Spin glass Transition

Experiments

Parlare dei campioni di rame dopati con il magnesio, marino o no: trovare due figure una di suscettivita e una di calore specifico, prova della transizione termodinamica.

Edwards Anderson model

We consider for simplicity the Ising version of this model.

Ising spins takes two values ${\displaystyle \sigma =\pm 1}$ and live on a lattice of ${\displaystyle N}$ sitees ${\displaystyle i=1,2,\ldots ,N}$. The enregy is writteen as a sum between the nearest neighbours <i,j>:

${\displaystyle E=\sum _{<i,j>}J_{ij}\sigma _{i}\sigma _{j}}$

The key point of the model proposed by Edwards and Anderson is that the couplings ${\displaystyle J_{ij}}$ are i.i.d. random variables with zero mean. We set ${\displaystyle \pi (J_{ij})}$ the coupling distribution indicate the avergage over the couplings called disorder average, with an overline:

${\displaystyle {\bar {J_{ij}}}\equiv \int dJ_{ij}\,J_{ij}\pi (J_{ij})=0}$

It is crucial to assume ${\displaystyle {\bar {J_{ij}}}=0}$, otherwise the model displays ferro/antiferro order. We sill discuss two distributions:

• Gaussian couplings: Failed to parse (syntax error): {\displaystyle \pi(J) = \frac{\exp\left({-J_{ij}^2/2}\right)/\sqrt{2 \pi}}
• Coin toss couplings ${\displaystyle J_{ij}=\pm 1}$, selected with probability ${\displaystyle 1/2}$.

Edwards Anderson order parameter

The SK model

Random energy model

Derivation

Bibliography

Bibliography

• Theory of spin glasses, S. F. Edwards and P. W. Anderson, J. Phys. F: Met. Phys. 5 965, 1975

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