42 PROBLEMSwhere B is an external field, is the magnetic moment, and the prime
indicates that the summation is only over the nearest neighbors. Each spin
has nearest neighbors. The spins are restricted to equal The
coupling constantJ is positive. Following Weiss, represent the effect on
of the spin–spin interaction in (P.4.87.1) by the mean field set up by the
neighboringspins Calculate the linear spin susceptibility using
this mean field approximation. Yourexpression should diverge at some
temperature What is the physical significance of this divergence?
What is happening to the spin lattice at4.88 Spin Waves in Ferromagnets (Princeton,
Colorado)Consider the quantum mechanical spin-1/2 system with Hamiltonianwhere the summation is over nearest-neighbor pairs in threedimensions.a)
b)c)d)Fluctuations
4.89 Magnetization Fluctuation (Stony Brook)
Consider N moments with two allowed orientations in an external
field H at temperature Calculate the fluctuation of magnetization M,
i.e.,
Derive the equation of motion for the spin at site of the lattice.
Convert the model to a classical microscopic model by inserting the
classical spin field into theequation of motion. Express
to lowestorder in its gradients, considering asimplecubic latticewith
lattice constant
Consider the ferromagneticcase with uniform magnetization
Derive the frequency-versus-wave vector relation of a small spin-
wave fluctuation
Quantize the spin waves in terms of magnons which are bosons. De-
rive thetemperaturedependence of theheatcapacity.