Gegenbauer polynomials and fluctuation properties of the one-dimensional Riesz gas

Abstract

The Riesz gas in one-dimension consists of particles interacting via a pair potential, sgn(s) |x - x'|-s, s 0 and - | x - x'| for s=0. In the infinite density limit, with the particle support the interval [-1,1], we apply a functional derivative method due to Beenakker to compute the covariance of two smooth linear statistics for the Riesz gas with exponent s ∈ (-1,1), s 0. This we give in terms of a sum over Fourier components of the linear statistics with respect to a Gegenbauer polynomial \Cn(s/2)(x) \ basis, which generalises a known form in the case s=0 involving a cosine expansion. For the power sum linear statistic, our general formula can be reduced to a product of gamma function form, and compared against recent exact results in the literature for this case.