an:00719442
Zbl 0849.14011
Komeda, Jiryo
On the existence of Weierstrass gap sequences on curves of genus \(\leq 8\)
EN
J. Pure Appl. Algebra 97, No. 1, 51-71 (1994).
00024184
1994
j
14H55 14H45
Weierstrass gap sequences; genus; Weierstrass group
Let \(C\) be a complete nonsingular irreducible 1-dimensional algebraic variety of genus \(g\) over the field \(\mathbb{C}\) of complex numbers. Let \(\mathbb{N}\) be the additive semigroup of non-negative integers. Let \(K(C)\) denote the field of rational functions on \(C\). An subsemigroup \(H\) of \(\mathbb{N}\) is Weierstrass if there exists a pointed curve \((C,P)\) such that \(H(P) = \{h \in \mathbb{N} \mid\) there exists \(f\in K(C)\) with \((f)_\infty = hP\} = H\). In this paper the author proves that any numerical semigroup \(H\) (a subsemigroup of \(\mathbb{N}\) whose complement \(\mathbb{N} \backslash H\) in \(\mathbb{N}\) is finite) of genus \(g \leq 7\) is Weierstrass. Moreover, in the cases \(g = 8\) he proves that all primitive numerical semigroups are Weierstrass, i.e., twice the smallest positive integer in \(H > \) the largest integer in \(\mathbb{N} \backslash H\).
E.Bujalance (Madrid)