Hyperelliptic curve: Difference between revisions

In algebraic geometry a hyperelliptic curve is an algebraic curve ${\displaystyle C}$ which admits a double cover ${\displaystyle f:C\to \mathbb {P} ^{1}}$. If such a double cover exists it is unique, and it is called the "hyperelliptic double cover". The involution induced on the curve ${\displaystyle C}$ by the interchanging between the two "sheets" of the double cover is called the "hyperelliptic involution". The divisor class of a fiber of the hyperelliptic double cover is called the "hyperelliptic class".

Weierstrass points

By the Riemann-Hurwitz formula the hyperlliptic double cover has exactly ${\displaystyle 2g+2}$ branch points. For each branch point ${\displaystyle p}$ we have ${\displaystyle h^{0}(2p)=2}$. Hence these points are all Weierstrass points. Moreover, we see that for each of these points ${\displaystyle h^{0}((2(k+1))p)\geq h^{0}(2kp)+1}$, and thus the Weierstrass weight of each of these points is at least ${\displaystyle \sum _{k=1}^{g}(2k-k)=g(g-1)/2}$. However, by the second part of Weierstrass gap theorem, the total weight of Weierstrass points is ${\displaystyle g(g^{2}-1)}$, and thus the Weierstrass points of ${\displaystyle C}$ are exactly the branch points of the hyperelliptic double cover.

curves of genus 2

If the genus of ${\displaystyle C}$ is 2, then the degree of the cannonical class ${\displaystyle K_{C}}$ is 2, and ${\displaystyle h^{0}(K_{C})=2}$. Hence the cannonical map is a double cover.

the canonial embedding

If ${\displaystyle p}$ is a rational point on a hyperelliptic curve, then for all ${\displaystyle k}$ we have ${\displaystyle h^{0}((2(k+1))p)\geq h^{0}(2kp)+1}$. Hence we must have ${\displaystyle h^{0}((2g-2)p)\geq g}$. However, by Riemann-Roch this implies that the divisor ${\displaystyle (2g-2)p}$ is rationally equivalent to the canonical class ${\displaystyle K_{C}}$. Hence the cannonical class of ${\displaystyle C}$ is ${\displaystyle g-1}$ times the hyperelliptic class of ${\displaystyle C}$, and the canonical image of ${\displaystyle C}$ is a rational curve of degree ${\displaystyle g-1}$.

moduli of hyperelliptic curves

binary forms

stable hyperelliptic curves