Real hyperelliptic curve

A hyperelliptic curve is a class of algebraic curves. Hyperelliptic curves exist for every genus $g\geq 1$ . The general formula of Hyperelliptic curve over a finite field $K$ is given by

C:y^{2}+h(x)y=f(x)\in K[x,y]

where $h(x),f(x)\in K$ satisfy certain conditions. There are two types of hyperelliptic curves: real hyperelliptic curves and imaginary hyperelliptic curves which differ by the number of points at infinity. In this page, we describe more about real hyperelliptic curves, these are curves having two points at infinity while imaginary hyperelliptic curves have one point at infinity.

Definition

A real hyperelliptic curve of genus g over K is defined by an equation of the form $C:y^{2}+h(x)y=f(x)$ where $h(x)\in K$ has degree not larger than g+1 while $f(x)\in K$ must have degree 2g+1 or 2g+2. This curve is a non singular curve where no point $(x,y)$ in the algebraic closure of $K$ satisfies the curve equation $y^{2}+h(x)y=f(x)$ and both partial derivative equations: $2y+h(x)=0$ and $h'(x)y=f'(x)$ . The set of (finite) $K$ –rational points on C is given by

C(K)=\{(a,b)\in K^{2}|b^{2}+h(a)b=f(a)\}\cup S

Where $S$ is the set of points at infinity. For real hyperelliptic curves, there are two points at infinity, $\infty _{1}$ and $\infty _{2}$ . For any point $P(a,b)\in C(K)$ , the opposite point of $P$ is given by ${\overline {P}}=(a,-b-h)$ ; it is the other point with x-coordinate a that also lies on the curve.

Example

Let $C:y^{2}=f(x)$ where

f(x)=x^{6}+3x^{5}-5x^{4}-15x^{3}+4x^{2}+12x=x(x-1)(x-2)(x+1)(x+2)(x+3)\,

over $R$ . Since $\deg f(x)=2g+2$ and $f(x)$ has degree 6, thus $C$ is a curve of genus g = 2.

The homogeneous version of the curve equation is given by

Y^{2}Z^{4}=X^{6}+3X^{5}Z-5X^{4}Z^{2}-15X^{3}Z^{3}+4X^{2}Z^{4}+12XZ^{5}

It has a single point at infinity given by (0:1:0) but this point is singular. The blowup of $C$ has 2 different points at infinity, which we denote $\infty _{1}$ and $\infty _{2}$ . Hence this curve is an example of a real hyperelliptic curve.

In general, every curve given by an equation where f has even degee has two points at infinity and is a real hyperelliptic curve while those where f has odd degree have only a single point in the blowup over (0:1:0) and are thus imaginary hyperelliptic curves. In both cases this assumes that the affine part of the curve is nonsingular (see the conditions on the derivatives above)

Arithmetic in a real hyperelliptic curve

In real hyperelliptic curve, addition is no longer defined on points as in elliptic curves but on divisors and the Jacobian. Let $C$ be a hyperelliptic curve of genus g over a finite field K. A divisor $D$ on $C$ is a formal finite sum of points $P$ on $C$ . We write

D=\sum _{P\in C}{n_{P}P}

where

n_{P}\in \mathbb {Z}

and

n_{p}=0

for almost all

P

The degree of $D=\sum _{P\in C}{n_{P}P}$ is defined by

\deg(D)=\sum _{P\in C}{n_{P}}

$D$ is said to be defined over $K$ if $D^{\sigma }=\sum _{P\in C}n_{P}P^{\sigma }=D$ for all automorphisms σ of ${\overline {K}}$ over $K$ . The set $Div(K)$ of divisors of $C$ defined over $K$ forms an additive abelian group under the addition rule

\sum a_{P}P+\sum b_{P}P=\sum {(a_{P}+b_{P})P}

The set $Div^{0}(K)$ of all degree zero divisors of $C$ defined over $K$ is a subgroup of $Div(K)$ .

We take an example:

Let $D_{1}=6P_{1}+4P_{2}$ and $D_{2}=1P_{1}+5P_{2}$ . If we add them then $D_{1}+D_{2}=7P_{1}+9P_{2}$ . The degree of $D_{1}$ is $\deg(D_{1})=6+4=10$ and the degree of $D_{2}$ is $\deg(D_{2})=1+5=6$ . Then, $\deg(D_{1}+D_{2})=deg(D_{1})+deg(D_{2})=16.$

For polynomials $G\in K[C]$ , the divisor of $G$ is defined by

\mathrm {div} (G)=\sum _{P\in C}{\mathrm {ord} }_{P}(G)P

. If the function

$G$ has a pole at a point $P$ then $-{\mathrm {ord} }_{P}(G)$ is the order of vanishing of $G$ at $P$ . Assume $G,H$ are polynomials in $K[C]$ ; the divisor of the rational function $F=G/H$ is called a principal divisor and is defined by $\mathrm {div} (F)=\mathrm {div} (G)-\mathrm {div} (H)$ . We denote the group of principal divisors by $P(K)$ , i.e. $P(K)={\mathrm {div} (F)|F\in K(C)}$ . The Jacobian of $C$ over $K$ is defined by $J=Div^{0}/P$ . The factor group $J$ is also called the divisor class group of $C$ . The elements which are defined over $K$ form the group $J(K)$ . We denote by ${\overline {D}}\in J(K)$ the class of $D$ in $Div^{0}(K)/P(K)$ .

There are two canonical ways of representing divisor classes for real hyperelliptic curves $C$ which have two points infinity $S=\{\infty _{1},\infty _{2}\}$ . The first one is to represent a degree zero divisor by ${\bar {D}}$ such that $D=\sum _{i=1}^{r}P_{i}-r\infty _{2}$ , where $P_{i}\in C({\bar {\mathbb {F} }}_{q})$ , $P_{i}\not =\infty _{2}$ , and $P_{i}\not ={\bar {P_{j}}}$ if $i\not =j$ The representative $D$ of $\bar{D}$ is then called semi reduced. If $D$ satisfies the additional condition $r\leq g$ then the representative $D$ is called reduced.^[1] Notice that $P_{i}=\infty _{1}$ is allowed for some i. It follows that every degree 0 divisor class contain a unique representative $\bar{D}$ with

D=D_{x}-deg(D_{x})\infty _{2}+v_{1}(D)(\infty _{1}-\infty _{2})

where $D_{x}$ is divisor that is coprime with both

\infty _{1}

and

\infty _{2}

, and

0\leq deg(D_{x})+v_{1}(D)\leq g

The other representation is balanced at infinity. Let $D_{\infty }=\infty _{1}+\infty _{2}$ , note that this divisor is $K$ -rational even if the points $\infty _{1}$ and $\infty _{2}$ are not independently so. Write the representative of the class $\bar{D}$ as $D=D_{1}+D_{\infty }$ , where $D_{1}$ is called the affine part and does not contain $\infty _{1}$ and $\infty _{2}$ , and let $d=\deg(D_{1})$ . If $d$ is even then

D_{\infty }={\frac {d}{2}}(\infty _{1}+\infty _{2})

If $d$ is odd then

D_{\infty }={\frac {d+1}{2}}\infty _{1}+{\frac {d-1}{2}}\infty _{2}

.^[2]

For example, let the affine parts of two divisors be given by

D_{1}=6P_{1}+4P_{2}

and

D_{2}=1P_{1}+5P_{2}

then the balanced divisors are

D_{1}=6P_{1}+4P_{2}-5D_{\infty _{1}}-5D_{\infty _{2}}

and

D_{2}=1P_{1}+5P_{2}-3D_{\infty _{1}}-3D_{\infty _{2}}

Transformation from real hyperelliptic curve to imaginary hyperelliptic curve

Let $C$ be a real quadratic curve over a field $K$ . If there exists a ramified prime divisor of degree 1 in $K$ then we are able to perform a birational transformation to an imaginary quadratic curve. A (finite or infinite) point is said to be ramified if it is equal to its own opposite. It means that $P=(a,b)={\overline {P}}=(a,-b-h(a))$ , i.e. that $h(a)+2b=0$ . If $P$ is ramified then $D=P-\infty _{1}$ is a ramified prime divisor.^[3]

The real hyperelliptic curve $C:y^{2}+h(x)y=f(x)$ of genus $g$ with a ramified $K$ -rational finite point $P=(a,b)$ is birationally equivalent to an imaginary model $C':y'^{2}+{\bar {h}}(x')y'={\bar {f}}(x')$ of genus $g$ , i.e. $\deg({\bar {f}})=2g+1$ and the function fields are equal $K(C)=K(C')$ .^[4] Here:

x'={\frac {1}{x-a}}

and

y'={\frac {y+b}{(x-a)^{g+1}}}

… (i)

In our example $C:y^{2}=f(x)$ where $f(x)=x^{6}+3x^{5}-5x^{4}-15x^{3}+4x^{2}+12x$ , h(x) is equal to 0. For any point $P=(a,b)$ , $h(a)$ is equal to 0 and so the requirement for P to be ramified becomes $b=0$ . Substituting $h(a)$ and $b$ , we obtain $f(a)=0$ , where $f(a)=a(a-1)(a-2)(a+1)(a+2)(a+3)$ , i.e. $a\in \{0,1,2,-1,-2,-3\}$ .

From (i), we obtain $x={\frac {ax'+1}{x'}}$ and $y={\frac {y'}{x'^{g+1}}}$ . For g=2, we have $y={\frac {y'}{x'^{3}}}$

For example, let $a=1$ then $x={\frac {x'+1}{x'}}$ and $y={\frac {y'}{x'^{3}}}$ , we obtain

\left({\frac {y'}{x'^{3}}}\right)^{2}={\frac {x'+1}{x'}}\left({\frac {x'+1}{x'}}+1\right)\left({\frac {x'+1}{x'}}+2\right)\left({\frac {x'+1}{x'}}+3\right)\left({\frac {x'+1}{x'}}-1\right)\left({\frac {x'+1}{x'}}-2\right)

To remove the denominators this expression is multiplied by $x^{6}$ , then:

y'^{2}=(x'+1)(2x'+1)(3x'+1)(4x'+1)(1)(1-x')\,

giving the curve

C':y'^{2}={\bar {f}}(x')

where

{\bar {f}}(x')=(x'+1)(2x'+1)(3x'+1)(4x'+1)(1)(1-x')=-24x'^{5}-26x'^{4}+15x'^{3}+25x'^{2}+9x'+1

$C'$ is an imaginary quadratic curve since ${\bar {f}}(x')$ has degree $2g+1$ .

References

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