Implicitization and parametrization of quadratic and cubic surfaces by μ-bases

Parametric and implicit forms are two common representations of geometric objects. It is important to be able to pass back and forth between the two representations, two processes called parameterization and implicitization, respectively. In this paper, we study the parametrization and implicitization of quadrics (quadratic parametric surfaces with two base points) and cubic surfaces (cubic parametric surfaces with six base points) with the help of mu-bases - a newly developed tool which connects the parametric form and the implicit form of a surface. For both cases, we show that the minimal mu-bases are all linear in the parametric variables, and based on this observation, very efficient algorithms are devised to compute the minimal mu-bases either from the parametric equation or the implicit equation. The conversion between the parametric equation and the implicit equation can be easily accomplished from the minimal mu-bases.