The μ -Basis of Improper Rational Parametric Surface and Its Application

The μ -basis is a newly developed algebraic tool in curve and surface representations and it is used to analyze some essential geometric properties of curves and surfaces. However, the theoretical frame of μ -bases is still developing, especially of surfaces. We study the μ -basis of a rational surface V defined parametrically by P ( t ¯ ) , t ¯ = ( t 1 , t 2 ) not being necessarily proper (or invertible). For applications using the μ -basis, an inversion formula for a given proper parametrization P ( t ¯ ) is obtained. In addition, the degree of the rational map ϕ P associated with any P ( t ¯ ) is computed. If P ( t ¯ ) is improper, we give some partial results in finding a proper reparametrization of V . Finally, the implicitization formula is derived from P (not being necessarily proper). The discussions only need to compute the greatest common divisors and univariate resultants of polynomials constructed from the μ -basis. Examples are given to illustrate the computational processes of the presented results.