Counting tritangent planes of space curves

In this paper we obtain, for a class of plane curves, extensions of the well-known relation of inflection points, double points and bitangencies established by Fabricius-Bjerre for closed curves.

We study the structure of function fields of plane curves following our method Ž . developed previously K. Miura and H. Yoshihara, 2000, J. Algebra 226, 283᎐294 . Ž . Let K be the function field of a smooth plane curve C of degree d G 4 and let K be a maximal rational subfield of K for P g ‫ސ‬ 2 .

In this paper we present a theoretical and algorithmic analysis on the normality of rational parametrizations of algebraic plane curves over arbitrary fields of characteristic zero. If the field is algebraically closed we give an algorithm to decide whether a parametrization is proper and, if not, a

## w x Let K x, y be the polynomial algebra in two variables over a field K of characteristic 0. In this paper, we contribute toward a classification of two-variable Ž w x. polynomials by classifying up to an automorphism of K x, y polynomials of the e., polynomials whose New- . ton polygon is e