Revision as of 15:56, 12 November 2023

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 $σ = \pm 1$ and live on a lattice of $N$ sitees $i = 1, 2, \dots, N$ . The enregy is writteen as a sum between the nearest neighbours <i,j>:

E = \sum_{< i, j >} J_{i j} σ_{i} σ_{j}

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

\bar{J} \equiv \int d J J π (J) = 0

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

Gaussian couplings: $π (J) = \exp (- J^{2} / 2) / \sqrt{2 π}$
Coin toss couplings, $J = \pm 1$ , selected with probability $1 / 2$ .

Edwards Anderson order parameter

The SK model

Random energy model

Derivation

Bibliography

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

@@ Line 14: / Line 14: @@
   E= \sum_{ <i, j> } J_{ij} \sigma_i \sigma_j
 </math></center>
-The key point of the model proposed by Edwards and Anderson is that the couplings <math>J_{ij} </math> are i.i.d. random variables with '''zero mean'''.
+The key point of the model proposed by Edwards and Anderson is that the couplings <math>J </math> are i.i.d. random variables with '''zero mean'''.
-We set <math>\pi(J_{ij})</math> the coupling distribution indicate the avergage over the couplings called disorder average, with an overline:
+We set <math>\pi(J)</math> the coupling distribution indicate the avergage over the couplings called disorder average, with an overline:
 <center><math>
-  \bar{J_{ij}} \equiv \int d J_{ij} \, J_{ij} \pi(J_{ij})=0
+  \bar{J} \equiv \int d J \, J \pi(J)=0
 </math></center>
 It is crucial to assume <math>
-  \bar{J_{ij}}=0 </math>, otherwise the model displays ferro/antiferro order. We sill discuss two distributions:
+  \bar{J}=0 </math>, otherwise the model displays ferro/antiferro order. We sill discuss two distributions:
-* Gaussian couplings: <math> \pi(J) =\exp\left(-J_{ij}^2/2\right)/\sqrt{2 \pi}</math>
+* Gaussian couplings: <math> \pi(J) =\exp\left(-J^2/2\right)/\sqrt{2 \pi}</math>
-* Coin toss couplings, <math>J_{ij}= \pm 1 </math>, selected  with probability <math>1/2 </math>.
+* Coin toss couplings, <math>J= \pm 1 </math>, selected  with probability <math>1/2 </math>.
 == Edwards Anderson order parameter==

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Revision as of 15:56, 12 November 2023

Contents

Spin glass Transition

Experiments

Edwards Anderson model

Edwards Anderson order parameter

The SK model

Random energy model

Derivation

Bibliography

Bibliography

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L-1: Difference between revisions

Revision as of 15:56, 12 November 2023

Spin glass Transition

Experiments

Edwards Anderson model

Edwards Anderson order parameter

The SK model

Random energy model

Derivation

Bibliography

Bibliography

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