I don't know how to answer this question at homework level. If you have a plane curve of degree $d$, it has lots of maps to $P^1$ of degree $d-1$ by projecting from points. If the curve is also hyperelliptic, it has a map of degree two to $P^1$. For at least one of the maps of degree $d-1$, the conditions of the Castelnuovo genus bound (you'll have to look that up) is satisfied and we get that the genus satisfies $g le d-2$. Now, if your plane curve is smooth (which I had not previously assumed) then $g = (d-1)(d-2)/2$, which combined with the previous bound gives, not surprisingly, $d le 3$.
No comments:
Post a Comment