Semicircle law (Quantum Hall)

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Summary

Graph of a series involving the von Mangoldt function. More precisely, this is a graph of the function

${\displaystyle F(y)={\displaystyle \sum _{n=2}^{\mathrm{\infty }}}(\mathrm{\Lambda }(n)-1)e^{-ny}}$

considered by Hardy and Littlewood in 1916. They demonstrated that

${\displaystyle F(y)=\mathcal{𝒪}\left(\sqrt{\frac{1}{y}}\right)}$

Curiously, they also show that this function is oscillatory as well, with diverging oscillations. In particular, there exists a value ${\displaystyle K>0}$ such that

${\displaystyle F(y)<-\frac{K}{\sqrt{y}}}$ and ${\displaystyle F(y)>\frac{K}{\sqrt{y}}}$

infinitely often. This graph demonstrates that the second condition is not immediately apparent, numerically. The graph of this function appears to be remarkably linear in the region ${\displaystyle 10^{-5}<y<1/2}$ and visually appears to have an intercept with the y-axis at about -0.337877. However, on closer examination, one discovers oscillations of increasing magnitude as the function approaches ${\displaystyle y=0}$. For the oscillations shown in this graph, a summation including more than 2 billion terms of the series was required.

Licensing

Created by Linas Vepstas User:Linas on 3 July 2006 Template:GFDL