Model of quadrupole glass with nonaxial interaction

“…Here we would like to make a remark about the five-state model without claiming to be rigorous. Based on the fact that the numerically obtained [14] value of t 1RSB for m = 1 is very close to our t c , one can hope to obtain the jump to the 1RSB solution already from equation (18) and to estimate qualitatively the characteristics in question. In fact, if we expand (18) in the vicinity of m = 1 and let its first and second derivatives relative to v be equal to zero, we obtain t 2 1RSB = 184/187 and the jump v = 561/8464 (compare with the table in [14]).…”

“…Let us note that in the general case of the Hamiltonian (6) with J ij = G ij , one of the glass order parameters, namely q 1 ∼ Q α Q β , cannot be zero even at high temperatures. This fact can be easily seen by analyzing the high-temperature expansions for the RS equations for the order parameters [18]. For the free energy (7) we can obtain two kinds of solutions.…”

Potts spin glasses with three, four and five states nearT=T_c: expanding around the replica symmetric solution

“…Here we would like to make a remark about the five-state model without claiming to be rigorous. Based on the fact that the numerically obtained [14] value of t 1RSB for m = 1 is very close to our t c , one can hope to obtain the jump to the 1RSB solution already from equation (18) and to estimate qualitatively the characteristics in question. In fact, if we expand (18) in the vicinity of m = 1 and let its first and second derivatives relative to v be equal to zero, we obtain t 2 1RSB = 184/187 and the jump v = 561/8464 (compare with the table in [14]).…”

“…Let us note that in the general case of the Hamiltonian (6) with J ij = G ij , one of the glass order parameters, namely q 1 ∼ Q α Q β , cannot be zero even at high temperatures. This fact can be easily seen by analyzing the high-temperature expansions for the RS equations for the order parameters [18]. For the free energy (7) we can obtain two kinds of solutions.…”

Potts spin glasses with three, four and five states nearT=T_c: expanding around the replica symmetric solution

“…In complete analogy with what was said above, we can therefore consider the spherical analogue of the anisotropic quadrupole model whose initial discrete variant was investigated in detail in [14]. For brevity of the exposition, we consider only the limit cases J ij = 0 or G ij = 0.…”

Spherical analogues of some non-Ising spin glass models: Exact solutions

Isotropic model of quadrupole glass