Multifractality

In the last lecture we discussed that the eigenstates of the Anderson model can be localized, delocalized or multifractal. The idea is to look at the (generalized) IPR

I P R (q) = \sum_{n} | ψ_{n} |^{2 q} \sim L^{- τ_{q}}

The exponent $τ_{q}$ is called multifractal exponent . Normalization imposes $τ_{1} = 0$ and the fact that the wave fuction is defined everywhere that $τ_{0} = - d$ . In general $τ_{0}$ is the fractal dimension of the object we are considering and it is simply a geometrical property.

Delocalized eigenstates

In this case, $| ψ_{n} |^{2} \approx L^{- d}$ for all the $L^{d}$ sites. This gives

τ_{q}^{deloc} = d (q - 1)

Multifractal eigenstates.

This case correspond to more complex wave function for which we expect

| ψ_{n} |^{2} \approx L^{- α} for L^{f (α)} sites

The exponent $α$ is positive and $f (α)$ is called multifractal spectrum . It is a convex function and its maximum is the fractal dimension of the object, in our case d. We can determine the relation between multifractal spectrum and exponent

I P R (q) = \sum_{n} | ψ_{n} |^{2 q} \sim \int d α L^{- α q} L^{f (α)}

for large L

τ (q) = \min_{α} (α q - f (α))

This means that for $α^{*} (q)$ that verifies $f^{'} (α^{*} (q)) = q$ we have

τ (q) = α^{*} (q) q - f (α^{*} (q))

A metal has a simple spectrum. Indeed, all sites have $α = d$ , hence $f (α = d) = d$ and $f (α \neq d) = - \infty$ . Then $α^{*} (q) = d$ becomes $q$ independent. A multifractal has a smooth spectrum with a maximum at $α_{0}$ with $f (α_{0}) = d$ . At $q = 1$ , $f^{'} (α_{1}) = 1$ and $f (α_{1}) = α_{1}$ .

L-9

Multifractality

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L-9

Multifractality

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