Solutions to Hartshorne's Algebraic Geometry/Cech Cohomology: Difference between revisions

Let ${\displaystyle f}$ be an equation cutting out a degree d curve ${\displaystyle X}$ in ${\displaystyle {\mathbb{P}}_k^2}$. Suppose that ${\displaystyle X}$ doesn't contain the point ${\displaystyle (1,0,0)}$. Use \v{C}ech cohomology to calculate the dimensions of ${\displaystyle H^0,H^1}$ of ${\displaystyle X}$.

The degree d curve ${\displaystyle X}$ is the vanishing locus of ${\displaystyle f}$, so we have a short exact sequence:

${\displaystyle 0\to 𝒪(-d)\to 𝒪\to {𝒪}_X\to 0}$

where ${\displaystyle 𝒪}$ without further decoration denotes the structure sheaf of ${\displaystyle {\mathbb{P}}_k^2}$. Specifically, the map on the left is multiplication by our polynomial f, which is a degree d map ${\displaystyle 𝒪\to 𝒪}$, but a degree 0 map ${\displaystyle 𝒪(-d)\to 𝒪}$. This is an injective map, and we are quotienting out precisely by its image, so it's equivalent to the usual short exact sequence associated to a closed subscheme.

Then apply the H functor to get a long exact sequence:

${\displaystyle 0\to \mathrm{\Gamma }(𝒪(-d))\to \mathrm{\Gamma }(𝒪)\to \mathrm{\Gamma }({𝒪}_X)\to H^1(𝒪(-d))\to H^1(𝒪)\to H^1({𝒪}_X)\to H^2(𝒪(-d))\to H^2(𝒪)\to H^2({𝒪}_X)\to 0}$

Which vanishes in higher degrees by dimensional vanishing.

Now to figure out what these things are:

${\displaystyle H^i(𝒪(e))=0}$ for ${\displaystyle 0<i<r}$ in projective space ${\displaystyle {\mathbb{P}}_A^r}$.

This gives us that ${\displaystyle H^1(𝒪(-d))=H^1(𝒪)=0}$. Furthermore, assuming degrees must be positive ${\displaystyle \mathrm{\Gamma }(𝒪(-d))=0}$.

${\displaystyle H^2({𝒪}_X)}$ actually vanishes again by dimensional vanishing. ${\displaystyle \mathrm{\Gamma }(𝒪)=k}$, either by general knowledge (constants are the only globally defined homogeneous polynomials with degree zero on any of the standard open affines) or by the fact that ${\displaystyle h^0(𝒪(e))={\displaystyle (\genfrac{}{}{0ex}{}{r+e}{r})}}$ in general; when e = 0, this gives dimension 1 over k. (${\displaystyle h^i:=\text{dim}{H}^i}$).

Our last trick we shall use is Serre duality (here just for projective space):

${\displaystyle \mathrm{\Gamma }(𝒪(-e))\cong (H^r(e-r-1){)}^{\vee }}$, where ${\displaystyle {\cdot }^{\vee }}$ represents the dual.

Since the dimension of a vector space (these H's are vector spaces in this context because of III 5.2 in Hartshorne, pg 228) is the same as its dual, ${\displaystyle \text{dim}{H}^2(𝒪)=\text{dim}(H^2(𝒪){)}^{\vee }}$. Moreover, ${\displaystyle (H^2(𝒪){)}^{\vee }\cong \mathrm{\Gamma }(𝒪(-r-1))}$, which has dimension ${\displaystyle {\displaystyle (\genfrac{}{}{0ex}{}{-1}{r})}=0}$, so it's 0. Hence ${\displaystyle H^2(𝒪)=0}$.

Moreover, ${\displaystyle \text{dim}{H}^2(𝒪(-d))=\text{dim}(H^2(𝒪(-d)){)}^{\vee }}$, and by the same trick (Serre duality), ${\displaystyle (H^2(𝒪(-d)){)}^{\vee }\cong \mathrm{\Gamma }(𝒪(d-r-1))}$, which has well-known dimension (e.g., Vakil 14.1.c) of ${\displaystyle {\displaystyle (\genfrac{}{}{0ex}{}{r+d-r-1}{r})}={\displaystyle (\genfrac{}{}{0ex}{}{d-1}{2})}={\displaystyle (\genfrac{}{}{0ex}{}{d-1}{d-3})}={\displaystyle \frac{1}{2}}(d-1)(d-2)}$.

Combining all of the above results, we get two short exact sequences:

${\displaystyle 0\to k\to \mathrm{\Gamma }({𝒪}_X)\to 0}$

${\displaystyle 0\to H^1({𝒪}_X)\to \mathrm{\Gamma }(𝒪(d-r-1))\to 0}$

So we have ${\displaystyle h^0({𝒪}_X)=1}$ and ${\displaystyle h^1({𝒪}_X)={\displaystyle \frac{1}{2}}(d-1)(d-2)}$.

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