Lifted Kramers spin degeneracy (LKSD) has been among the central topics of condensed-matter physics since the dawn of the band theory of solids. It underpins established practical applications as well as current frontier research, ranging from magnetic-memory technology to topological quantum matter. Traditionally, LKSD has been considered to originate from two possible internal symmetry-breaking mechanisms. The first refers to time-reversal symmetry breaking by magnetization of ferromagnets and tends to be strong because of the non-relativistic exchange origin. The second applies to crystals with broken inversion symmetry and tends to be comparatively weaker, as it originates from the relativistic spin-orbit coupling (SOC). A recent theory work based on spin-symmetry classification has identified an unconventional magnetic phase, dubbed altermagnetic, that allows for LKSD without net magnetization and inversion-symmetry breaking. Here we provide the confirmation using photoemission spectroscopy and ab initio calculations. We identify two distinct unconventional mechanisms of LKSD generated by the altermagnetic phase of centrosymmetric MnTe with vanishing net magnetization. Our observation of the altermagnetic LKSD can have broad consequences in magnetism. It motivates exploration and exploitation of the unconventional nature of this magnetic phase in an extended family of materials, ranging from insulators and semiconductors to metals and superconductors(20,21), that have been either identified recently or perceived for many decades as conventional antiferromagnets.
WOS:001163408400002
2024-02-15
626
7999
517
REVIEWED
Funder | Grant Number |
Czech Science Foundation | 19-28375X |
Ministry of Education of the Czech Republic | CZ.02.01.01/00/22_008/0004594 |
LNSM-LNSpin | |
Neuron Endowment Fund grant | |
Johannes Gutenberg-Universitat Mainz TopDyn initiative | |
Deutsche Forschungsgemeinschaft (DFG) | TRR 173 268565370 |
European Regional Development Fund | |
Swiss National Science Foundation | 200021_185037 |
Czech Academy of Sciences | LQ100102201 |
Austrian Science Fund | P30960-N27 |
LM2018140 | |