A theory for anisotropic magnetoresistance in materials with two vector order parameters

TL;DR

This paper develops a universal theoretical framework for anisotropic magnetoresistance and planar Hall resistance in magnetic materials with two vector order parameters, revealing distinct angular dependencies and non-reciprocal resistivity behaviors.

Contribution

It introduces a general theory for galvanomagnetic effects in complex magnetic materials with two vector order parameters, extending understanding beyond traditional single-parameter models.

Findings

AMR and PHR have universal angular dependence in these materials.

Resistivity is non-reciprocal without inversion symmetry.

Periodicities of AMR and PHR are 2π, not π, in these materials.

Abstract

Anisotropic magnetoresistance (AMR) and related planar Hall resistance (PHR) are ubiquitous phenomena of magnetic materials. Although the universal angular dependences of AMR and PHR in magnetic polycrystalline materials with one order parameter are well known, no similar universal relation for other class of magnetic materials are known to date. Here I present a general theory of galvanomagnetic effects in magnetic materials with two vector order parameters, such as magnetic single crystals with a dominated crystalline axis or polycrystalline non-collinear ferrimagnetic materials. It is shown that AMR and PHR have a universal angular dependence. In general, both longitudinal and transverse resistivity are non-reciprocal in the absence of inversion symmetry: Resistivity takes different value when the current is reversed. Different from simple magnetic polycrystalline materials where AMR and PHR have the same magnitude, and $\pi/4$ out of phase, the magnitude of AMR and PHR of materials with two vector order parameters are not the same in general, and the phase difference is not $\pi/4$. Instead of $\pi$ periodicity of the usual AMR and PHR, the periodicities of materials with two order parameters are $2\pi$.