Competing ferromagnetic and antiferromagnetic phases on the frustrated Ising honeycomb lattice

Abstract

We investigate the frustrated J1-J2-J3 Ising model on the honeycomb lattice, featuring first- and second-neighbor ferromagnetic couplings (J1>0 and J2>0) and third-neighbor antiferromagnetic interactions (J3<0). Using the cluster mean-field method, we analyze the phase transitions in the regime 1/2 < J2/J1 1, where ferromagnetic and antiferromagnetic phases compete. Our results reveal that near the strongly frustrated limit J3/J1 = -1, the system exhibits order-by-disorder state selection, tricritical and bicritical behavior, critical endpoints, and two successive phase transitions. The ferromagnetic-paramagnetic transition remains second order across the entire interaction range, whereas the antiferromagnetic-paramagnetic boundary shows a richer behavior, including both first- and second-order transitions as well as tricriticality. Increasing the second-neighbor coupling J2/J1 narrows the range of J3/J1 where first-order antiferromagnetic-paramagnetic transitions occur; beyond a certain threshold, only second-order order-disorder transitions persist. Consequently, the tricritical point shifts toward J3/J1 ≈ -1 as J2/J1 increases, culminating in a bicritical point where the antiferromagnetic, ferromagnetic, and paramagnetic phases meet.