Potentially visible set


Potentially Visible Sets are used to accelerate the rendering of 3D environments. This is a form of occlusion culling, whereby a candidate set of potentially visible polygons are pre-computed, then indexed at run-time in order to quickly obtain an estimate of the visible geometry. The term PVS is sometimes used to refer to any occlusion culling algorithm, although in almost all the literature, it is used to refer specifically to occlusion culling algorithms that pre-compute visible sets and associate these sets with regions in space. In order to make this association, the camera view-space is typically subdivided into regions and a PVS is computed for each region.

Benefits vs. Cost

The benefit of offloading visibility as a pre-process are:
The disadvantages are:
The primary problem in PVS computation then becomes: Compute the set of polygons that can be visible from anywhere inside each region of a set of polyhedral regions.
There are various classifications of PVS algorithms with respect to the type of visibility set they compute.

Conservative algorithms

These overestimate visibility consistently, such that no triangle that is visible may be omitted. The net result is that no image error is possible, however, it is possible to greatly overestimate visibility, leading to inefficient rendering. The focus on conservative algorithm research is maximizing occluder fusion in order to reduce this overestimation. The list of publications on this type of algorithm is extensive - good surveys on this topic include Cohen-Or et al. and Durand.

Aggressive algorithms

These underestimate visibility consistently, such that no redundant polygons exist in the PVS set, although it may be possible to miss a polygon that is actually visible leading to image errors. The focus on aggressive algorithm research is to reduce the potential error.

Approximate algorithms

These can result in both redundancy and image error.

Exact algorithms

These provide optimal visibility sets, where there is no image error and no redundancy. They are, however, complex to implement and typically run a lot slower than other PVS based visibility algorithms. Teller computed exact visibility for a scene subdivided into cells and portals.
The first general tractable 3D solutions were presented in 2002 by Nirenstein et al. and Bittner. Haumont et al. improve on the performance of these techniques significantly. Bittner et al. solve the problem for 2.5D urban scenes. Although not quite related to PVS computation, the work on the 3D Visibility Complex and 3D Visibility Skeleton by Durand provides an excellent theoretical background on analytic visibility.
Visibility in 3D is inherently a 4-Dimensional problem. To tackle this, solutions are often performed using Plücker coordinates, which effectively linearize the problem in a 5D projective space. Ultimately, these problems are solved with higher-dimensional constructive solid geometry.

Secondary Problems

Some interesting secondary problems include: