Statistical Mechanics - Physics at Oregon State University
Statistical Mechanics - Physics at Oregon State University
Statistical Mechanics - Physics at Oregon State University
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8.7. PROBLEMS FOR CHAPTER 8 189<br />
B. Find three equ<strong>at</strong>ions rel<strong>at</strong>ing the m<strong>at</strong>rix elements log(ρ)ij and a and m<br />
by minimizing the free energy with respect to a and m.<br />
C. A fourth equ<strong>at</strong>ion can be found using log det A = Tr log A for arbitrary<br />
m<strong>at</strong>rices. Use this together with the results of B to find an equ<strong>at</strong>ion for a and<br />
m of the form log ρ = m<strong>at</strong>rix containing a and m.<br />
D. Show th<strong>at</strong> a = 0 corresponds to the thermodynamic equilibrium st<strong>at</strong>e<br />
and th<strong>at</strong> the results for the Heisenberg and Ising model in this approxim<strong>at</strong>ion<br />
are the same.<br />
Problem 4.<br />
Probably the simplest cluster one can imagine in a square l<strong>at</strong>tice is a square<br />
of four <strong>at</strong>omic sites. Tre<strong>at</strong> the interactions between these four sites exactly but<br />
tre<strong>at</strong> the interactions with the remainder of the l<strong>at</strong>tice in a mean-field approach.<br />
A. How many inequivalent sites are there within this cluster?<br />
B. The effective field on each site is found by assuming th<strong>at</strong> the spin on<br />
all neighboring sites th<strong>at</strong> are not inside the cluster is equal to m, the average<br />
magnetiz<strong>at</strong>ion. Wh<strong>at</strong> is the cluster Hamiltonian?<br />
C. Wh<strong>at</strong> is the self-consistency condition?<br />
D. Calcul<strong>at</strong>e Tc. How does this compare with the mean-field value kBTc = 4J<br />
and the cluster value kBTc = 2.885J?<br />
Problem 5.<br />
A more complic<strong>at</strong>ed cluster in a square l<strong>at</strong>tice is a square of nine sites.<br />
A. How many inequivalent sites are there in this cluster?<br />
B. We need to impose conditions of the form < σi >=< σj >. How many<br />
constraints does this give?<br />
C. Wh<strong>at</strong> is the cluster Hamiltonian? How many effective fields are there?<br />
D. Indic<strong>at</strong>e how you would try to solve this cluster problem.<br />
Problem 6.<br />
Consider a linear chain with altern<strong>at</strong>ing spin one-half and spin one <strong>at</strong>oms.<br />
The st<strong>at</strong>e of this system is given by {s1, s2, · · ·} where si = ±1 if i is odd and<br />
si = −2, 0, 2 for i even. The energy of such a st<strong>at</strong>e is given by<br />
E {s1, s2, · · ·} = −J <br />
sisi+1 − h <br />
The values of the average magnetiz<strong>at</strong>ion on the two types of sites are given<br />
by m 1/2 and m1. Generalize the mean field approach to construct two coupled<br />
equ<strong>at</strong>ions for these quantities and calcul<strong>at</strong>e Tc for this system.<br />
Problem 7.<br />
i<br />
i<br />
si
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