On the Monodromy of Weierstrass Points on Gorenstein Curves

In this paper we consider families of elliptic curves E n over Q arising as twists. Given rational points P n on E n , we ask how often P n is indivisible in the group of rational points of E n , as n varies over the positive integers. We prove, following the method of Silverman for families with no

## Ž . points on M. We study the Weierstrass gap set G P , . . . , P and prove the 1 4 Ž . conjecture of Ballico and Kim on the upper bound of ࠻G P , . . . , P affirmatively 1 4 in case M is d-gonal curve of genus g G 5 with d s 2 or d G 5. ᮊ 2002 Elsevier Ž . Science USA 1 1 Ž . cardinality ࠻G P

and M n,m (t) is the so called moving control point which is itself a rational Be ´zier curve of same degree and same Hybrid curves provide an attractive method for approximating rational Be ´zier curves by polynomial Be ´zier curves. In this weights as the initial rational curve, i.e., paper, sever

Tate proved a theorem on rational points of torsors ("Torsors" means "Homogeneous spaces," in sequel we use "torsors" in this meaning) of \(T / K\), where \(K\) is a local field, \(T\) is a Tate curve. In this paper we extend the above theorem to the case where \(T\) is a twist of a Tate curve, and