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Problem 1: Ginzburg criterion in arbitrary spatial dimension

The general solution for the correlation function in arbitrary spatial dimension ${\displaystyle d}$ within the mean-field theory can be written as:

${\displaystyle G(r)\sim {\frac {e^{-r/\xi }}{r^{d-2}}}}$

assuming that distance ${\displaystyle r\gg a}$ is much larger than the lattice spacing ${\displaystyle a}$.

(a) Generalize the Ginzburg criterion

${\displaystyle {\frac {G(r)}{\int m^{2}d\mathbf {r} }}\ll 1}$

for the validity of the mean-field theory to arbitrary spatial dimension ${\displaystyle d}$ to show that it is satisfied if

${\displaystyle d>2+2\beta /\nu }$.

where ${\displaystyle \beta }$ and ${\displaystyle \nu }$ are critical exponents for describing vanishing of the order parameter ${\displaystyle m}$ and divergence of the correlation length ${\displaystyle \xi }$, respectively.

(b) Using your result in (a), find the upper critical dimension for the Ising model above which its critical behavior near temperature ${\displaystyle T_{c}}$ is well-described by the mean-field theory.

Problem 2: Predictions of the Landau theory for the critical exponents ${\displaystyle \gamma }$ and ${\displaystyle \delta }$

(a) Starting from the Gibbs free energy density in Landau theory:

${\displaystyle g(T,m)=a(T)+{\frac {b(T)}{2}}m^{2}+{\frac {c(T)}{4}}m^{4}-hm}$

show that isothermal susceptibility ${\displaystyle \chi =(\partial m/\partial h)_{T}}$ is given by ${\displaystyle \chi =1/b_{0}(T-T_{c})}$ for ${\displaystyle T>T_{c}}$ and ${\displaystyle \chi =1/b_{0}(T-T_{c})}$ for ${\displaystyle T>T_{c}}$, so that critical exponent ${\displaystyle \gamma =1}$ according to Landau mean-field theory. HINT: Find the value of the order parameter ${\displaystyle m}$ which minimizes ${\displaystyle g(T,m)}$ and use ${\displaystyle b=b_{0}(T-T_{c})}$.

(b) Show that ${\displaystyle cm^{3}=h}$ at the critical point, and hence critical exponent ${\displaystyle \delta =3}$, where ${\displaystyle \delta }$ is defined by ${\displaystyle m\sim H^{1/\delta }}$.

Problem 3: Renormalization group for 1D Ising model using transfer matrix method

The partition function for the N-spin Ising chain can be written as the trace of the N-th power of the transfer matrix T. Another way to reduce the number of degrees of freedom is the describe the system in terms of two-spin cells, where the partition function is written as:

${\displaystyle Z=\mathrm {Tr} \,\mathbf {T} ^{N}=\mathrm {Tr} \,(\mathbf {T} ^{2})^{N/2}=\mathrm {Tr} \,\mathbf {T'} ^{N/2}}$

The transfer matrix for two-spin cells, ${\displaystyle \mathbf {T} ^{2}}$, can be written as:

${\displaystyle Z=\mathrm {Tr} \,\mathbf {T} ^{N}=\mathrm {Tr} \,(\mathbf {T} ^{2})^{N/2}=\mathrm {Tr} \,\mathbf {T'} ^{N/2}}$