Martyrs, CS 40220, F-38043, Grenoble, France
Christian Donnerer
London Centre for Nanotechnology and Department of Physics and Astronomy, University College London, Gower Street, London WC1E6BT, United Kingdom
Stefano Boseggia
London Centre for Nanotechnology and Department of Physics and Astronomy, University College London, Gower Street, London WC1E6BT, United Kingdom
Diamond Light Source, Harwell Science and Innovation Campus, Didcot, Oxfordshire OX11 0DE, United Kingdom
Ali Al-Zein
[
ESRF – The European Synchrotron, 71 Avenue des Martyrs, CS 40220, F-38043, Grenoble, France
Roberto Fumagalli
[
ESRF – The European Synchrotron, 71 Avenue des Martyrs, CS 40220, F-38043, Grenoble, France
Yi Yao
[
ESRF – The European Synchrotron, 71 Avenue des Martyrs, CS 40220, F-38043, Grenoble, France
James G. Vale
London Centre for Nanotechnology and Department of Physics and Astronomy, University College London, Gower Street, London WC1E6BT, United Kingdom
Laboratory for Quantum Magnetism, Ecole Polytechnique Fédérale de Lausanne (EPFL), CH-1015, Switzerland
Emily C. Hunter
Centre for Science at Extreme Conditions, The University of Edinburgh, Mayfield Road, Edinburgh EH9 3JZ, United Kingdom
Robin S. Perry
London Centre for Nanotechnology and Department of Physics and Astronomy, University College London, Gower Street, London WC1E6BT, United Kingdom
Centre for Science at Extreme Conditions, The University of Edinburgh, Mayfield Road, Edinburgh EH9 3JZ, United Kingdom
Innokenty Kantor
[
ESRF – The European Synchrotron, 71 Avenue des Martyrs, CS 40220, F-38043, Grenoble, France
Gaston Garbarino
ESRF – The European Synchrotron, 71 Avenue des Martyrs, CS 40220, F-38043, Grenoble, France
Wilson Crichton
ESRF – The European Synchrotron, 71 Avenue des Martyrs, CS 40220, F-38043, Grenoble, France
Giulio Monaco
[
ESRF – The European Synchrotron, 71 Avenue des Martyrs, CS 40220, F-38043, Grenoble, France
Desmond F. McMorrow
London Centre for Nanotechnology and Department of Physics and Astronomy, University College London, Gower Street, London WC1E6BT, United Kingdom
Michael Krisch
ESRF – The European Synchrotron, 71 Avenue des Martyrs, CS 40220, F-38043, Grenoble, France
Marco Moretti Sala
[
ESRF – The European Synchrotron, 71 Avenue des Martyrs, CS 40220, F-38043, Grenoble, France
Abstract
Resonant inelastic x-ray scattering (RIXS) is an extremely valuable tool for the study of elementary, including magnetic, excitations in matter. Latest developments of this technique mostly aimed at improving the energy resolution and performing polarization analysis of the scattered radiation, with a great impact on the interpretation and applicability of RIXS. Instead, this article focuses on the sample environment and presents a setup for high-pressure low-temperature RIXS measurements of low-energy excitations. The feasibility of these experiments is proved by probing the magnetic excitations of the bilayer iridate Sr3Ir2O7 at pressures up to 12 GPa.
I Introduction
Resonant inelastic x-ray scattering (RIXS) is a photon-in photon-out spectroscopic technique that allows to study the low-energy physics of materials by probing their elementary excitations Schulke (2007); Ament et al. (2011a). The RIXS process consists in the resonant photoexcitation of a core electron into an empty state above the Fermi level and the subsequent radiative de-excitation of the system. The final state of the system – either the ground state itself or an excited state – is characterized by the energy, momentum and polarization difference between the incident and emitted photons. Due to the resonant nature of the scattering process and to the use of x-rays, RIXS is an element- and orbital- selective, momentum resolved, bulk sensitive technique Ament et al. (2011a). Different types of excitations can be accessed over an extended energy range, from several hundreds of eV down to a few meV, and this limit is continuously being pushed. Indeed, in the last decade, enormous progresses have been made in terms of energy resolution by building RIXS spectrometers on dedicated beamlines Moretti Sala et al. (2013); Lai et al. (2014); Dvorak et al. (2016); Moretti Sala et al. (2018); Kim et al. (2018); Brookes et al. (2018). At the same time, initial difficulties in the interpretation of RIXS experiments have been overcome by exploiting its complementarity to other experimental techniques and by developing suitable theories Ament et al. (2009); Haverkort (2010); Ament et al. (2011a, b); Moretti Sala et al. (2014). A prominent example of RIXS application originates from the theoretical demonstration Ament et al. (2009); Haverkort (2010); Moretti Sala et al. (2011) and experimental observation Braicovich et al. (2010) that RIXS can detect single spin-flip excitations in copper-based superconductors (cuprates), leading to an extensive use of RIXS for the study of their magnetic dynamics Le Tacon et al. (2011); Dean et al. (2013); Dean (2015), in a way complementary to inelastic neutron scattering (INS) Tranquada et al. (1989); Coldea et al. (2001); Headings et al. (2010).
In the hard-x-ray energy range, RIXS benefits from an additional advantage: it can be coupled to complex sample environments to study matter under extreme conditions Rueff and Shukla (2010); Kim (2016). In particular, the application of high pressure is a valuable tool to investigate the properties of matter Mao et al. (2018), since it can effectively alter the electron density and, ultimately, induce structural, electronic and magnetic phase transitions Klotz (2012); Gor’kov and Kresin (2018); Mao et al. (2018). However, high-energy-resolution RIXS measurements at high pressure are difficult Rueff and Shukla (2010); Kim (2016) and even more so when dealing with low-energy excitations, such as magnetic ones. As a matter of fact, to the best of our knowledge, no such measurements have ever been reported. Note that this field is rather unexplored as a whole, as the main probe of magnetic excitations, INS, is limited to relatively low pressures ( GPa) Klotz (2012) by the competing requirements of the large sample volume required by neutron techniques ( 1 cm3) and high-pressure experiments.
We here discuss recent instrumental developments made at beamline ID20 of the ESRF – The European Synchrotron (Grenoble, France) that allowed us to perform RIXS measurements of low-energy magnetic excitations under pressure. As a test case, we consider iridium oxides as they attracted the attention of the scientific community in the last decade Witczak-Krempa et al. (2014); Rau et al. (2016). Indeed, they feature electron-electron and spin-orbit interactions of comparable strength, leading to unexpected properties, including the so-called spin-orbit-induced Mott insulating state Kim et al. (2008, 2009). The single-layer Sr2IrO4 () is the prototypical spin-orbit-induced Mott insulator Kim et al. (2008, 2009) and develops long-range (canted) antiferromagnetic (AFM) order below a Néel temperature of K Cao et al. (1998). It has been in the focus of numerous theoretical and experimental investigations regarding its similarities with cuprates Kim et al. (2012a, 2014a); de la Torre et al. (2015); Kim et al. (2015); Yan et al. (2015); Gretarsson et al. (2016); Liu et al. (2016); Terashima et al. (2017); Pincini et al. (2017); Calder et al. (2018) and the possibility to host unconventional superconductivity Wang and Senthil (2011); Watanabe et al. (2013); Yang et al. (2014); Meng et al. (2014). The bilayer Sr3Ir2O7 is the member of the Ruddlesden-Popper series Srn+1IrnO3n+1 and shares with Sr2IrO4 many physical properties, including a Mott-insulating ground state of relativistic nature Moon et al. (2008) and the tendency to develop long-range AFM order below K Cao et al. (2002); Boseggia et al. (2012). However, the microscopic mechanisms that govern magnetism in Sr3Ir2O7 are debated since two different theoretical models have been proposed to interpret its magnetic structure and dynamics Kim et al. (2012b); Moretti Sala et al. (2015). The two models are mutually exclusive, as they cast the main exchange couplings into two opposite scenarios: Kim et al. proposed a linear spin-wave approach with dominant intralayer interaction Kim et al. (2012b), whereas Moretti Sala et al. pursued a bond-operator mean-field approach with predominant interlayer, dimer-like interactions Moretti Sala et al. (2015). Despite fundamental differences, the two theoretical approaches fit equally well the magnetic dynamics of Sr3Ir2O7 at ambient pressure, with a bandwidth of meV and an anomalously-large magnetic gap of meV. In order to discriminate between the two models, the evolution of magnetic excitations should be tested against well-defined and controlled perturbations of the system. In this respect, the magnetic dynamics of (Sr1-xLax)3Ir2O7 was studied as a function of doping (up to ), but without conclusive evidence in favour of either model Hogan et al. (2016a); Lu et al. (2017). In addition, it is often argued that doping is not a “clean” perturbation, as it introduces disorder in the system, thus making the interpretation of experimental results less reliable. We therefore propose to use physical pressure as an alternative and clean manner to perturb the system and prove the feasibility of this approach. Indeed, the application of physical pressure does not modify the chemical composition of the system and can be gradually tuned from arbitrarily small to very large values, up to hundreds of GPa’s.
Thus, once established as a viable technique, it is not difficult to imagine that high-pressure RIXS to probe the magnetic quasiparticle spectrum will find general use and produce results of widespread interest.
II Background considerations
High-pressure experiments require the use of so-called diamond anvil cells (DACs), in which two diamonds are pushed one against the other to apply pressure to a sample in between them. The sample chamber is obtained by perforating a small hole in a gasket that prevents the two diamonds from touching. The high-pressure environment therefore completely embeds the sample and poses several constraints on the experiment, including the limitation of x-ray experiments under high pressure to the hard x-ray range. RIXS excitations of single crystalline materials are usually probed at specific transferred momenta, hence the requirement of precise scattering geometries. However, the severe geometrical constraints imposed by the DAC and the gasket often limit the accessible scattering geometries. Another important aspect to take into account is that the sample environment absorbs part of the radiation. Since RIXS is a photon hungry technique, it is therefore imperative to minimize the x-ray absorption through the sample environment, as well as maximize the collected solid angle and optimize the sample volume. This last point is very delicate: on the one hand, the maximum reachable pressure depends on the diamond culets, which ultimately limit the sample dimension; on the other hand, the sample size should exceed the x-ray penetration depth in order to maximize the RIXS scattering cross-section. The best compromise is that the sample has roughly the dimensions of the x-ray focal spot size ( 2) times the x-ray penetration depth ( in Sr3Ir2O7 at the Ir edge). Finally, x-ray scattering from the sample environment – typically non-resonant elastic and inelastic scattering from the gasket and/or the diamonds of the DAC – contributes to the background noise, which may even be stronger than the actual RIXS signal. Note that elastically-scattered x-rays from a source slightly off the sample position will impinge on the crystal analyzer at an angle different than the nominal Bragg angle and will be interpreted as inelastic signal, thus potentially giving rise to artifacts in the RIXS spectrum. In addition, x-ray scattering from crystalline diamonds will feature sharp phonon peaks at an energy loss up to meV Warren et al. (1967). Similarly, the gasket is also a source of inelastic scattering. In the case that amorphous beryllium is used, however, the phonon signal is a broad weak distribution, resembling the phonon density of states and extending up to meV Schmunk et al. (1962); Stedman et al. (1976).
In order to cope with most of the difficulties described above, we adopted a scattering geometry as close as possible to where the x-rays travel through the gasket of the DAC. For the horizontally polarized light used in our experiments, this geometry leads to a large suppression of all spurious processes arising from Thomson scattering. The choice of the gasket material is then restricted to beryllium, because of its low absorption of hard x-rays. The main drawbacks are the low shear strength and brittleness, which limit the maximum reachable pressure.
III Sample environment
III.1 Diamond anvil cell and gasket
Diamond anvil cells are standard tools to perform experiments at pressures up to several hundreds of GPa Jayaraman (1983); Bassett (2009). For our experiment we designed and built a customized DAC, shown in Fig. 1: It features two large opening windows of in the scattering plane and in the plane orthogonal to it (see also Ref. Sahle et al., 2017).
The extra-high 16-sided (100)-oriented diamond anvils are in the middle of the opening window. They are based on the type Ia Boehler-Almax design Boehler and Hantsetters (2004) (diameter of 3.1 mm, height of 2.72 mm, angle of the diamond faces of ). Diamonds of culet size ranging from 0.25 mm (maximum pressure GPa) to 0.5 mm (maximum pressure GPa) are used to cover different pressure ranges. A cylinder-piston system (modified LeToullec design Letoullec et al. (1988)) allows the movement of the diamond anvils along the compression axis. The anvils are pushed together by the application of force on one diamond through a gas-driven membrane that is connected to a pressure controller. The beryllium gasket with an outer diameter of 5 mm and a thickness of 0.2 mm was pre-indented to approximately 1/10 of the culet size (i.e. -) before the experiment and a sample chamber with diameter approximately equal to 50-60% of the culet size is laser-drilled in the center to accommodate the sample.
An image of a typical sample loading is shown in Fig. 2. Panel (a) shows the culet of one anvil, in the middle of which a single crystal of Sr3Ir2O7 is loaded. The sample has been polished roughly to the desired size. Sr3Ir2O7 naturally cleaves into layers orthogonal to the axis, with sharp edges parallel either to the (100) or to the (110) axes, as illustrated in the Figure. We chose inert neon as pressure-transmitting medium since it is almost transparent to x-rays and it ensures a quasi-hydrostatic compression of the sample. Pressure in the DAC was determined by tracking the energy position of the fluorescence line of a ruby (Al2O3:Cr3+) sphere placed next to the sample Mao and Bell (1976). Panel (b) shows the sample and the ruby sphere after the gasket has been put between the diamond anvils. The laser-drilled sample chamber with diameter of is visible.
III.2 Cryostat
The Panoramic DAC is placed inside a cryostat, in such a way that the compression axis is vertical and the wide opening windows are horizontal in the laboratory reference frame (Fig. 3). The outer part of the cryostat is the vacuum chamber. It is made of stainless steel to withstand ambient pressure and is fixed on the RIXS sample goniometer. Two large windows have been opened in the walls of the chamber and covered by an x-ray-transparent 0.1-mm-thick Kapton foil. The vacuum is as good as mbar during the measurements. The vacuum chamber hosts the entries for the siphon, the vacuum pumping port, the electric wiring connectors, and a feed-through for the capillary that connects the pressure controller to the cell membrane. The Panoramic DAC is placed inside a copper main heat exchanger, which is cooled down by a continuous flow of helium. Its temperature is measured by a Cernox® sensor and regulated by resistive Kapton foil heaters. Helium then flows through stainless steel capillaries into a copper secondary heat exchanger before it is evacuated through the input siphon. The temperature of the secondary exchanger is measured and regulated in a similar fashion as the main heat exchanger. It is designed such that the contact surface between the secondary exchanger and the vacuum chamber is minimized and the thermal paths are maximized for thermal decoupling. Furthermore, thermally-insulating washers are utilized to fix the two elements. Because of the cylindrically-symmetric design of the cryostat, the position of the DAC moves by less than in the horizontal plane and by along the vertical axis when cooled from room temperature to 100 K.
A system of motorized slits is placed inside the cryostat chamber. The slits rotate around the DAC compression axis at a distance of 16.5 mm from the sample. The slit aperture defines the region around the sample that is seen by the spectrometer, therefore their use allows to remove most of the background coming from the sample environment Yoshida et al. (2014). The effect of the slit is clear upon inspection of Fig. 4, which shows RIXS spectra of Sr3Ir2O7 measured with (filled circles) and without (empty squares) slits. The background due to the sample environment extends up to energy losses of eV and almost covers the magnetic signal at eV. The use of slits suppresses most of the background and allows to safely recover the magnetic signal from the sample. Three slit apertures are available: 0.08 mm, 0.16 mm and 0.32 mm. The field of view of the spectrometer is 0.2 mm, 0.28 mm and 0.45 mm in the three cases, respectively, considering a mask of 15 mm placed in front of the crystal analyzer. The field of view is related to the diamond culet size and sample dimension and eventually to the pressure range of interest. Hence, the smallest slit aperture is used when pressures in the GPa range are targeted, while larger apertures are used for pressures in the MPa to GPa regime. In this work, all spectra are collected with the smallest slit aperture.
IV RIXS measurements
Iridium edge ( keV) RIXS measurements were performed at beamline ID20 of the ESRF. The beamline was designed and constructed within the framework of the recent ESRF Upgrade – Phase I. It is a flagship beamline for resonant and non-resonant inelastic hard-x-ray scattering spectroscopy Moretti Sala et al. (2018); Huotari et al. (2017). It has been conceived to maximize the photon flux at the sample position, cover a wide energy range (4-20 keV), optimize the energy resolution and guarantee a small stable beam over a long interval of time. These are essential requirements for RIXS experiments, in particular under extreme conditions. During the measurements, the incoming x-rays were monochromated to 11.2165 keV by the joint use of a Si(111) double-crystal monochromator and a backscattering Si(844) post-monochromator. A Kirkpatrick-Baez (KB) mirror system focused the incoming beam to a spot size smaller than 20\text{,}\mathrm{\SIUnitSymbolMicro m} (vertical horizontal). The x-rays scattered by the sample were energy-analyzed by a Rowland-circle-based spectrometer, equipped with a spherical Si(844) diced crystal analyzer and a position-sensitive detector. The overall energy resolution is as good as 25 meV and the incident photon flux is photons/s at the sample position Moretti Sala et al. (2013, 2018). Further information about the RIXS spectrometer of beamline ID20 can be found in Ref. Moretti Sala et al., 2018.
A sketch of the scattering geometry employed during the measurements is shown in Fig. 2(b). The incoming and outgoing photon wave vectors are and , respectively, while is the momentum transfer. Note that this geometry allows to reach the boundary of the two-dimensional Brillouin zone.
V Results and discussion
The setup described above has been employed to determine the pressure dependence of the magnetic structure and dynamics of Sr3Ir2O7. Figure 5(a) displays overview raw RIXS spectra of Sr3Ir2O7 measured at momentum transfer r.l.u. corresponding to the two-dimensional Brillouin zone boundary (, ). The spectra are normalized to the features above 0.4 eV. As can be seen, both spectra measured at ambient pressure (black circles) and at GPa (red diamonds) are qualitatively similar: besides the elastic line, both spectra feature a sharp (FWHM eV) peak at eV and a broad (FWHM eV) excitation centered at eV. The first feature is ascribed to the single magnon excitation Kim et al. (2012b); Moretti Sala et al. (2015), while the second feature is ascribed to the transition of a hole from the ground state to the band, in agreement with previous works on the sister compound Sr2IrO4 Kim et al. (2012a, 2014b). The pressure dependence at room temperature of the latter excitation has been already investigated by Ding et al., who have found that the peak position changes by at most % from ambient pressure to approximately 65 GPa, while the width does not undergo a significant change Ding et al. (2016). We note that magnetic excitations could not be resolved in the RIXS spectra measured by Ding et al. Ding et al. (2016) not only because the measurements were carried out at room temperature, but also because of the spurious signal from the sample environment extending up to several hundreds of meV. Instead, magnetic excitations are clearly distinguished in our spectra, as highlighted in Fig. 5(b) and Fig. 5(c), and show an unambiguous softening when pressure is increased up to 12 GPa. In Fig. 5(b,c), the spectra are plotted in counts per second (cts/s) and the spectrum collected at ambient pressure is multiplied by a factor for better comparison. We observe that the intensity drops by a factor -7 when the high-pressure sample environment is employed.
Before discussing the implications of the magnetic mode softening, we briefly address the pressure dependence of the magnetic structure of Sr3Ir2O7. Magnetic diffraction peaks are shown in Fig. 6 up to 12 GPa. Spectra are collected by monitoring the elastic signal while scanning along high-symmetry lines of the reciprocal lattice parallel to the (100) and (001) directions (Fig. 6(a) and 6(b), respectively). As can be seen, the magnetic diffraction peaks are broadened and damped with pressure, but overall the long-range AFM order survives at least until 12 GPa. Above this pressure value, we noticed a degradation of the sample quality, as testified by a drastic broadening and suppression of the charge diffraction peaks. Therefore, results can be safely discussed only up to 12 GPa.
Having established that the underlying magnetic structure is preserved, we now discuss the pressure evolution of the magnetic mode. This is summarized in Fig. 7, which displays the pressure dependence of the magnon peak position (black circles and squares) together with a linear fit (red solid line) to the experimental data points. The softening rate is meV/GPa. A linear extrapolation of data points to higher pressures (dashed line) hints towards a collapse of the magnetic mode around -60 GPa. We note that a structural phase transition has been reported in Sr3Ir2O7 at 54 GPa Donnerer et al. (2016), therefore suggesting a strong link between magnetic and lattice degrees of freedom, possibly resulting from the strong spin-orbit coupling.
In relation to the debate about the most suitable theoretical model to describe the magnetic dynamics of Sr3Ir2O7, we recall that high-pressure diffraction measurements revealed a higher compressibility of the and axes with respect to the axis Donnerer et al. (2016). Indeed, applied pressure is mostly accommodated by rotating the IrO6 octahedra around the axis, therefore further departing the in-plane Ir-O-Ir bond angle from the straight () geometry. Along the axis, instead, the Ir-O-Ir bond angle is unchanged, while the Ir-O-Ir bond length is shortened Donnerer et al. (2016); Ding et al. (2016). Since electronic interactions are strongly affected by the bond geometry Jackeli and Khaliullin (2009), the pressure dependence of the dominant magnetic couplings can be guessed. In particular, the intralayer exchange coupling is expected to decrease with pressure, while the interlayer exchange coupling should be less affected by pressure and, if any, it is expected to increase. In light of these expectations, we speculate that it is easier to reconcile our experimental results with the linear spin-wave theory approach Kim et al. (2012b), because the magnetic gap in the quantum dimer model should scale with the interlayer exchange coupling to first order Moretti Sala et al. (2015). Our qualitative discussion is consistent also with a recent refinement of the crystal structure of Sr3Ir2O7, since the departure from the pure tetragonal lattice is found to be very small Hogan et al. (2016b). A comprehensive interpretation of the experimental results goes well beyond the scope of the present paper, which is more to establish the general feasibility of performing high-pressure RIXS experiments of magnetic excitations and provide the scientific community with an additional tool to study electronic and magnetic dynamics in matter under extreme conditions.
VI Conclusions and outlook
To summarize, we described recent instrumental upgrades carried out at beamline ID20 of the ESRF that allowed us to perform RIXS measurements of magnetic excitations at high pressure. In particular, we measured the magnetic excitations of the bilayer perovskite Sr3Ir2O7 up to 12 GPa and observed a softening of the magnetic mode with pressure at a rate of meV/GPa. Extrapolation of this behavior at higher pressures shows that the collapse of the magnetic gap might be concomitant with the structural phase transition reported at 54 GPa Donnerer et al. (2016), suggesting a strong link between magnetic and lattice degrees of freedom. Most importantly, we demonstrated the feasibility of RIXS experiments of low-energy excitations at extreme conditions of temperature and pressure.
Acknowledgements.
We acknowledge the ESRF for providing beamtime and technical support. The authors would like to thank V. Cerantola, S. Petitgirard, A. D. Rosa and C. Sahle for fruitful discussions.
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