Potential-density pairs for a family of finite disks

Abstract

Exact analytical solutions are given for the three finite disks with surface density n=σ0 (1-R2/α2)n-1/2 with n=0, 1, 2. Closed-form solutions in cylindrical co-ordinates are given using only elementary functions for the potential and for the gravitational field of each of the disks. The n=0 disk is the flattened homeoid for which hom = σ0/1-R2/α2. Improved results are presented for this disk. The n=1 disk is the Maclaurin disk for which Mac = σ0 1-R2/α2. The Maclaurin disk is a limiting case of the Maclaurin spheroid. The potential of the Maclaurin disk is found here by integrating the potential of the n=0 disk over α, exploiting the linearity of Poisson's equation. The n=2 disk has the surface density D2=σ0 (1-R2/α2)3/2. The potential is found by integrating the potential of the n=1 disk.