We study the Lyapunov exponents of a two-dimensional, random Lorentz gas at
low density. The positive Lyapunov exponent may be obtained either by a direct
analysis of the dynamics, or by the use of kinetic theory methods. To leading
orders in the density of scatterers it is of the form
A0βn~lnn~+B0βn~, where A0β and B0β are
known constants and n~ is the number density of scatterers expressed
in dimensionless units. In this paper, we find that through order
(n~2), the positive Lyapunov exponent is of the form
A0βn~lnn~+B0βn~+A1βn~2lnn~+B1βn~2. Explicit numerical values of the new constants A1β
and B1β are obtained by means of a systematic analysis. This takes into
account, up to O(n~2), the effects of {\it all\/} possible
trajectories in two versions of the model; in one version overlapping scatterer
configurations are allowed and in the other they are not.Comment: 12 pages, 9 figures, minor changes in this version, to appear in J.
Stat. Phy