Offset curves in the plane

## 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

If the group H of the F O -rational points of a non-singular cubic curve has even order, then the coset of a subgroup of H of index two is an arc in the Galois plane of order q. The completeness of such an arc has been proved, except for the case j"0, where j is the j-invariant of the underlying cub

We present an algorithm that computes the convex hull of multiple rational curves in the plane. The problem is reformulated as one of finding the zero-sets of polynomial equations in one or two variables; using these zero-sets we characterize curve segments that belong to the boundary of the convex