# Silhouette Edges

Silhouette Edges
Field: Geometry
Image Created By: Steve Cunningham

Silhouette Edges

This bunny is made up of a group a faces that are adjacent to one another. A program has been run on the object that has found the silhouette edges and they are highlighted in green. This is done by finding which faces have their normals facing towards versus away from the viewer.

# Basic Description

If you have a 3D object, either surface or solid, a silhouette edge is the collection of points where the surface normal is orthogonal to the view vector.

If the object is composed of triangles, a silhouette edge is comprised of the common edges between a triangle whose surface normal points toward the viewer and a triangle whose surface normal points away from the viewer. The silhouette edge is a collection of these 'corner' edges, each between one triangle that faces toward and another that faces away from the viewer. This is then an algorithm for finding silhouette edges:

For every triangle in the object
Compute the surface normal of the triangle
If the surface normal points toward the viewer
For every edge of the triangle
Identify the triangle that shares this edge
Compute the surface normal for that triangle
If this surface normal points away from the viewer
Add the edge to the collection of silhouette edges
endif
endfor
endif
endfor

Implementing this algorithm requires some vector arithmetic, as described in the pages on vectors and matrices. This includes computing and comparing the normal vectors for adjacent triangles, as described in the More Mathematical Explanation below.

# A More Mathematical Explanation

Note: understanding of this explanation requires: *Graphics

## Computing the surface normal of a triangle

This is discussed in the page on Surface Normals, [...]

## Computing the surface normal of a triangle

This is discussed in the page on Surface Normals, but it involves the cross product of two vectors. These vectors may be

(a) two adjacent edge vectors from a triangle, or
(b) two tangent vectors at a point in the triangle computed by partial derivatives.

Cross products are order-sensitive, so you need to arrange these two vectors so that the angle between the first E1 and second E2 is positive in the usual sense, that is, that the second is counterclockwise from the first. Then the surface normal to the triangle is the cross product $N = E1 \times E2$. This is shown in the figure below:

## Determining whether a surface triangle normal points toward the viewer

Once you have the triangle surface normal N, compute the view vector as the vector from the eyepoint to the point on the triangle you used in computing the normal; this is the view vector V. For this question we are more interested in the vector from the triangle to the eyepoint, but this is simply V’= –V. Then the surface normal points toward the eye if the angle between N and V’ is acute; this is true if the dot product N•V’ is positive, as shown in the figure below:

## Example of a surface

Consider a surface such as this trig function surface shown in the figure below, given by the formula $f(x,y) = 0.3 \times \cos(x^2 +y^2 +t)$, with the parameter t intended to be varied continually giving an animation to the surface:

If you use the technique of constructing a grid for the function domain, as described in the discussion of surfaces, for each triangle you can identify the adjacent grid triangles and thus the adjacent triangles, and so you can compute the triangle surface normals from either the geometric or analytic approach, as described above.

## Example for an object

Building an interesting graphical object is probably not an easy job, so you might look for other sources of examples. A good source might come from the might come from the publicly-available .obj files at sources named at

http://www.hongkiat.com/blog/60-excellent-free-3d-model-websites/

Below is an example: the Stanford bunny from

http://graphics.stanford.edu/~mdfisher/Data/Meshes/bunny.obj

The figure shows this with silhouette edges in green on top of a very restricted lighting, so you can tell what a silhouette edge might look like. Two other “canonical” .obj files for computer graphics, both having lots of interesting shapes, are the dragon and the happy Buddha you can find at

http://www.d.umn.edu/~ddunham/cs5721f07/schedule/resources/lab_opengl07.html

If you use a source such as the usual .obj files, you may have difficulty in figuring out which triangles are adjacent to one you are considering. However, some .obj files use triangles with adjacency rather than simple triangles. In this case, the primitives with adjacency we described in the section on geometric primitives may help. As described there, a triangle with adjacency actually includes six points, as described by the figure below:

So for any edge of the triangle with vertices 0, 2, and 4, you have the adjacent triangle, letting you compute all the triangle normals you need for the silhouette computation. The bunny figure above was computed from an .obj file that included this kind of adjacency.

# References

Page written by Steve Cunningham.

  [[Description::This bunny is made up of a group a faces that are adjacent to one another.  A program has been run on the object that has found the silhouette edges and they are highlighted in green.  This is done by finding which faces have their normals facing towards versus away from the viewer.|]]