Eilenberg–Mazur swindle

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The Binder parameter^[1] in statistical physics, also known as the fourth-order culumant $U_{L} = 1 - \frac{{⟨ s^{4} ⟩}_{L}}{3 {⟨ s^{2} ⟩}_{L}^{2}}$ in Ising model,^[2] is used to identify phase transition points in numerical simulations. It is defined as the kurtosis of the order parameter. For example in spin glasses one defines the Binder as

$B = \frac{1}{2} (3 - \frac{\overline{⟨ q^{4} ⟩}}{\overset{2}{\overline{⟨ q^{2} ⟩}}})$

where $⟨ \cdot ⟩$ stands for Boltzmann average, $\overline{\cdot}$ for average over the disorder and $q$ is the overlap between two identical replicas of the system. The phase transition point is usually identified comparing the behavior of $B$ as a function of the temperature for different values of the system size $L$ . The transition temperature is the unique point where the different curves cross. This is based on finite size scaling hypothesis, according to which, in the critical region $T \approx T_{c}$ the Binder behaves as $B (T, L) = b (ϵ L^{1 / ν})$ , where $ϵ = \frac{T - T_{c}}{T}$ .

References

↑ K. Binder, Z. Phys. B 43, 119 (1981)
↑ K. Binder & D. W. Heermann, Monte Carlo Simulation in Statistical Physics An Introduction, Ed. 4, Spring

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[1] K. Binder, Z. Phys. B 43, 119 (1981)

[2] K. Binder & D. W. Heermann, Monte Carlo Simulation in Statistical Physics An Introduction, Ed. 4, Spring

[1]

[2]

Eilenberg–Mazur swindle

References

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