Abstract
Antiferromagnetic states with no stray magnetic fields can enable high-density ultra-fast spintronic technologies. However, the detection and control of antiferromagnetic Néel vectors remain challenging. Linear magnetoelectric antiferromagnets (LMAs) may provide new pathways, but applying simultaneous electric and magnetic fields, necessary to control Néel vectors in LMAs, is cumbersome and impractical for most applications. Herein, we show that Cr2O3, a prototypical room-temperature LMA, carries a topologically-protected surface magnetism in all surfaces, which stems from intrinsic surface electric fields due to band bending, combined with the bulk linear magnetoelectricity. Consequently, bulk Néel vectors with zero bulk magnetization can be simply tuned by magnetic fields through controlling the magnetizations associated with the surface magnetism. Our results imply that the surface magnetizations discovered in Cr2O3 should be also present in all LMAs.
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Introduction
Since their discovery by Louis Néel in 1930s, antiferromagnets have historically been considered only scientifically interesting but less useful for practical applications for a long time. Recently, the rapid advance of antiferromagnetic spintronics1,2,3,4,5 has overturned the above perception and demonstrated that antiferromagnets with fast spin dynamics6, low stray fields, and strong stability against magnetic fields can prevail over their ferromagnetic counterparts for faster, denser, and more robust memory devices. On the other hand, the insensitivity of antiferromagnets to external fields makes them invisible to most magnetic imaging techniques7 and extremely difficult to manipulate. Most research efforts so far have focused on using global detection methods such as the anisotropic magnetoresistance1, the exchange coupling8, or the magnetic proximity effect9 to sense the average antiferromagnetic order. Unfortunately, vital antiferromagnetic domain information is inaccessible due to the lack of spatially-resolved probes in those configurations, which hampers the full understanding of the Néel vector switching process. Antiferromagnetic states that can be easily manipulated and studied by direct magnetic imaging techniques are needed to gain insights into the Néel vector switching at the microscopic level, which are crucial for future applications of antiferromagnetic spintronic devices.
Linear magnetoelectric antiferromagnets (LMAs) have natural responses to electric and magnetic fields, which offer great potential to overcome the invisibility and stubbornness of antiferromagnetic states. As the first known and the only LMA with a Néel temperature (TN ≈ 307 K) above room temperature10, Cr2O3 is an appealing candidate for room temperature antiferromagnetic devices. In particular, an intriguing net magnetization along the hexagonal c axis coupled to the antiferromagnetic state has been reported in Cr2O3, which can be detected and also switched by the combination of electric and magnetic fields8,11. Although this net magnetization has been theoretically proposed to be an equilibrium surface magnetization12, it is still controversial experimentally whether it is an intrinsic surface-induced magnetization13, an extrinsic misfit-induced magnetization14, or even a volumetric magnetization in Cr2O3 thin films15. The role of second phases with net magnetic moments and the dirty surface magnetism can also be relevant issues. Therefore, the microscopic mechanisms of these net magnetizations and how they respond to external magnetic fields remain elusive. Although limited magnetic imaging studies of Co/Cr2O3 heterostructures have been reported16,17, spatially-resolved direct magnetic imaging probe of this net magnetization in single-crystal Cr2O3 is still lacking, and is crucial to solve this puzzle.
Cr2O3 forms the corundum structure consisting of a hexagonal close-packed array of oxygen anions with 2⁄3 of the octahedral holes occupied by chromium. Below TN, spins of Cr3+ order antiferromagnetically and collinearly along the hexagonal c axis with two degenerate Néel vectors +L (up-down-up-down) or –L (down-up-down-up). See detailed structure in Supplementary Fig. 1a. Intriguingly, non-zero diagonal linear magnetoelectric coefficients also develop both along the hexagonal c axis (αcc) and in the ab plane (αaa = αbb) below TN, the signs of which are determined by its antiferromagnetic configuration18. For convenience, we assign αcc > 0, αaa = αbb < 0 for +L domains and αcc < 0, αaa = αbb > 0 for –L domains hereafter. This assignment is consistent with the opposite signs of linear magnetoelectric coefficients along the c- and ab-plane directions. Considering that the net magnetization (Ms) is also strongly coupled to Néel vectors18, we here propose that it is the intrinsic surface magnetism originated from the linear magnetoelectric effect induced by the effective electric field (Es) at the parity-symmetry-broken surface (or interface), illustrated in Fig. 1a. Their relationship is defined by Ms = α• Es, where α is the linear magnetoelectric coefficient along the direction perpendicular to the surface. A natural consequence of this hypothesis is that a finite Ms should exist at any surface having a non-zero α along the direction perpendicular to the surface. Meanwhile, the sign and strength of Ms should match those of α for a given surface. In other words, these net magnetizations are intrinsic and topologically-protected surface magnetism. On the other hand, Ms will have no relation to the magnetoelectric tensor if it originates from an extrinsic or volumetric uncompensated magnetization. Fortunately, both scenarios can be explicitly tested in single-crystal Cr2O3 if Ms on both the ab plane and the side surface can be directly imaged and correlated. In this work, we comprehensively examined Cr2O3 single crystals by a magnetic circular dichroism (MCD) imaging technique and show that these net magnetizations are, indeed, topological surface magnetism that exists in all crystalline orientations and is governed by its corresponding magnetoelectric coefficients at the room temperature. Consequently, a novel Néel vector switching by magnetic fields is also realized.
Results
Surface magnetism and surface band bending
High-quality bulk single crystals of Cr2O3 are grown using a floating-zone (FZ) method (see methods). The crystal shows a clear antiferromagnetic transition at 307 K in the magnetic susceptibility (Fig. 1b and Supplementary Fig. 1b), consistent with previous reports19. As expected, bulk crystals are free from net remnant magnetizations shown by the linear magnetization curve as a function of applied magnetic field (Supplementary Fig. 1c, d). On the other hand, the polar reflective MCD sensitive to the out-of-plane magnetization shows clear signals below TN on the ab plane of a FZ Cr2O3 crystal (Fig. 1c), manifesting the existence of a surface magnetization coupled to the antiferromagnetic spin order. Two different spots with opposite MCD polarity can be easily found, where spot A and spot B represent antiferromagnetic domains with −L and +L, respectively. To map out the antiferromagnetic domain structures, a MCD image showing magnetization domain contrasts (+Ms and -Ms) was obtained by scanning the sample surface at 280 K (Fig. 1d), and it resembles the reported antiferromagnetic domain pattern observed by second harmonic generation20. The domain pattern persists until TN is reached while the domain contrast gradually fades away, leaving only background signals above 310 K (Fig. 1e–i). Finally, a different domain pattern reappears when it is cooled back to 277 K under the zero magnetic field cooling (ZFC) condition (Fig. 1j). These results demonstrate that spatially-resolved MCD images are capable of directly capturing small net magnetizations and their underlying antiferromagnetic domain configurations in LMAs. We have also confirmed the coupling between Ms and Neel vectors (L)/magnetoelectric domains (α) in bulk Cr2O3 definitively by magnetoelectric field cooling experiments shown in Supplementary Fig. 2.
In addition to the surface magnetism, we next show the existence of surface band bending and surface electric field in Cr2O3. It is well established that internal electric fields can develop from the band bending at the surface of semiconductors, which is widely probed by angular-resolved X-ray photoemission spectroscopy21 (AR-XPS). Comprehensive AR-XPS studies of Cr2O3 reveal typical spectra (Fig. 1k and Supplementary Fig. 3) consistent with previous XPS reports22,23. Moreover, we found the Cr2O3 valence band maximum bends down by ~0.2 eV at the surface on both the ab plane (Fig. 1k) and the side surface (Supplementary Fig. 3d). Consistently, other core-level absorption peaks also are shifted by a similar amount at the surface (Supplementary Fig. 3). Note that these XPS spectra are reproducible when switching between normal and grazing detection angles (Fig. 1k), suggesting that these band shifts are intrinsic and not from X-ray induced damages. Therefore, these AR-XPS results unambiguously demonstrate the existence of surface electric fields pointing into the bulk of Cr2O3 (Fig. 1l) along both orientations with a similar magnitude.
Given the above evidence, we further examine surface magnetizations on the front and the back side of the same crystal where Es is in the opposite direction (Fig. 2a–d). For a thicker sample in Fig. 2a, b, large domains in the lower part of the image almost remain intact although some small domains in the upper part have changed their pattern. Better correlations are evident in a thinner sample in Fig. 2c, d, where less domain evolution is expected through the sample thickness. The same MCD polarity of these domains on the flipped surface indicates that we, indeed, have opposite surface magnetizations on the opposite surface.
Topological surface magnetism and Néel vector controls
Remarkably, we found these surface magnetizations are sensitive to the magnetic field when cooling through TN. The sign of the MCD signal at a fixed spot can be consistently switched after a FC process (Fig. 2e) with opposite magnetic fields (± 0.5 T) applied along the c-axis. This suggests that an unconventional Néel vector switching can be realized by magnetic fields alone, whereas the simultaneous application of both magnetic and electric fields is traditionally required for LMAs. We systematically investigated antiferromagnetic domain patterns at 280 K after a series of ZFC and FC cycles cooled down from 330 K. Random domain patterns with a domain ratio close to 50:50 are always observed after ZFC cycles on both sides of the c-orientated crystal (Fig. 2f, k). On the other hand, a positive-dominant (+Ms) domain pattern is observed after a + 0.5 T FC cycle (Fig. 2g, l). After a following −0.5 T FC cycle, domain contrasts have been clearly inverted while domain patterns are almost intact (Fig. 2h, m), consistent with the result in Fig. 2e. Eventually, a different random domain pattern reappears after another ZFC cycle (Fig. 2i, n), indicating that any defect pinning effect of antiferromagnetic domain walls is negligible. Similar results have also been reproduced in another FZ and flux-grown Cr2O3 crystals (Supplementary Fig. 4), demonstrating that it is an intrinsic and general property of Cr2O3. Taking differential images between +0.5 T and −0.5 T FC cycles (Fig. 2j, o), one can analyze the domain switching in detail where three levels of contrasts are evident. Dominant red and blue contrasts represent regions where Néel vectors have been switched in the opposite magnetic FC process, while regions with the white color (zero differential MCD signal) are small portions that are unable to switch. The ratios of non-switched areas are calculated to be only 2.8% and 4.1% for the front and the back surface, respectively. This indicates a possible competition between the magnetic-field-induced switching mechanism and the randomness from thermal fluctuations at TN. Therefore, a larger magnetic field may be needed to guarantee a 100% Néel vector switching, which is not available in our current table-top experimental setup. This novel response to magnetic fields also proves that MCD signals originate from real induced magnetizations rather than the magneto-optical nonreciprocity suggested by the previous study based on pure symmetry considerations18.
To further test if MCD signals are from intrinsic surface magnetism induced by the linear magnetoelectric effect, we examine both the perpendicular side surface (Fig. 3a) and its adjacent ab plane (Fig. 3b) of a FZ Cr2O3 crystal after ZFC. While clear domain patterns are observed on both surfaces (Fig. 3c, d), the MCD contrast level on the side surface (~3.1, Fig. 3e) is about 9 times smaller than that on the ab plane (~27, Fig. 3f). Considering surface electric fields have the same sign and magnitude based on previous AR-XPS results, this MCD signal ratio is qualitatively consistent with the reported ratio (~1:11) between linear magnetoelectric coefficients αaa (αbb) and αcc at 280 K24. More importantly, the merged MCD image (Fig. 3g) shows clear correlations of antiferromagnetic domains with opposite contrasts on both surfaces, which is again consistent with opposite signs of αaa (αbb) and αcc near room temperature.
To confirm above domain correlations, we also opt to investigate both the ab plane (Fig. 3h) and its perpendicular side surface (Fig. 3i) of another flux-grown Cr2O3 crystal. This flux crystal shows a slightly reduced TN at ~290 K likely due to some oxygen off-stoichiometry. Otherwise, it shows consistent MCD signals as a function of temperature (Supplementary Fig. 5a, b) with FZ crystals. However, small domain contrasts on the side surface of flux-grown crystal are usually buried by the background curvature (Supplementary Fig. 5c, d), making it challenging to directly visualize Ms domains on the side surface. To overcome this obstacle, we utilize the differential imaging method based on the L switching process we just discovered. The MCD image of the ab plane after a −0.5 T FC process was taken first (Fig. 3j), which shows a consistent negative-dominant (-Ms) domain pattern. We then rotate the sample and took one MCD image on the side surface followed by another image after a + 0.5 T FC process (B//c). The final differential MCD image can effectively remove the background signal and reveal its intrinsic domain pattern with doubled contrasts (Fig. 3k and Supplementary Fig. 5e, h). This time, the MCD contrast level on the ab plane (~27.5, Fig. 3l) is about 12 times larger than that on the side surface (5.5/2 ~2.25, Fig. 3m), which is also close to the reported ratio (~11:1) between αcc and αaa. Once again, the merged MCD image (Fig. 3n) explicitly confirms the opposite signs of Ms for the same antiferromagnetic domain along different orientations. Finally, the domain ratio on the side surface (Fig. 3k) is still close to 50:50 if magnetic fields are applied along the c axis during the FC process, which strongly indicates there is no domain preference in the bulk and the magnetic field will only affect the domain ratio on the surface perpendicular to the field direction. We have also observed similar domain poling and Néel vector switching behaviors on the side surface after FC processes when the magnetic field is applied along the a axis (Supplementary Fig. 6 for details). Thus, the bulk magnetization scenario can be explicitly ruled out in single-crystal Cr2O3, where a poled unequal domain ratio is also expected on the side surface when the magnetic field is applied along the c axis.
All these results have proved that the linear magnetoelectric contribution should be the dominating effect and responsible for the observed surface magnetism in Cr2O3 near room temperature (see Supplementary Note 1 and Supplementary Fig. 7 for situations at low temperatures). More importantly, the existence of surface magnetism stemming from intrinsic surface electric fields along both principal orientations makes them topologically-protected magnetism. The magnetization of a random-cut surface will be the vector sum of the ab plane and the side surface components. Therefore, this surface magnetism is non-vanishing upon the reduction of specimen thickness and insensitive to the surface roughness. An intriguing implication of this conclusion is that the surface magnetizations of a single antiferromagnetic domain sample will form a three-dimensional hedgehog-type magnetization arrangement at room temperature (Fig. 4a, b), sharing the same topology with Néel-type magnetic skyrmions (topological charge −1 and core polarization ±1) when projected on the 2D plane. The total topological charge of such a Cr2O3 specimen will be stable against any continuous deformations of the crystal. This effective electric field (Es) and linear magnetoelectric mechanism can be generally applied to all LMAs with a surface spin topology depending on their non-zero linear magnetoelectric tensors. Although Cr2O3 carries only diagonal linear magnetoelectric effects, this scenario will also work universally even for materials with non-zero off-diagonal linear magnetoelectric tensors, where the final surface magnetization will simply become the vector sum of both diagonal and off-diagonal components. This demonstrates that dielectric LMAs are a new class of examples hosting topological surface states as the consequence of the ubiquitous surface electric field (Es), in analogy to the well-established surface Rashba effect in spin-orbit-coupled metals25 (see Supplementary Note 2).
Discussion
This topological surface magnetism not only enables the direct magnetic detection of its underlying antiferromagnetic domains by MCD but also can provide the essential coupling between the antiferromagnetic Néel vector and external magnetic fields. With these insights, we now discuss how the unconventional Néel vector control by magnetic fields is enabled. Starting from a balanced domain distribution with relatively straight domain walls after a typical ZFC cycle (Fig. 4c), the positive magnetic field cooling will prefer the expansion of −L domain on the top surface and the contraction of −L domain on the bottom surface (Fig. 4d). Thus, domain walls will be naturally tilted to minimize the added Zeeman energy between the surface magnetization and external magnetic fields. The domain poling effect will be evident on the surface perpendicular to the magnetic field while the overall domain ratio in the bulk still remains about 50:50. In the following negative magnetic field cooling cycle, Cr2O3 surprisingly shows inverted domain contrasts with an almost same domain pattern (Fig. 4e), which strongly implies an exotic domain wall memory effect during the field cooling process. Note that extrinsic defect pinning under the magnetic field cooling condition can be ruled out as different domain patterns can be observed in repeated field cooling experiments with different initial ZFC domain patterns (Supplementary Fig. 5e, h). Therefore, the most plausible scenario is that some short-range spin orderings at domain walls may survive in the high-temperature paramagnetic phase. If previous domain walls are memorized and an opposite magnetic field with the same magnitude is applied upon cooling, the Néel vector at the domain region will switch to align dominating domains parallel and minor domains anti-parallel to the opposite magnetic field to minimize the total Zeeman energy (Supplementary Fig. 8). Since these previous domain walls have already divided the sample surface into an unequal domain ratio favored by the same magnetic field strength, new domains and domain walls are less likely to emerge in the opposite field cooling process. However, this domain wall memory effect is less effective in ZFC cycles as both antiferromagnetic domains are allowed to nucleate randomly and emerge without any preference. Newly-formed domains and domain walls can merge with previous ones and a significantly-modified domain pattern is usually observed in ZFC cycles. As a piece of evidence, domain wall rearrangements can naturally happen in ZFC cycles indicated by back and forth jumps of the MCD signals right below TN (Supplementary Fig. 5a). This memory effect also indicates exotic antiferromagnetic domain wall physics in Cr2O3, the investigation of which has just been started recently26,27. More advanced magnetic imaging techniques in the future with atomic resolution are needed to probe these short-range ordered spins at domain walls. Nevertheless, our proposed mechanism successfully explains all experimental observations and unveils exotic physics in the Néel vector switching process which has not been observed elsewhere.
In summary, our findings demonstrate the existence of an intriguing topological surface magnetism in Cr2O3, which is expected to be universal in all LMAs. This ubiquitous surface magnetism in LMAs enables the control of antiferromagnetic Néel vectors by magnetic fields, which provides a new pathway to manipulate antiferromagnetic states in LMAs. Furthermore, our results also illustrate the possibility of having various topological surface states induced by effective surface electric fields in insulating magnets, in addition to the well-known surface Rashba effect in conductive materials or the topological surface states of topological materials.
Methods
Crystal growth and preparations
High-quality single crystals of Cr2O3 were prepared by a floating zone technique and flux method. In the floating zone growth, high-purity Cr2O3 powder (99.9% Alfa Aesar) was filled in a rubber tube and pressed into a rod under 8000 PSI hydrostatic pressure. The rod was sintered at 1400 °C for 10 h. The crystal was grown in a laser floating zone furnace at a rate of 100 mm•h−1 in a 0.5 L•min−1 airflow. The as-grown crystal was annealed at 1400 °C for 20 h and cooled down to room temperature at 20 °C•h−1 before measurements. In the flux growth, the high-purity K2Cr2O7-K2CrO4-B2O3 mixture is put in the Pt crucible with a lid and covered by Al2O3 thermal mass. The mixture was heated at 1200 °C for 100 h in the Ar gas flow with a pressure of 0.3 bar, and then cooled to room temperature. The single crystal was separated mechanically and the remaining flux was washed by distilled water. Hexagonal ab surface and its perpendicular side surface of crystals were oriented by Laue and hand-polished with diamond lapping films. Then, crystal surfaces were finished with polishing in the colloidal silica slurry before measurement. Magnetic properties of oriented crystals were measured in a Magnetic Property Measurement System (MPMS, Quantum Design).
Magnetic circular dichroism (MCD)
Scanning MCD spectroscopy was performed using 632.8 nm light from a HeNe laser. The photon energy (1.96 eV) of this wavelength is close to the absorption peak of the d-d transition28 of Cr3+ in the crystal field of Cr2O3. The full wavelength dependence in the visible light range can be found in a previous report29. Taking reported extinction coefficient (5.8 × 104 cm−1) at this wave length30, the penetration depth (inverse of the extinction coefficient) of this wavelength is ~172 nm. The real MCD probing depth should be much smaller than this value since a good fraction of the light is reflected by the very top surface. The light was linearly polarized and then modulated between right- and left-circular polarizations at 40 kHz using a photoelastic modulator. The light was focused to an approximately 20-micron spot on the sample, at a small (< 5 degree) angle of incidence from the sample normal. The reflected light was detected by a photodiode and the difference between the intensity of right- and left-circular polarized reflected light was measured by a lock-in amplifier. The Cr2O3 samples were mounted on a small thermoelectric cooling/heating stage, which in turn was mounted on a motor-driven XY stage. Magnetic fields were applied by bringing a neodymium-iron-boron permanent magnet close to the sample during the cooling process. For MCD measurements below 275 K, Cr2O3 samples were mounted on the copper cold finger of a small liquid-helium optical cryostat (Oxford Microstat).
Angular-resolved X-ray photoemission spectroscopy (AR-XPS)
AR-XPS measurements were performed on a Thermo K-alpha instrument with a 400 μm x-ray spot of 1486.7 eV photon energy. The geometry is defined as follows: electron detection normal to the surface (θ = 0o) is more bulk sensitive than electron detection at a grazing angle (θ = 60o).
Data availability
The data that support the findings of this study are available within the paper as well as the Supplementary Information, and are also available from the corresponding author on reasonable request.
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Acknowledgements
The work at Rutgers University was supported by the W. M. Keck Foundation. The work at Pohang University was supported by the National Research 389 Foundation of Korea funded by the Ministry of Science and ICT (grant No. 2022M3H4A1A04074153 and 2020M3H4A2084417). The work at National High Magnetic Field Laboratory was supported by National Science Foundation (NSF) DMR-1644779, the State of Florida, and the U.S. Department of Energy (DOE). S.C. acknowledges support from the Quantum Science Center. S.R. and R.B. acknowledge the Laboratory for Surface Modification facilities for access to XPS.
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S.–W.C. Initiated and guided the project; X.X., C.J., and K.D. prepared the samples; K.W. and K.D. measured bulk magnetic properties; K.D. and S.C. did MCD measurements; S.R., R.B., and K.D. performed AR-XPS measurements and analysis. K.D., S.C., and S.-W.C. analysed the data and wrote the paper.
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Du, K., Xu, X., Won, C. et al. Topological surface magnetism and Néel vector control in a magnetoelectric antiferromagnet. npj Quantum Mater. 8, 17 (2023). https://doi.org/10.1038/s41535-023-00551-0
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DOI: https://doi.org/10.1038/s41535-023-00551-0
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