Science Fair Project Encyclopedia

Science Fair Project Encyclopedia Contents Page

Plane at infinity

In projective geometry, the plane at infinity is a projective plane which is added to the affine 3-space in order to give it closure of incidence properties. The result of the addition is the projective 3-space, $P 3$ . If the affine 3-space is real, $\mathbb{R}^3$ , then the addition of a real projective plane $\mathbb{R}P^2$ at infinity produces the real projective 3-space $\mathbb{R}P^3$ .

Note that since the (real) plane at infinity is a projective plane, it is homeomorphic to the surface of a "sphere modulo antipodes", i.e. a sphere in which antipodal points are equivalent: S²/{1,-1} (see quotient space). This spherical plane at infinity surrounds the affine 3-space.

Using homogeneous coordinates, any point on affine 3-space can be represented as (X:Y:Z:1). Then, any point on the plane at infinity can be represented as (X:Y:Z:0). The points on the plane at infinity seem to have three degrees of freedom, but homogenous coordinates are equivalent up to any rescaling:

$(X : Y : Z : 0) \equiv (a X : a Y : a Z : 0)$ ,

so that the coordinates (X:Y:Z:0) can be normalized, thus reducing the degrees of freedom to two (thus, a plane).

Proposition: Any line which passes through the origin (0:0:0:1) and through a point (X:Y:Z:1) will pass the plane at infinity through point (X:Y:Z:0).

Proof: A line which passes through points (0:0:0:1) and (X:Y:Z:1) will consist of points which are linear combinations of the two given points:

$(1 - 2^n) (0:0:0:1) + 2^n (X:Y:Z:1) \$

$= (0:0:0:1) + (2^n X : 2^n Y : 2^n Z : 1), \$

$= (2^n X : 2^n Y : 2^n Z : 1), \$

$= \left( X : Y : Z : {1 \over 2^n} \right).$

Since all of these points belong to the line, for any n, then letting $n \rightarrow \infty$ (infinity belongs to the projective number line) yields $(X : Y : Z :0)$ , as required. Q.E.D.

Any pair of parallel lines in 3-space will intersect each other at a point on the plane at infinity. Also, every line in 3-space intersects the plane at infinity at a unique point. This point is determined by the direction -- and only by the direction -- of the line. To determine this point, "draw" a line parallel to the given line, but passing through the origin. Then choose any point, other than the origin, on this second line. If the homogeneous coordinates of this point are (X:Y:Z:1), then the homogeneous coordinates of the point at infinity through which the first and second line both pass is (X:Y:Z:0).

Example: the first line passes through points (0:0:1:1) and (3:0:1:1). The second line passes through points (0:0:0:1) and (3:0:0:1). The second line passes the plane at infinity through point (3:0:0:0). But the first line also passes through this point:

$\lambda (3:0:1:1) + (1 - \lambda) (0:0:1:1) \$

$= \lambda [(3:0:1:1) - (0:0:1:1)] + (0:0:1:1) \$

$= \lambda (3:0:0:1) + (0:0:1:1) \$

$= (3 \lambda : 0 : 0 : 1) + (0:0:1:1) \$

$= \left( 3 : 0 : 0 : {1 \over \lambda} \right) + (0:0:1:1)$

Letting $\lambda \rightarrow \infty$ ,

$(3:0:0:0) + (0:0:1:1) = (3:0:0:0) \$

since points at infinity are dominant. ■

Any pair of parallel planes in 3-space will intersect each other at a projective line (a line at infinity) on the plane at infinity. Also, every plane in 3-space intersects the plane at infinity at a unique line. This line is determined by the direction -- and only by the direction -- of the plane.

In effect, what the plane at infinity does is to add a point at infinity to every line, converting it into a projective line, and to add a line at infinity to every plane, converting it into a projective plane.

Categories: Projective geometry

Science Fair Project Encyclopedia Contents Page

10-26-2009 08:16:03
The contents of this article is licensed from www.wikipedia.org under the GNU Free Documentation License. Click here to see the transparent copy and copyright details

All Science Fair Projects

Science Fair Project Encyclopedia for Schools!

Science Fair Project Encyclopedia

Plane at infinity