Quotient of a local ring at a point is a finite dimensional vector space
$f,g\in \mathbb{C}[x,y]$ are irreducible polynomials, and the varieties $V_1=V(f)$ and $V_2=V(g)$ are not equal. Is the ring $\mathcal{O}_p/(f,g)$ a finite dimensional vector space over $\mathbb{C}$? (Here $\mathcal{O}_p$ denotes the local ring of $\mathbb{A}^2$ at the point $p\in \mathbb{A}^2$.)
How can i prove this? Any hints/suggestions would be highly appreciated.
Is there anyway that i could relate the ideal $(f,g)$ to the maximal ideal $\mathfrak{m}_p=(x-p_1,y-p_2)$ where $p=(p_1,p_2)\in \mathbb{A}^2$? If so how can i proceed further?
Solution 1:
Saying what Youngsu said, slightly more geometrically:
You know that $V(f)$ is a dimension $1$ topological space, and since $V(g)\cap V(f)\subsetneq V(f)$ (why?) this implies that $V(f)\cap V(g)$ is a proper closed subset of $V(f)$. But, since $V(f)$ is Noetherian, you know that $V(f)\cap V(g)$ can be decomposed into a finite union of irreducible closed subsets of $V(f)$ which, by dimension considerations, must be dimension $0$.
Thus, we see that $\text{Spec }(\mathbb{C}[x,y]/(f,g))$ is a finite $\mathbb{C}$-variety, and thus must be Artinian, and so finite as a $\mathbb{C}$-space.
In less fancy words, the intersection of the two curves must be finite, purely by dimension considerations, and since the only varieties supported on finitely many points are finite dimensional $\mathbb{C}$-spaces, this implies your desired result.
Implicitly, I am using this very nice, and very useful theorem:
Theorem: Let $k$ be a field, and let $A$ be a finite type $k$-algebra. Then, the following are equivalent:
- $A$ is a finitely generated $\mathbb{C}$-module.
- $\text{Spec}(A)$ is finite.
- $\text{Spec}(A)$ is discrete.
- $\text{MaxSpec}(A)$ is finite.
Geometrically, this is saying something about the fibers of quasifinite morphisms. Namely, that they are finite type morphisms whose fibers, over any point $p$, satisfy any of the above equivalent properties over the residue field at $p$ (usually they are defined to be finite type morphisms whose fibers are finite).
Solution 2:
Since $V_i$ are varieties and they are not equal, $f,g$ are relatively prime elements. Therefore, $O_p/(f)$ is a $1$-dimensional integral domain and the image of $g$ is a non zerodivisor. Therefore, $O_p/(f,g)$ is of dimension zero; hence it is of finite length.