Improperly parametrized rational curves

We describe explicit parametrizations of the rational points of X\*(N), the algebraic curve obtained as quotient of the modular curve X 0 (N) by the group B(N) generated by the Atkin Lehner involutions, whenever N is square-free and the curve is rational or elliptic. By taking into account the modul

For an algebraic curve C with genus 0 the vector space L(D) where D is a divisor of degree 2 gives rise to a bijective morphism g from C to a conic C 2 in the projective plane. We present an algorithm that uses an integral basis for computing L(D) for a suitably chosen D. The advantage of an integra

We present an algorithm for computing a minimal set of generators for the ideal of a rational parametric projective curve in polynomial time. The method exploits the availability of polynomial algorithms for the computation of minimal generators of an ideal of points and is an alternative to the exi

A Igorithms that can obtain rational and special parametric equations for degree three algebraic curves (cubics) and degree three algebraic surfaces (cubicoids), given their implicit equations are described. These algorithms have been implemented on a VAX8600 using VAXIMA.

In my letter to the Editor 1 of July 1988, I discussed one of the results I had presented one month before at Jerusalem: The geometric meaning of the two kinds of geometric continuity of segmented curves. In the case of a contact of order n (i.e. Barsky's geometric continuity) the involved geometric