Two-dimensional easy-plane SU$(3)$ magnet with the transverse field: Anisotropy-driven multicriticality

TL;DR

This paper investigates the phase transitions of a two-dimensional easy-plane SU(3) magnet under a transverse field, revealing multicritical behavior influenced by anisotropy and extending understanding beyond the SU(2) case.

Contribution

It extends the analysis of transverse-field-driven phase transitions from SU(2) to SU(3) symmetry, exploring anisotropy effects and multicriticality using fidelity susceptibility.

Findings

Fidelity susceptibility signals criticality clearly.

Crossover scaling yields the exponent .

Anisotropy parameter  influences multicritical behavior.

Abstract

The two-dimensional easy-plane SU$(3)$ magnet subjected to the transverse field was investigated with the exact-diagonalization method. So far, as to the $XY$ model (namely, the easy-plane SU$(2)$ magnet), the transverse-field-driven order-disorder phase boundary has been investigated with the exact-diagonalization method, and it was claimed that the end-point singularity (multicriticality) at the $XX$-symmetric point does not accord with large-$N$-theory's prediction. Aiming to reconcile the discrepancy, we extend the internal symmetry to the easy-plane SU$(3)$ with the anisotropy parameter $\eta$, which interpolates the isotropic ($\eta=0$) and fully anisotropic ($\eta=1$) cases smoothly. As a preliminary survey, setting $\eta=1$, we analyze the order-disorder phase transition through resorting to the fidelity susceptibility $\chi_F$, which exhibits a pronounced signature for the criticality. Thereby, with $\eta$ scaled carefully, the $\chi_F$ data are cast into the crossover-scaling formula so as to determine the crossover exponent $\phi$, which seems to reflect the extension of the internal symmetry group to SU(3).