Fluctuations of the nodal length of random spherical harmonics, erratum

TL;DR

This paper investigates the fluctuations in the length of nodal lines of random spherical harmonics, revealing a surprising logarithmic variance growth contrary to the expected linear order, aligning with predictions for chaotic systems.

Contribution

It demonstrates that the variance of the nodal length of random spherical harmonics grows logarithmically with degree, showing an unexpected cancellation effect not previously understood.

Findings

Variance of nodal length is of order log(n)

Results align with Berry's predictions for chaotic billiards

Applicable to generic linear statistics of nodal lines

Abstract

Using the multiplicities of the Laplace eigenspace on the sphere (the space of spherical harmonics) we endow the space with Gaussian probability measure. This induces a notion of random Gaussian spherical harmonics of degree $n$ having Laplace eigenvalue $E=n(n+1)$. We study the length distribution of the nodal lines of random spherical harmonics. It is known that the expected length is of order $n$. It is natural to conjecture that the variance should be of order $n$, due to the natural scaling. Our principal result is that, due to an unexpected cancelation, the variance of the nodal length of random spherical harmonics is of order $\log{n}$. This behaviour is consistent with the one predicted by Berry for nodal lines on chaotic billiards (Random Wave Model). In addition we find that a similar result is applicable for "generic" linear statistics of the nodal lines.