Visibility and Its Dynamics in a Pde Based Implicit Framework

We investigate the problem of determining visible regions given a set of (moving) obstacles and a (moving) vantage point. Our approach to this problem is through an implicit framework, where the obstacles are represented by a level set function. The visibility problem is formally formulated as a boundary value problem (BVP) of a first order partial differential equation. It is based on the continuation of values along the given ray field. We propose an efficient one-pass, multi-level algorithm for the construction the solution on the grid. Furthermore, we study the dynamics of shadow boundaries on the surfaces of the obstacles when the vantage point moves with a given trajectory. In all of these situations, topological changes such as merging and breaking occur in the regions of interest. These are automatically handled by the level set framework proposed here. Finally, we obtain additional useful information through simple operations in the level set framework.