The projection map from a product space is very easily seen to be a fibration.

From this point we ignore the RF and work with the projection map.

There is a natural projection map given by .

Fuller also designed an alternative projection map, called the Dymaxion map.

He got to his feet, went to the side wall at his left, indicated a north-polar projection map.

This map is known as the projection map.

In differential topology, any fiber bundle includes a projection map as part of its definition.

Then there is a covering space corresponding to this projection map.

Denote by the natural projection map from to .

The projection map associated with the first irreducible representation is an intertwiner.