Circular surface


In mathematics and, in particular, differential geometry a circular surface is the image of a map ƒ : I × S1R3, where IR is an open interval and S1 is the unit circle, defined by
where γ, u, v : IR3 and r : IR>0, when Moreover, it is usually assumed that u · u = v · v = 1 and u · v = 0, where dot denotes the canonical scalar product on R3, i.e. u and v are unit length and mutually perpendicular. The map γ : IR3 is called the base curve for the circular surface and the two maps u, v : IR3 are called the direction frame for the circular surface. For a fixed t0I the image of ƒ is called a generating circle of the circular surface.
Circular surfaces are an analogue of ruled surfaces. In the case of circular surfaces the generators are circles; called the generating circles. In the case of ruled surface the generators are straight lines; called rulings.