1.
High order parametric polynomial approximation of quadrics in R [sup] dGašper Jaklič,
Jernej Kozak,
Marjetka Knez,
Vito Vitrih,
Emil Žagar, 2012, izvirni znanstveni članek
Opis: In this paper an approximation of implicitly defined quadrics in ▫${\mathbb R}^d$▫ by parametric polynomial hypersurfaces is considered. The construction of the approximants provides the polynomial hypersurface in a closed form, and it is based on the minimization of the error term arising from the implicit equation of a quadric. It is shown that this approach also minimizes the normal distance between the quadric and the polynomial hypersurface. Furthermore, the asymptotic analysis confirms that the distance decreases at least exponentially as the polynomial degree grows. Numerical experiments for spatial quadrics illustrate the obtained theoretical results.
Ključne besede: mathematics, quadric hypersurface, conic section, polynomial approximation, approximation order, normal distance
Objavljeno v RUP: 03.04.2017; Ogledov: 2138; Prenosov: 32
Povezava na celotno besedilo