Large spin splitting at ferromagnetic surfaces of bulk antiferromagnets

Sophie F. Weber; William A. Schaarman

arxiv: 2606.20178 · v2 · pith:VJEHMMZ5new · submitted 2026-06-18 · ❄️ cond-mat.mtrl-sci · physics.comp-ph

Large spin splitting at ferromagnetic surfaces of bulk antiferromagnets

William A. Schaarman , Sophie F. Weber This is my paper

Pith reviewed 2026-06-26 16:25 UTC · model grok-4.3

classification ❄️ cond-mat.mtrl-sci physics.comp-ph

keywords antiferromagnetsspin splittingsurface magnetismexchange interactiondensity functional theoryCr2O3FeF2

0 comments

The pith

Certain ferromagnetic surfaces of bulk antiferromagnets exhibit large spin splitting via lifted sublattice degeneracies

A machine-rendered reading of the paper's core claim, the machinery that carries it, and where it could break.

The paper shows that a subset of surfaces on antiferromagnetic crystals can support large spin splitting in bands localized near the surface. This splitting occurs because the surface termination breaks the symmetry that otherwise compensates exchange fields from different magnetic sublattices throughout the bulk. Model Hamiltonians identify the strongest cases as surfaces exposing a single uncompensated sublattice and surfaces where the two sublattices acquire distinct crystal-field environments after truncation. First-principles calculations on Cr2O3 and FeF2 then confirm that the resulting splittings range from roughly 10 meV to 1 eV. The work thereby identifies surface symmetry breaking as a route to large, functional spin splitting in antiferromagnets.

Core claim

Bulk antiferromagnets host large spin splitting at their ferromagnetic surfaces because surface truncation lifts the degeneracy between sublattice-resolved exchange splittings that remain compensated inside the crystal. The splitting reaches its largest values for terminations with a single uncompensated magnetic sublattice and for two-sublattice terminations whose sublattices experience different crystal fields at the surface. Surfaces whose magnetization arises instead from relativistic canting on symmetry-connected sublattices produce only small splitting. Calculations for Cr2O3 and FeF2 surfaces illustrate the range of splittings from 10 meV to 1 eV.

What carries the argument

surface truncation lifting bulk degeneracy of sublattice-resolved exchange splittings at symmetry-allowed ferromagnetic terminations

Load-bearing premise

Ideal surface terminations exposing a single uncompensated sublattice or distinct crystal-field environments remain stable without reconstruction or contamination that would restore bulk compensation.

What would settle it

Spin-resolved angle-resolved photoemission spectra on atomically clean, predicted terminations of Cr2O3 or FeF2 that show splitting magnitudes matching the DFT results; absence of the predicted large splitting on those surfaces would falsify the mechanism.

Figures

Figures reproduced from arXiv: 2606.20178 by Sophie F. Weber, William A. Schaarman.

**Figure 2.** Figure 2: FIG. 2: Unit cells for the (a) (001), (b) ( [PITH_FULL_IMAGE:figures/full_fig_p003_2.png] view at source ↗

**Figure 1.** Figure 1: Ab-initio results – We start with results for the the bulk AFM Cr2O3, which crystallizes in the corundum structure with magnetic space group (point group) R-3′ c ′ (−3 ′ ). Cr2O3 is a linear magnetoelectric [19, 20], meaning it acquires an induced magnetization in response to applied electric field and conversely, a net electric polarization in response to an applied magnetic field. It has a high N´eel t… view at source ↗

**Figure 3.** Figure 3: FIG. 3: surface- and spin- projected band structures for [PITH_FULL_IMAGE:figures/full_fig_p004_3.png] view at source ↗

**Figure 4.** Figure 4: FIG. 4: (a) Bulk structure of FeF [PITH_FULL_IMAGE:figures/full_fig_p005_4.png] view at source ↗

**Figure 5.** Figure 5: FIG. 5: Projection of the spin of specific d orbitals on the surface Cr [PITH_FULL_IMAGE:figures/full_fig_p007_5.png] view at source ↗

**Figure 6.** Figure 6: FIG. 6: Projection of the spin on the [PITH_FULL_IMAGE:figures/full_fig_p007_6.png] view at source ↗

**Figure 8.** Figure 8: FIG. 8: Projection of the spin along the N´eel vector on [PITH_FULL_IMAGE:figures/full_fig_p008_8.png] view at source ↗

**Figure 9.** Figure 9: FIG. 9: (a) side view and (b) top view of the unit cell [PITH_FULL_IMAGE:figures/full_fig_p008_9.png] view at source ↗

**Figure 10.** Figure 10: FIG. 10: Spin projected at the top/bottom surface for a [PITH_FULL_IMAGE:figures/full_fig_p009_10.png] view at source ↗

**Figure 11.** Figure 11: FIG. 11: Spin projected at the top/bottom surface for a [PITH_FULL_IMAGE:figures/full_fig_p009_11.png] view at source ↗

read the original abstract

We use density functional theory and model Hamiltonians to reveal large spin splitting of bands localized at low-symmetry, ferromagnetic surfaces of bulk antiferromagnets (AFMs). There is great interest in finding new material platforms combining the robustness and ultrafast dynamics of AFMs with large, functional spin splitting which is often restricted to ferromagnets. Here, we show that a subset of AFM surfaces which have symmetry-allowed magnetization can host large spin splitting via bulk degeneracy lifting of sublattice-resolved exchange splittings. Using model Hamiltonians, we show that the spin splitting is maximized for two ferromagnetic surface motifs: terminations with single uncompensated magnetic sublattices, and two-sublattice surfaces whose sublattices are magnetically and electronically compensated in the bulk, but acquire distinct crystal field environments via surface truncation. The latter case can yield FM-like spin splitting magnitudes while also having vanishingly small uncompensated magnetization. In contrast, when surface magnetization arises from relativistic canting on symmetry-connected sublattices, the spin splitting is expected to be small. We confirm these predictions with first-principles calculations of $\mathrm{Cr_2O_3}$ and $\mathrm{FeF_2}$, finding splittings from $\sim10\mathrm{meV}$-$\sim1\mathrm{eV}$ depending on the surface in question. Our findings point to intrinsic surface symmetry breaking as a route to large, functional spin splitting in an expanded range of AFM materials.

Editorial analysis

A structured set of objections, weighed in public.

Desk editor's note, referee report, simulated authors' rebuttal, and a circularity audit. Tearing a paper down is the easy half of reading it; the pith above is the substance, this is the friction.

Desk Editor's Note private letter to a colleague

AFM surfaces with uncompensated or crystal-field-differentiated terminations can show large spin splitting in DFT, but the work assumes those ideal cuts exist without checking stability.

read the letter

The main point is that certain surfaces on bulk antiferromagnets can produce large spin splitting because truncation lifts the bulk compensation between sublattices. Model Hamiltonians separate the cases, and DFT on Cr2O3 and FeF2 gives numbers from roughly 10 meV to 1 eV depending on the surface.

What is actually new is the explicit link between two surface motifs and maximized splitting: a single uncompensated sublattice, or a two-sublattice termination where the sublattices remain compensated in moment but see different crystal fields at the surface. The latter is useful because it can deliver FM-scale splitting with almost no net magnetization. The models also show why relativistic canting on symmetry-connected sublattices keeps the splitting small. That classification is the clearest part of the paper.

The DFT checks are standard and line up with the models.

The soft spot is the lack of any surface stability work. The calculations use simple truncations of the bulk cells. No surface-energy comparisons, reconstruction searches, or checks for contamination appear, so it is possible the large-splitting configurations do not survive in real samples. That assumption carries the quantitative claims.

The paper is aimed at spintronics researchers who want to combine AFM robustness with functional spin splitting. A reader focused on surface symmetry breaking will get a usable set of motifs to test on other materials.

It shows clear symmetry reasoning and standard calculations, so it deserves referee time even though experiments will have to settle whether the surfaces hold up.

Referee Report

2 major / 1 minor

Summary. The manuscript claims that a subset of antiferromagnetic surfaces with symmetry-allowed magnetization can host large spin splitting (∼10 meV to ∼1 eV) via bulk degeneracy lifting of sublattice-resolved exchange splittings. This is shown using model Hamiltonians for two motifs (single uncompensated sublattice terminations and two-sublattice terminations with distinct crystal-field environments) and confirmed via DFT on Cr₂O₃ and FeF₂ surfaces, proposing intrinsic surface symmetry breaking as a route to functional spin splitting in AFMs.

Significance. If the central predictions hold, the work is significant because it identifies a mechanism to achieve large, functional spin splitting in antiferromagnets, which offer robustness and ultrafast dynamics not typical of ferromagnets. The dual use of model Hamiltonians (to identify maximizing motifs, including those with vanishing net magnetization) and first-principles DFT provides a clear theoretical foundation and falsifiable predictions for specific materials.

major comments (2)

[DFT results on Cr₂O₃ and FeF₂] The DFT results for Cr₂O₃ and FeF₂ (reported in the results section) rely on ideal truncated-bulk terminations without any surface-energy minimization, reconstruction search, or stability analysis. This assumption is load-bearing for the quantitative splittings, as reconstruction or contamination could restore compensation and eliminate the large splitting while leaving bulk AFM order intact.
[Computational methods and DFT results] The reported spin-splitting values (∼10 meV–∼1 eV) lack accompanying error bars, k-point convergence tests, or slab-thickness convergence checks. This weakens in the precise magnitudes and their dependence on the two surface motifs.

minor comments (1)

[Abstract] The abstract states 'first-principles calculations' but does not summarize key parameters (functional, cutoff, etc.); adding a brief methods sentence would improve clarity without altering the claims.

Simulated Author's Rebuttal

2 responses · 0 unresolved

We thank the referee for their careful reading of our manuscript and for the constructive comments. We address each major comment below and outline the revisions we will make.

read point-by-point responses

Referee: [DFT results on Cr₂O₃ and FeF₂] The DFT results for Cr₂O₃ and FeF₂ (reported in the results section) rely on ideal truncated-bulk terminations without any surface-energy minimization, reconstruction search, or stability analysis. This assumption is load-bearing for the quantitative splittings, as reconstruction or contamination could restore compensation and eliminate the large splitting while leaving bulk AFM order intact.

Authors: We agree that our DFT calculations use ideal truncated-bulk terminations, which is a standard starting point for identifying the proposed mechanism but does not address surface stability. The model Hamiltonians, however, identify the two maximizing motifs in a manner independent of any particular surface reconstruction. In the revised manuscript we will add a paragraph in the discussion section explicitly acknowledging this limitation, stating that the quantitative splittings are for ideal terminations, and recommending that future work include surface-energy minimization and reconstruction searches to assess robustness against contamination or relaxation. revision: partial
Referee: [Computational methods and DFT results] The reported spin-splitting values (∼10 meV–∼1 eV) lack accompanying error bars, k-point convergence tests, or slab-thickness convergence checks. This weakens in the precise magnitudes and their dependence on the two surface motifs.

Authors: We accept that the absence of reported convergence tests and error estimates reduces in the precise numerical values. In the revised manuscript we will add an appendix (or expanded methods section) that documents the k-point meshes, slab thicknesses tested, and the resulting convergence of the spin-splitting energies. We will also attach estimated uncertainties to the reported ∼10 meV–∼1 eV range based on these tests. revision: yes

Circularity Check

0 steps flagged

No circularity; derivation uses independent DFT and model Hamiltonians

full rationale

The paper constructs model Hamiltonians from symmetry arguments for two surface motifs and applies them to predict spin splitting, then verifies the predictions via standard first-principles DFT on truncated bulk structures of Cr2O3 and FeF2. No equation reduces a claimed prediction to a fitted parameter defined by the target result, no self-citation chain carries the central claim, and no ansatz is smuggled in. The calculations are self-contained against external material examples and do not rely on any input that is definitionally equivalent to the output splitting values.

Axiom & Free-Parameter Ledger

0 free parameters · 1 axioms · 0 invented entities

Central claim rests on standard DFT applicability to magnetic surfaces and the physical realizability of the described terminations; no free parameters or invented entities are introduced in the abstract.

axioms (1)

domain assumption Density functional theory provides a sufficiently accurate description of surface electronic structure and exchange splittings in the chosen materials.
The confirmation step invokes first-principles calculations on Cr2O3 and FeF2.

pith-pipeline@v0.9.1-grok · 5790 in / 1222 out tokens · 23024 ms · 2026-06-26T16:25:12.590177+00:00 · methodology

discussion (0)

Reference graph

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H. Chen, L. Liu, X. Zhou, Z. Meng, X. Wang, Z. Duan, G. Zhao, H. Yan, P. Qin, and Z. Liu, Emerging Antiferro- magnets for Spintronics, Advanced Materials36, 2310379 (2024)

2024

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A. V. Khvalkovskiy, D. Apalkov, S. Watts, R. Chepulskii, R. S. Beach, A. Ong, X. Tang, A. Driskill-Smith, W. H. Butler, P. B. Visscher, D. Lottis, E. Chen, V. Nikitin, and M. Krounbi, Basic principles of STT-MRAM cell oper- ation in memory arrays, Journal of Physics D: Applied 10 Physics46, 074001 (2013)

2013

[3] [3]

Ralph and M

D. Ralph and M. Stiles, Spin transfer torques, Journal of Magnetism and Magnetic Materials320, 1190 (2008)

2008

[4] [4]

C. Song, H. Bai, Z. Zhou, L. Han, H. Reichlova, J. H. Dil, J. Liu, X. Chen, and F. Pan, Altermagnets as a new class of functional materials, Nature Reviews Materials 10, 473 (2025)

2025

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ˇSmejkal, J

L. ˇSmejkal, J. Sinova, and T. Jungwirth, Emerging Re- search Landscape of Altermagnetism, Physical Review X 12, 040501 (2022)

2022

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L. L. Tao, Q. Zhang, H. Li, H. J. Zhao, X. Wang, B. Song, E. Y. Tsymbal, and L. Bellaiche, Layer Hall Detection of the N´ eel Vector in Centrosymmetric Magnetoelectric Antiferromagnets, Physical Review Letters133, 096803 (2024)

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Guo, X.-S

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2025

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1980

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2025

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S. F. Weber, A. Urru, S. Bhowal, C. Ederer, and N. A. Spaldin, Surface Magnetization in Antiferromag- nets: Classification, Example Materials, and Relation to Magnetoelectric Responses, Physical Review X14, 021033 (2024)

2024

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Appel, B

P. Appel, B. J. Shields, T. Kosub, N. Hedrich, R. H¨ ubner, J. Faßbender, D. Makarov, and P. Maletinsky, Nanomag- netism of Magnetoelectric Granular Thin-Film Antiferro- magnets, Nano Letters19, 1682 (2019)

2019

[15] [15]

Kosub, M

T. Kosub, M. Kopte, F. Radu, O. G. Schmidt, and D. Makarov, All-Electric Access to the Magnetic-Field- Invariant Magnetization of Antiferromagnets, Physical Review Letters115, 097201 (2015)

2015

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O. V. Pylypovskyi, S. F. Weber, P. Makushko, I. Verem- chuk, N. A. Spaldin, and D. Makarov, Surface-Symmetry- Driven Dzyaloshinskii-Moriya Interaction and Canted Ferrimagnetism in Collinear Magnetoelectric Antiferro- magnet Cr2O3, Physical Review Letters132, 226702 (2024)

2024

[17] [17]

Tao and E

L. Tao and E. Y. Tsymbal, Insulator-to-conductor tran- sition driven by the Rashba–Zeeman effect, npj Compu- tational Materials6, 172 (2020)

2020

[18] [18]

Takenaka, S

H. Takenaka, S. Sandhoefner, A. A. Kovalev, and E. Y. Tsymbal, Magnetoelectric control of topological phases in graphene, Physical Review B100, 125156 (2019)

2019

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Schlitz, T

R. Schlitz, T. Kosub, A. Thomas, S. Fabretti, K. Nielsch, D. Makarov, and S. T. B. Goennenwein, Evolution of the Spin Hall Magnetoresistance in Cr2O3/Pt bilayers close to the N´ eel temperature, Applied Physics Letters112, 132401 (2018), arXiv:1712.08563 [cond-mat]

Pith/arXiv arXiv 2018

[22] [22]

N. Wu, X. He, A. L. Wysocki, U. Lanke, T. Komesu, K. D. Belashchenko, C. Binek, and P. A. Dowben, Imag- ing and Control of Surface Magnetization Domains in a Magnetoelectric Antiferromagnet, Physical Review Let- ters106, 087202 (2011)

2011

[23] [23]

M. S. W¨ ornle, P. Welter, M. Giraldo, T. Lottermoser, M. Fiebig, P. Gambardella, and C. L. Degen, Coexistence of Bloch and N´ eel walls in a collinear antiferromagnet, Physical Review B103, 094426 (2021)

2021

[24] [24]

X. He, Y. Wang, N. Wu, A. N. Caruso, E. Vescovo, K. D. Belashchenko, P. A. Dowben, and C. Binek, Ro- bust isothermal electric control of exchange bias at room temperature, Nature Materials9, 579 (2010)

2010

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Borisov, A

P. Borisov, A. Hochstrat, X. Chen, W. Kleemann, and C. Binek, Magnetoelectric Switching of Exchange Bias, Physical Review Letters94, 117203 (2005)

2005

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F. Zou, L. Zhang, J. Han, and G. Gao, Giant tun- neling magnetoresistance in altermagnetic heterostruc- tures via multi-stage spin-filtering, Frontiers of Physics 10.15302/frontphys.2026.115205 (2026)

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