Onsager reciprocal relation between anomalous transverse coefficients of an anisotropic antiferromagnet

Abstract

Whenever two irreversible processes occur simultaneously, time-reversal symmetry of microscopic dynamics gives rise, on a macroscopic level, to Onsager's reciprocal relations, which impose constraints on the number of independent components of any transport coefficient tensor. Here, we show that in the antiferromagnetic YbMnBi2, which displays a strong temperature-dependent anisotropy, the Onsager's reciprocal relations are strictly satisfied for anomalous electric (σAij) and anomalous thermoelectric (αAij) conductivity tensors. In contradiction with what was recently reported by Pan et~al. [Nat.Mater. 21, 203 (2022)], we find that σAij (H)= σAji (-H), and αAij (H)= αAji (-H). This equality holds in the whole temperature window irrespective of the relative weights of the intrinsic or extrinsic mechanisms. The αAij/σAij ratio is close to kB/e at room temperature, but peaks to an unprecedented magnitude of 2.9 kB/e at 150 K, which may involve nondegenerate carriers of small Fermi surface pockets.