Elliptic Curves - Field of Rational Functions

Let $E (K)$ be an elliptic curve with equation $f (X, Y) = 0$ [the following is true for any affine curve].

Take a polynomial $g (X, Y)$ , and consider its behaviour on the points of $E (K)$ only, ignoring its behaviour on all other values of $X$ and $Y$ .

Then, for example, if $g = f$ , from our point of view, $g$ is the same as the zero function because $g (P)$ for any point $P$ on the curve is zero. In fact, it can be shown (using Hilbert's Nullstellensatz) that a polynomial $g$ is the zero function on $E$ if and only if it is a multiple of $f$ .

This leads us to define the ring of regular functions of $E$ to be $K [E] = K [X, Y] / ⟨ f ⟩$ Its field of fractions $K (E)$ is called the field of rational functions of $E$ .

If we write $E$ in Weierstrass form, then we can always replace $Y^{2}$ with smaller powers of $Y$ meaning that a regular function can always be written in the form $v (X) + Y w (X)$ .

Fact: Every nonconstant regular function has at least two finite zeroes.