Conchoid surfaces of spheres
Abstract
The conchoid of a surface F with respect to given fixed point O is roughly speaking the surface obtained by increasing the radius function with respect to O by a constant. This paper studies conchoid surfaces of spheres and shows that these surfaces admit rational parameterizations. Explicit parameterizations of these surfaces are constructed using the relations to pencils of quadrics in 3 and 4. Moreover we point to remarkable geometric properties of these surfaces and their construction.
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