Number of Scatterings in Random Walks (2312.15860v1)

Abstract: This paper investigates the number of scatterings a photon undergoes in random walks before escaping from a medium. The number of scatterings in random walk processes is commonly approximated as $\tau+\tau^2$ in the literature, where $\tau$ is the optical thickness measured from the center of the medium. However, it is found that this formula is not accurate. In this study, analytical solutions in sphere and slab geometries are derived for both optically thin and optically thick limits, assuming isotropic scattering. These solutions are verified using Monte Carlo simulations. In the optically thick limit, the number of scatterings is found to be $0.5\tau^2$ and $1.5\tau^2$ in a sphere and slab, respectively. In the optically thin limit, the number of scatterings is $\approx\tau$ in a sphere and $\approx\tau(1-\gamma-\ln\tau+\tau)$ in a slab, where $\gamma\simeq 0.57722$ is the Euler-Mascheroni constant. Additionally, we present approximate formulas that reasonably reproduce the simulation results well in intermediate optical depths. These results are applicable to scattering processes that exhibit forward and backward symmetry, including both isotropic and Thomson scattering.