Local origin of the strong field-space anisotropy in the magnetic phase diagrams of Ce$_{1-x}$La$_x$B$_6$ measured in a rotating magnetic field

TL;DR

This study shows that the anisotropy in magnetic phase diagrams of Ce$_{1-x}$La$_x$B$_6$ compounds under rotating magnetic fields can be qualitatively explained by a simple local model considering crystal-electric-field effects and exchange interactions, highlighting a local origin of the anisotropy.

Contribution

The paper introduces a minimal local model based on crystal-electric-field scheme and exchange interactions to understand field-directional anisotropy in magnetic phase transitions.

Findings

Anisotropy of phase transitions resembles experimental phase diagrams.

Local crystal-electric-field effects can explain anisotropy.

The approach simplifies understanding complex magnetic phases.

Abstract

Cubic f-electron compounds commonly exhibit highly anisotropic magnetic phase diagrams consisting of multiple long-range ordered phases. Field-driven metamagnetic transitions between them may depend not only on the magnitude, but also on the direction of the applied magnetic field. Examples of such behavior are plentiful among rare-earth borides, such as RB$_6$ or RB$_{12}$ ($R$ = rare earth). In this work, for example, we use torque magnetometry to measure anisotropic field-angular phase diagrams of La-doped cerium hexaborides, Ce$_{1-x}$La$_x$B$_6$ ($x$ = 0, 0.18, 0.28, 0.5). One expects that field-directional anisotropy of phase transitions must be impossible to understand without knowing the magnetic structures of the corresponding competing phases and being able to evaluate their precise thermodynamic energy balance. However, this task is usually beyond the reach of available theoretical approaches, because the ordered phases can be noncollinear, possess large magnetic unit cells, involve higher-order multipoles of 4f ions rather than simple dipoles, or just lack sufficient microscopic characterization. Here we demonstrate that the anisotropy under field rotation can be qualitatively understood on a much more basic level of theory, just by considering the crystal-electric-field scheme of a pair of rare-earth ions in the lattice, coupled by a single nearest-neighbor exchange interaction. Transitions between different crystal-field ground states, calculated using this minimal model for the parent compound CeB6, possess field-directional anisotropy that strikingly resembles the experimental phase diagrams. This implies that the anisotropy of phase transitions is of local origin and is easier to describe than the ordered phases themselves.