Solution to Set 3: Difference between revisions

This assignment corresponds to Section 8.3 and 8.4 in the Solid State Physics book. It deals with the topics of Magnetic Order.

Given Informatin

• Classical Ising antiferromagnet on a ”bipartite” lattice given by Hamiltonian Failed to parse (syntax error): {\displaystyle H = \frac{J}{2} \sum_{<ij>} S_i S_j -− h\sum_i S_i } ,
• Bipartite lattice: a lattice with 2 sublattices, so that each spin on sublattice A interacts only with some spin on the other sublattice B. In an antiferromagnetic state, each sublattice assumes a uniform magnetization.
• Magnetization for Lattice A: ${\displaystyle m_{A}=<S^{(A)}>}$
• Magnetization for Lattice B: ${\displaystyle m_{B}=<S^{(B)}>}$
• Average magnetization: ${\displaystyle m={\frac {1}{2}}(m_{A}+m_{B}),}$
• "Staggered” magnetization: ${\displaystyle m^{\dagger }={\frac {1}{2}}(m_{A}-m_{B}),}$ (Note: It's the difference between the two sublattices)
• ${\displaystyle m=1\;}$ for perfect ferromagnetic order
• ${\displaystyle m^{\dagger }=1}$ for perfect antiferromagnetic order

Part 1

(1) Use Weiss mean-field decoupling to replace one of the spins in the Hamiltonian by its thermal average. The Weiss field experienced by a given spin is then proportional to the sublattice magnetization on the other sublattice. Write down self-consistent equations for ${\displaystyle m_{A}\;}$ and ${\displaystyle m_{B}\;}$, and express them through the order parameters ${\displaystyle m\;}$ and ${\displaystyle m^{\dagger }}$.

pg 222 of Solid State Physics

The systematic way of replacing the spin operator in the Heisenberg Hamiltonian by their average values in order to obtain the Weiss molecular field approximation is to insert ${\displaystyle S_{i}=<S>+(S_{i}-<S>)}$ and ${\displaystyle S_{j}=<S>+(S_{j}-<S>)}$ into Failed to parse (syntax error): {\displaystyle H = \frac{J}{2} \sum_{<ij>} S_i S_j -− h\sum_i S_i }

The answer becomes ${\displaystyle H\approx {\frac {1}{2}}\lambda \mu _{0}{\textbf {M}}^{2}-\sum _{i}\lambda \mu _{0}{\textbf {\mu _{i}}}}$

Part 2

(2) Assume that ${\displaystyle h=0\;}$, so that ${\displaystyle m=0\;}$, and solve the mean-field equations by expanding in ${\displaystyle m^{\dagger }}$. Determine the Neel (ordering) temperature, and calculate the order-parameter exponent.

Part 3

(3) Now consider a small external field ${\displaystyle h>0\;}$, so that both order parameters can assume a nonzero value (Note: ${\displaystyle m\;}$ will be small). By keeping only the leading terms in ${\displaystyle h\;}$ and ${\displaystyle m\;}$, calculate the uniform spin susceptibility ${\displaystyle \chi =\partial m/\partial h}$, as a function of temperature. Plot ${\displaystyle \chi \;}$ as a function of temperature, and show that it has a cusp around ${\displaystyle T_{N}\;}$.

Part 4

(4) Imagine adding a ”staggered” external field ${\displaystyle h^{\dagger }}$, which would be positive on sublattice A, but would be negative on sublattice B. Concentrate on the system with no uniform field ${\displaystyle (h=0)\;}$, and determine the behavior of the staggered susceptibility ${\displaystyle \chi ^{\dagger }=\partial m^{\dagger }/\partial h^{\dagger }}$. Show that ${\displaystyle \chi ^{\dagger }}$ blows up at the Neel temperature.